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ERROR: length of permutation is <= 0 (not present) ERROR: out of memory %d : %d ERROR: invalid ... permutation vector OK ⍀P$Ë$     ~   w _W ?7` +#@      ,]D_umf_i_report_perm___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf #1/28 1200792757 0 0 100644 4340 ` umf_i_singletons.o |__text__TEXT `x PUWVEE$EE;E|cUExUЍ uUЍEUЍ u$UЍEEEE;E |UEEUЍEEE;E|AUЍEЍ4M$1‰Ѝ<U E:1E뵍Er^_]ÐUV$} uE EUЍEE } uEUЍE<tEUE EUЍE EE;E|:UЍE$EUЍE(<xEEE뼋UE0EUЍE0EE;E|UЍE4EUЍE<yhE;Eu^UЍE,E܃}u?UЍE} uEE UЍ UE EEETUЍEUЍ4M(UЍE(؃1UЍ UE UЍ U,E EE$^]ÐUXEEEEEEE E}yDUЍE<u'}uEEUЍ UUЍ4}$UЍ U,7; t EEEU4EU9⍀P% $    ~ ? G A 9 3 . 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(unsymmetric) Q = COLAMD (A), Q refined during numerical factorization, and no attempt at diagonal pivoting. (symmetric, with 2-by-2 block pivoting) P2 = row permutation that tries to place large entries on the diagonal. Q = AMD (P2*A+(P2*A)'), Q not refined during numerical factorization, attempt to select pivots from the diagonal of P2*A. (auto) %d: initial allocation ratio: %g %d: initial allocation (in Units): %d %d: max iterative refinement steps: %d %d: 2-by-2 pivot tolerance: %g %d: Q fixed during numerical factorization: %g (yes) (no) (auto) %d: AMD dense row/col parameter: %g no "dense" rows/columns "dense" rows/columns have > max (16, (%g)*sqrt(n)) entries Only used if the AMD ordering is used. %d: diagonal pivot tolerance: %g Only used if diagonal pivoting is attempted. %d: scaling: %d (no) (divide each row by sum of abs. values in each row) (divide each row by max. abs. value in each row) %d: frontal matrix allocation ratio: %g %d: initial frontal matrix size (# of Entry's): %d %d: drop tolerance: %g %d: AMD and COLAMD aggressive absorption: %g (yes) (no) The following options can only be changed at compile-time: %d: BLAS library used: Fortran BLAS. %d: compiled for ANSI C (uses malloc, free, realloc, and printf) %d: CPU timer is POSIX times ( ) routine. %d: compiled for normal operation (debugging disabled) unknown computer/operating system: %s size of int: %g long: %g Int: %g pointer: %g double: %g Entry: %g (in bytes) ???ffffff?{Gz?$@MbP?? @@⍀PM$Ë$  z (j (Z (J (: * $  @       @          l a Y /    X  [ S  0     { k * "     `  O  ;S K !  bZTL@91  naYG<4 @~aL5 4,0}C;m,$`@aYgR;` zP@K x rj `    YEYE 4]aeL_umfpack_di_report_control___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/28 1200792824 0 0 100644 25580 ` umfpack_di_report_info.o| GG__text__TEXT*I$__data__DATA*U-__cstring__TEXT*X-__literal8__TEXTFP8I__picsymbolstub2__TEXTFIb__la_sym_ptr2__DATA GIc__textcoal_nt__TEXT GI @cXcx PcUS4EEEEMFf.wM荃Ff.+ED$*$FMFf.sED$E $^F*$NFM荃Ff.sED$E $!F*$FMFf.swM荃Ff.s`MFf.uz%E^EEFYEE F]E\$*$E*$uE4[]ÐUSm}t7EUf.ztE,DDžD DžDDX} (X(`)D$})$D)$D)$D *$D4*$DM*$Dt*$D*$yD*$kDE ,dE ,``@@;d~ d@@\*dEf.wdD$*$C*`Ef.w`D$-+$CE ,*ȍEf.w E ,D$m+$oCE ,*ȍEf.w E ,D$+$-CE ,*ȍEf.w E ,D$+$BE (,*ȍEf.w E (,D$-,$BE 0,*ȍEf.w E 0,D$m,$gBE 8,*ȍEf.w E 8,D$,$%BE %Ef.zt,$A^E -Ef.zt--$A.E 5Ef.ztm-$AE -Ef.zt-$iA^E Ef.zt-$9A.E 5Ef.zt-.$ AE -Ef.ztm.$@.E Ef.zt.$@E Ef.zt.$}@.E -Ef.zt-/$M@E U f(X E U Xf.u/z-E U f(X Ef.w-E U XD$m/$?E @U @f.uzE @Ef.wE @D$/$a?E PU Pf.uzE PEf.wE PD$-0$ ?E HU Hf.uzE HEf.wE HD$m0$>E XU Xf.uzE XEf.wE XD$0$e>E ,TT~0$8>Tu-1$>E hhEf.sm1$=hhf.uzhEf.whD$1$=E U f.uzE Ef.w E D$1$:=E U f.uzE Ef.w E D$-2$<E U f.uzE Ef.w E D$m2$<E Ef.sBhEf.w(E ^hD$2$ <E U ˜f.uzE Ef.w E D$2$;E U  f.uzE Ef.w E D$m3$f;E U ¨f.uzE Ef.w E D$3$ ;E U °f.uzE Ef.w E D$3$:E U ¸f.uzE Ef.w E D$-4$O:E Ef.sBhEf.w(E ^hD$m4$9E -Ef.ztE 8H4$9E (U (f.uzE (Ef.w E (D$4$M9E  U f.uzE  Ef.w E  D$-5$8Hf(YHHYHf.u&z$Hf(YHEf.w$HYHD$m5$|8HHf.uzHEf.wHD$5$08E 0U 0f.uzE 0Ef.w E 0D$5$7E xEE EE `U `f.uzE `Ef.wE `D$-6$_7E hU hf.uzE hEf.wE hD$m6$ 7E h=EYȍEEf(^ЋE h=EYȍEE^f(f.u8z6E h=EYȍEE^ȍEf.w>E h=EYȍEE^f(D$6$;6E pU pf.uzE pEf.wE pD$6$5E p=EYȍEEf(^ЋE p=EYȍEE^f(f.u8z6E p=EYȍEE^ȍEf.w>E p=EYȍEE^f(D$-7$5MEf.uzMEf.wED$m7$4MEf.uzMEf.wED$7$4E  Ef.zt7$i4E  -Ef.zt^7$64-8$(4E (D$m8$4E 0D$8$3|E  5Ef.zt\7$38$3E (D$-9$3E 0D$m9$j3E `Ef.sE Ef.s*9$$39$3 :$3E hD$E D$9:D$A:$E pD$E D$9:D$Z:$E xD$E D$9:D$p:$dE @D$E D$9:D$:$(E @=EYȍEE^f(D$E =EYȍEE^f(D$:D$:$E HD$E D$9:D$:$pE H=EYȍEE^f(D$E =EYȍEE^f(D$:D$:$E PD$E D$:D$;$E EE EMEf.s<M荃Ef.s%Ef(XM*\\f(EMEEE XE؋E `EM؍Ef.s<MЍEf.s%Ef(XM*\\f(EMEEED$ED$9:D$;$ED$ED$9:D$7;$TED$ED$9:D$O;$&E D$E D$9:D$i;$E D$E D$9:D$;$E D$E D$9:D$;$rE EE XEE PEE HU Hf.uzE HEf.w E HD$;$-E PU Pf.uzE PEf.w E PD$ <$u-E `U `f.uzE `Ef.w E `D$M<$-E hU hf.uzE hEf.w E hD$<$,E pU pf.uzE pEf.w E pD$<$^,E xU xf.uzE xEf.w E xD$ =$,E U f.uzE Ef.w E D$M=$+E 8U 8f.uzE 8Ef.w E 8D$=$G+E @U @f.uzE @Ef.w E @D$=$*E U f.uzE Ef.w E D$ >$*E U f.uzE Ef.w E D$M>$0*E U f.uzE Ef.w E D$>$)E U f.uzE Ef.w E D$>$v)E U f.uzE Ef.w E D$ ?$)E U f.uzE Ef.w E D$M?$(MEf.uzMEf.wED$?$|(MEf.uzMEf.wED$?$<(MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$ @$t'MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$M@$&MEEEEMEf.s1MEf.sEXEEMEf.uzMEf.wED$@$&MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$@$H%MEpMEf.sOMEf.s5EXEpppf.uzpEf.wpD$ A$$MEf.wpEf.wMUEYf(^pMUEY^pf.u1z/MUEYf(^pEf.w/MUEY^pD$MA$#E EE xE EMEf.uzMEf.wED$A$W#E U €f.uzE Ef.w E D$A$"E U ˆf.uzE Ef.w E D$ B$"E U f.uzE Ef.w E D$MB$@"E U ˜f.uzE Ef.w E D$B$!MEf.uzMEf.wED$B$!xxf.uzxEf.wxD$ C$W!MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$MC$ MEf.wxEf.wMUEYf(^xMUEY^xf.u1z/MUEYf(^xEf.w/MUEY^xD$C$MEf.sfMEf.sOEXEEMEf.uzMEf.wED$C$;MEf.sKMEf.s1MEf.sEXEEMEf.uzMEf.wED$ D$MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$MD$xEf.sopEf.sRMEf.s8pXEpppf.uzpEf.wpD$D$!MEf.wpEf.wMUEYf(^pMUEY^pf.u1z/MUEYf(^pEf.w/MUEY^pD$D$JE$<[] %-27s - %5.0f%% - UMFPACK V4.4 (Jan. 28, 2005) %s, Info: matrix entry defined as: double Int (generic integer) defined as: int BLAS library used: Fortran BLAS. MATLAB: no. CPU timer: POSIX times ( ) routine. number of rows in matrix A: %d number of columns in matrix A: %d entries in matrix A: %d memory usage reported in: %d-byte Units size of int: %d bytes size of long: %d bytes size of pointer: %d bytes size of numerical entry: %d bytes strategy used: symmetric strategy used: unsymmetric strategy used: symmetric 2-by-2 ordering used: amd on A+A' ordering used: colamd on A ordering used: provided by user modify Q during factorization: no modify Q during factorization: yes prefer diagonal pivoting: no prefer diagonal pivoting: yes pivots with zero Markowitz cost: %0.f submatrix S after removing zero-cost pivots: number of "dense" rows: %.0f number of "dense" columns: %.0f number of empty rows: %.0f number of empty columns %.0f submatrix S square and diagonal preserved submatrix S not square or diagonal not preserved pattern of square submatrix S: number rows and columns %.0f symmetry of nonzero pattern: %.6f nz in S+S' (excl. diagonal): %.0f nz on diagonal of matrix S: %.0f fraction of nz on diagonal: %.6f 2-by-2 pivoting to place large entries on diagonal: # of small diagonal entries of S: %.0f # unmatched: %.0f symmetry of P2*S: %.6f nz in P2*S+(P2*S)' (excl. diag.): %.0f nz on diagonal of P2*S: %.0f fraction of nz on diag of P2*S: %.6f AMD statistics, for strict diagonal pivoting: est. flops for LU factorization: %.5e est. nz in L+U (incl. diagonal): %.0f est. largest front (# entries): %.0f est. max nz in any column of L: %.0f number of "dense" rows/columns in S+S': %.0f symbolic factorization defragmentations: %.0f symbolic memory usage (Units): %.0f symbolic memory usage (MBytes): %.1f Symbolic size (Units): %.0f Symbolic size (MBytes): %.0f symbolic factorization CPU time (sec): %.2f symbolic factorization wallclock time(sec): %.2f matrix scaled: no matrix scaled: yes (divided each row by sum of abs values in each row) minimum sum (abs (rows of A)): %.5e maximum sum (abs (rows of A)): %.5e (divided each row by max abs value in each row) minimum max (abs (rows of A)): %.5e maximum max (abs (rows of A)): %.5e symbolic/numeric factorization: upper bound actual %% variable-sized part of Numeric object: %20.0f initial size (Units) peak size (Units) final size (Units)Numeric final size (Units) %20.1fNumeric final size (MBytes)peak memory usage (Units)peak memory usage (MBytes) %20.5enumeric factorization flopsnz in L (incl diagonal)nz in U (incl diagonal)nz in L+U (incl diagonal)largest front (# entries)largest # rows in frontlargest # columns in front initial allocation ratio used: %0.3g # of forced updates due to frontal growth: %.0f number of off-diagonal pivots: %.0f nz in L (incl diagonal), if none dropped %.0f nz in U (incl diagonal), if none dropped %.0f number of small entries dropped %.0f nonzeros on diagonal of U: %.0f min abs. value on diagonal of U: %.2e max abs. value on diagonal of U: %.2e estimate of reciprocal of condition number: %.2e indices in compressed pattern: %.0f numerical values stored in Numeric object: %.0f numeric factorization defragmentations: %.0f numeric factorization reallocations: %.0f costly numeric factorization reallocations: %.0f numeric factorization CPU time (sec): %.2f numeric factorization wallclock time (sec): %.2f numeric factorization mflops (CPU time): %.2f numeric factorization mflops (wallclock): %.2f symbolic + numeric CPU time (sec): %.2f symbolic + numeric mflops (CPU time): %.2f symbolic + numeric wall clock time (sec): %.2f symbolic + numeric mflops (wall clock): %.2f solve flops: %.5e iterative refinement steps taken: %.0f iterative refinement steps attempted: %.0f sparse backward error omega1: %.2e sparse backward error omega2: %.2e solve CPU time (sec): %.2f solve wall clock time (sec): %.2f solve mflops (CPU time): %.2f solve mflops (wall clock time): %.2f total symbolic + numeric + solve flops: %.5e total symbolic + numeric + solve CPU time: %.2f total symbolic + numeric + solve mflops (CPU): %.2f total symbolic+numeric+solve wall clock time: %.2f total symbolic+numeric+solve mflops(wallclock) %.2f Y@@?@ @0Aư> ⍀PF$Ë$**F**`F~*Fi*FO*F,*F *F)F)F)) F)F[)FA)F$)F))E(F(F(F(F(Fs(FY(FN(F(E+(F'F'F'F''`E'FV'F?'F4',' E'F&F&F&F&F&Fh&F]&U&D<&F'&F&F%F%F%F%F%%Do%FI%A%`D&%F %% D$F$$C$FO$G$C%$F##`C#F## Cr#F##B"F"F"F"F"Fp"FS"FH"@"B""F!F!F!F!!`B!Fn!FW!F7!F!F!F F  B F~ Fd FF F@ 8 A F FFFFFFxpAWFBF+F FFFF`AFph AMF0(@F@Fvn`@LF @F?F_W?5F`?F ?{FH@>F>F`>dF1) >F=Fwo=MF`=F.=x;NF=<; <;<;<;zr<h;CF FFFFqFD<<2<s<5<FFFFY<z;PH=<>5<&FFFF<;<;\T;J; ;;;;@;FFz;bZ:B::4,9F@::99F{y9gFUM@92F 9F8FFFFqFMF?F#FF8F@8FFiF[FMF)FFFF8F7eF7F@7Fph7BF  6 F  6u FB : @6 F  6 F F  5s F@ 8 5 F  @5 F ~ 5\ F) ! 4 F  @4 F~ Fl d 4B F  3 F  3 FU M @3/ F  3F22@2_F3+2 F1F@1cF7/1F0Fog0SFA9@0%F 0F/F/F{@/gFUM/9F%. F.F@.F}.[FC;-F-F@-F}u-SF;3,F ,FyG,sk ,e],WO+IA+;3+-%`+ + +* wo* g_* MF 7F F F F * F * lF aY* >F 'F    GF GF j1 GGbI___i686.get_pc_thunk.bx_umfpack_di_report_info___i686.get_pc_thunk.axdyld_stub_binding_helper_printf_print_ratio#1/36 1200792824 0 0 100644 3644 ` umfpack_di_report_matrix.o| __text__TEXT} P__data__DATA}__cstring__TEXTd__literal8__TEXT __picsymbolstub2__TEXT 0 __la_sym_ptr2__DATA  ` __textcoal_nt__TEXT  @p  l Ph USt} t1E U f.ztE ,EEEEE} E}t tE{EE EċEE{EtEEEċE EE D$ ED$ED$$'}~} ~$ E}u$EcUĉЍEEԋEԉD$ $}y$EE8t3D$ ED$D$4$fE}uU$FE}E}~i$EE;E|vUЍE<y!ED$k$EVUЍE;E~!ED$$EEEE;E|`UEHUЍE)ЉE}y(ED$ED$$5EE떋EEEE;E|U} EЉEUЍEE̋UEEȋŰE)ЉE}~4ED$EȃD$ẺD$ ED$ED$$EẺE؋E;E|U؉ЍEE}~ED$ED$$:}tm}~g'$ E؍EEMf.uzED$)$/$}x E;E}6ED$ED$ ED$ED$4$EE;E6ED$ED$ ED$ED$t$OE}~i$/}u/E̋U)‰Ѓ u } ~}~$E(EE܍E؃k}u&} u } ~}~$E(EEЉE}~ED$$$EEt[]columnrow%s-form matrix, n_row %d n_col %d, ERROR: n_row <= 0 or n_col <= 0 ERROR: Ap missing nz = %d. ERROR: number of entries < 0 ERROR: Ap [%d] = %d must be %d ERROR: Ai missing ERROR: Ap [%d] < 0 ERROR: Ap [%d] > size of Ai ERROR: # entries in %s %d is < 0 %s %d: start: %d end: %d entries: %d %s %d : (%g) (0) ERROR: %s index %d out of range in %s %d ERROR: %s index %d out of order (or duplicate) in %s %d ... ... %s-form matrix OK ⍀P$Ë$ia [S )!  u  _W@ %;  5  3 + aY  F> w u a ~@ KC  7/      s j      3 dK_umfpack_di_report_matrix___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/36 1200792825 0 0 100644 12484 ` umfpack_di_report_numeric.o| P!P!__text__TEXT#*__data__DATA__cstring__TEXTD __literal8__TEXTH "__picsymbolstub2__TEXT` "8-0__la_sym_ptr2__DATA(! #.__textcoal_nt__TEXTH!# @8/ / P.USt} t1E U f.ztE ,EEEEȉE} Eu$ EEЋEЉ$u u$| E8EЋEEЋEEEċE;E}EEċEĉEEEE;E~EEEEEЋEԋEEMUЃ MUЃ EUԉЃ EE EEEЃxXtEEEE܋EЋ@pMEЋЃE؃}ED$ED$"$HE@D$T$,E@D$$$EЃxXu$EЃxXuH$E@0D$4$E@8D$t$OEЃxXuF$~E@0D$$bE@8D$4$Fi$8E@ D$t$E@(D$$E؉D$$ERP,$d$]M< ^f(D$4$EЋD$t$EЋRP,$d$]M< ^f(D$$FEЋD$$+EЋD$4$EЋD$t$EЋD$$EЋD$$EЋD$4$EЋD$t$EЋD$$nEЋD$$SED$4$8EЋD$t$E@@D$$E@HD$$E@PD$4$D$E$E}ut$E[EЃEЃt}~$$c}~$M}~$9D$D$ED$ D$EЋD$E$}~4$}~V$D$ED$ ED$EЋ@tD$E$ItE$!EZ}~_$~D$ED$ ED$EЋ@xD$E$tE$EED$ED$EЉ$u%E$k$EED$ED$EЉ$.u"E$Q$E}~$D$D$ED$ D$EЋD$E$!E$}~$M$?EẼt[]UVSpEEEEEEEE܋EE؋EE̋EEE}~$E EE;E|}~EEUЍE̋EUЍE؋EUEB`EUЃEUEB`EUЍEЃ(~EE}um$ E(}~ED$v$}~ED$$EE;E|UЍEE}~ED$$}~\EE cf.uz(EED$$7$'E;E~ E;E} E }~$}u } u} ~$E(EEEEE;E|}~EEUЍE̋EEEȃ}t EEUЍEЃ(~EE}um$AE(}~ED$v$ UЍE܋E}}~+ED$UЍE D$$E}u2}~,E;E}$}xUЍE ;EuEEEԃ}u E}UЍ4M E(UЍE 1UЍE؋Eă}y E,UĉЃEEUEB`E}}%EUE;Pp~ E}~h}~EĉD$$UEB`EEE;E|-E‰Ѝ U E EEEɃ}~ED$$F}t}~$,}~$EE;E|UЍE E}~ED$$}~FEcf.uzED$$$E;E~ E;E} Eq}~$YE}u } u} ~$3E(EEd}~$EEp[^]ÐUWVS|EEEEEEE@|EЋEE̋EEEEă}~$E EE}~CEE;E|2U܉Ѝ4} MU܉Ѝ7E܃ă}~ED$ED$R$EEE;E}}~EĉEUЍEEUЍE̋E}y ErEE}tEUЃEEEEUEB`E}~%EUE;Pp~ EEE;E|U܉ЍE Eԃ}~EԉD$|$}~FE*f.uzED$^$d$E;E~ E;E} EW}~G $tE}u } u} ~i$NE(E܃UȍEȃ(~EĉE}u,$E(}~}~ED$$}}EE}~ED$$UЃUE;Pp~ EZUEB`EEE;E|U܉Ѝ U E؋ E؃E܃΃}~}~ED$$"UE)}y EUЍEЋE}t}~ED$ED$$}x E;E E~E‰Ѝ u UЍE EUЍ U E }~ED$$SE(PEE}y}~EĉEUЍEEUЍE̋EUEB`EUЃEUEB`EUȍEȃ(~EĉE}u,$ E(}~ED$$~ }~ED$E$c EE;E|U܉ЍEEԃ}~EԉD$ $ }~\E܍E *f.uz(E܍ED$^$ d$ E;E~ E;E} Eq}~G $ }u } u} ~i$n E(E܃E(EĉE}~G $8 EE|[^_]Numeric object: ERROR: LU factors invalid n_row: %d n_col: %d relative pivot tolerance used: %g relative symmetric pivot tolerance used: %g matrix scaled: noyes (divided each row by sum abs value in each row) minimum sum (abs (rows of A)): %.5e maximum sum (abs (rows of A)): %.5eyes (divided each row by max abs value in each row) minimum max (abs (rows of A)): %.5e maximum max (abs (rows of A)): %.5e initial allocation parameter used: %g frontal matrix allocation parameter used: %g final total size of Numeric object (Units): %d final total size of Numeric object (MBytes): %.1f peak size of variable-size part (Units): %d peak size of variable-size part (MBytes): %.1f largest actual frontal matrix size: %d memory defragmentations: %d memory reallocations: %d costly memory reallocations: %d entries in compressed pattern (L and U): %d number of nonzeros in L (excl diag): %d number of entries stored in L (excl diag): %d number of nonzeros in U (excl diag): %d number of entries stored in U (excl diag): %d factorization floating-point operations: %g number of nonzeros on diagonal of U: %d min abs. value on diagonal of U: %.5e max abs. value on diagonal of U: %.5e reciprocal condition number estimate: %.2e ERROR: out of memory to check Numeric object Scale factors applied via multiplication Scale factors applied via division Scale factors, Rs: Scale factors, Rs: (not present) P: row Q: column ERROR: L factor invalid ERROR: U factor invalid diagonal of U: Numeric object: OK L in Numeric object, in column-oriented compressed-pattern form: Diagonal entries are all equal to 1.0 (not stored) ... column %d: length %d. row %d : (%g) (0) ... remove row %d at position %d. add %d entries. length %d. Start of Lchain. U in Numeric object, in row-oriented compressed-pattern form: Diagonal is stored separately. row %d: length %d. End of Uchain. col %d : row %d: length %d. End of Uchain. remove %d entries. add column %d at position %d. length %d. row %d: col %d : 0A⍀P⍀Pni⍀PUP⍀P<7o⍀oP#Z⍀ZP E⍀EP0⍀0Pm !!$Ë$u..}uu.NF.>6. X .9 .s., .ldZ. .@8 ..VN.!.Z..u.e].UM.,X .. ..* u    u { s k J P 7 /   u    ] U ; 3   c  Z6 .   u     P  z > 6 s#  c ZRJ   h` KC =. w k m^3+b @ %   ld UB:@ &   @   z g_@ LD 1)  @   H }u bZ@ BH    u @   tl XP@ <4    ` .  }ld  D!!D!! @! @!  0 ERROR: input matrix is invalid ERROR: system argument invalid ERROR: invalid permutation ERROR: pattern of matrix (Ap and/or Ai) has changed INTERNAL ERROR! Input arguments might be corrupted or aliased, or an internal error has occurred. Check your input arguments with the umfpack_*_report_* routines before calling the umfpack_* computational routines. Recompile UMFPACK with debugging enabled, and look for failed assertions. If all else fails please report this error to Tim Davis (davis@cise.ufl.edu). ERROR: Unrecognized error code: %d ⍀P $Ë$  qi` aY QI A9 1) !  @      } `         vn      3! % dK_umfpack_di_report_status___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/36 1200792826 0 0 100644 6812 ` umfpack_di_report_symbolic.o| II__text__TEXTk__data__DATAk __cstring__TEXT __literal8__TEXT8__picsymbolstub2__TEXT}H__la_sym_ptr2__DATA-__textcoal_nt__TEXTA @T  P, US} t1E U f.ztE ,EEEEE؃} Eq$EEE$wu$~EEEEEEEE@@EEEE@PEE@TE܋E@DEE@HEE@LEE@XEE@\EE@`EE@dE}<$ED$ED$$ED$$ED$ $Q $vEu $\6Eu $@Eu $$ $ $Eu $ 6Eu $ Eu $ $  $ EtB $ F $p Q $b EtF $H B $8 $* EH Yȍ^f(D$ E@ D$ $ EYȍ^f(D$ ED$ $ EHYȍ^f(D$ E@D$Q $N EHYȍ^f(D$ E@D$ $ $ ED$1 $ ED$Q $ ED$ $ E܉D$ $ EEEE;E|UЉЍEEȋUЉEEă}~#EĉD$ EȉD$EЉD$ $) }~:UЉЍED$UЉЍED$Q $ EȉE̋E;E~ỦЍEE}~0EEԃD$EԉD$ ED$ẺD$ $ }~MỦED$ỦЍEЍED$ $8 }~$ỦЍED$ $ }~$ỦЍED$1$ }~R$ ỦЍE<u}~:_$ *}~$ỦЍED$h${ E}uE9E} }uE}t}~#m$< EUẼDUЍE<t1}~+UЍED$ED$$}t EЃAD$EEE;E}EEE$uE}u$E}~$pD$E؉D$ ED$E@hD$E$E}~Q$.D$E؉D$ ED$E@lD$E$EE$}u}u E)}~p$$EEĤ[]Symbolic object: ERROR: invalid matrix to be factorized: n_row: %d n_col: %d number of entries: %d block size used for dense matrix kernels: %d strategy used: symmetricunsymmetricsymmetric 2-by-2 ordering used: colamd on A amd on A+A' provided by user performn column etree postorder: no yes prefer diagonal pivoting (attempt P=Q): variable-size part of Numeric object: minimum initial size (Units): %.20g (MBytes): %.1f estimated peak size (Units): %.20g (MBytes): %.1f estimated final size (Units): %.20g (MBytes): %.1f symbolic factorization memory usage (Units): %.20g (MBytes): %.1f frontal matrices / supercolumns: number of frontal chains: %d number of frontal matrices: %d largest frontal matrix row dimension: %d largest frontal matrix column dimension: %d Frontal chain: %d. Frontal matrices %d to %d Largest frontal matrix in Frontal chain: %d-by-%d Front: %d pivot cols: %d (pivot columns %d to %d) pivot row candidates: %d to %d leftmost descendant: %d 1st new candidate row : %d parent: (none) %d ... Front: %d placeholder for %d empty columns ERROR: out of memory to check Symbolic object Initial column permutation, Q1: Initial row permutation, P1: Symbolic object: OK @0AKx⍀xP72c⍀cPN⍀NP9⍀9P$⍀$P!$Ë$TLF> ` xi/'|wian@8a,$@ } '`  nf YQ D<` /'@    ` xp K=0(  Q U ` U Q vn h` ZR >6 "      `  qi\T@8og  y s=k=e ` Z9R9L G A5953 . (1 1  --  5AEfrM_umfpack_di_report_symbolic___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_i_free_umf_i_report_perm_umf_i_malloc_umfdi_valid_symbolic_printf #1/36 1200792826 0 0 100644 2236 ` umfpack_di_report_triplet.o| __text__TEXTX*__data__DATA0__cstring__TEXT8__literal8__TEXT(__picsymbolstub2__TEXT0__la_sym_ptr2__DATAI__textcoal_nt__TEXTM @$p PUSD} t1E U f.ztE ,EEEEЉE} E-ED$ E D$ED$$}t}u$E}~} ~$E}y$E}~'$}E؋EEEE;E|2UЍEEUЍEE܃}~#E܉D$ ED$ED$)$}t_}~YEEEMf.uzED$9$?$}~'$}xE;E}}x E;E }D$rE`}u } u} ~]$IE(EEE}~f$$EEԃD[]triplet-form matrix, n_row = %d, n_col = %d nz = %d. ERROR: indices not present ERROR: n_row or n_col is <= 0 ERROR: nz is < 0 %d : %d %d (%g) (0)ERROR: invalid triplet ... triplet-form matrix OK c⍀PO$Ë$| vnr KCi "P 3 K E  }u5 3     y    4eL_umfpack_di_report_triplet___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf #1/36 1200792826 0 0 100644 972 ` umfpack_di_report_vector.o __text__TEXT__data__DATA__picsymbolstub2__TEXT__la_sym_ptr2__DATA__textcoal_nt__TEXT @Dd P U8E}t1EUf.ztE,EEEEE} E3D$D$ED$ ED$E D$E$EEc⍀PO$  L3_umfpack_di_report_vector___i686.get_pc_thunk.axdyld_stub_binding_helper_umfdi_report_vector#1/28 1200792827 0 0 100644 2868 ` umfpack_di_solve.o8 .T.__text__TEXTJT__data__DATAJ__literal8__TEXTP(__picsymbolstub2__TEXTxl$__la_sym_ptr2__DATAb __textcoal_nt__TEXT&z @ d P USD$}$t@E$8U$8f.ztE$8,Dž Dž}(tKE(DžPU~{ A ȍ(DžY~- A ȋI IE $u#QDž*ꀋ*;t#YDžD ; |=HPIf.zt HPBPf.uz Dž}t}u#aDž}~ Dž~ Љ D$ $D$$t u?A$q$cDžD$(D$$D$ D$D$ED$ED$ED$ ED$E D$E$$$*x<$w D[]*⍀Poj|⍀|PVQg⍀gP=8R⍀RP$=⍀=P (⍀(P$Ë$C5Pxp*Xhi`Y:X XPP  ""~ y ske ` ZRL G A93 . (   }}  +&*vi\C_umfpack_di_solve___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_toc_umfdi_solve_umf_i_free_umf_i_malloc_umfdi_valid_numeric_umfpack_tic#1/28 1200792827 0 0 100644 892 ` umfpack_di_symbolic.o ss__text__TEXTR__data__DATARb__picsymbolstub2__TEXTRb__la_sym_ptr2__DATAk{__textcoal_nt__TEXTo @` PUHEE$D$ E D$ED$ED$ED$ED$ ED$E D$E$⍀P_$L kWkW oG._umfpack_di_symbolic___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_di_qsymbolic #1/28 1200792827 0 0 100644 1268 ` umfpack_di_transpose.o 22__text__TEXTD__data__DATA__picsymbolstub2__TEXTK\__la_sym_ptr2__DATA" 2__textcoal_nt__TEXT.> @dt PUhE EE;E}EEEEEE}}EEED$E$E}u EtD$0ED$,E,D$(E(D$$E$D$ E D$E D$ED$ED$ED$ ED$E D$E$2EE$ EEE$F⍀FP 1⍀1P⍀P$HG A*9*3 . (& &  "" .HeT/_umfpack_di_transpose___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_i_free_umfdi_transpose_umf_i_malloc#1/36 1200792828 0 0 100644 2612 ` umfpack_di_triplet_to_col.o __text__TEXT__data__DATA__picsymbolstub2__TEXT`$__la_sym_ptr2__DATAz__textcoal_nt__TEXT @ L P U}$t} t }t}u E}~} ~ E}y EE EȋE;E}EEȋEȉEEE}(t }tEEĉE}t+D$E$EЃ}u E},EE}t6D$E$fE؃}uEЉ$9ED$E$0ED$E$ED$E$ED$E$E}t}t }t}uNEЉ$E؉$E$E$E$E$uE}}t|E؉D$u;E􃸰~/E􃸴~#E􃸜xE􃸘x Exp~"E$v E$ E EǀE@tE@xEǀEǀEǀE@|EǀEǀEǀE@`EǀEED$UU܋E􋀴EUE;~ E܋EE$ U䉂E􃸤u"E$5 E$ E ED$ EEԋE􋀴E؋E؋U;~ UԋU؋E؃D$D$E􋀤$ EЋEEȋE􋀴E̋E̋U;~ UȋŰẼ9Et"E$ E$ E: E$z t"E$R E$ E uD$E􋀰$ FtExtu"E$ E$^ E ED$ E􋀰D$D$E@t$ ‹E􋀰9t"E$ E$ E[ E$ t"E$s E$ E* uD$E􋀴$ FxExxu"E$& E$ EED$ E􋀴D$D$E@x$- ‹E􋀴9t"E$E$ E|E$t"E$E$EKuD$E􋀜$E􃸀u"E$AE$EED$ E􋀜D$D$E􋀀$E‹E􋀜9t"E$E$6EE$t"E$E$EcuD$E􋀜$E􃸈u"E$YE$EED$ E􋀜D$D$E􋀈$]‹E􋀜9t"E$E$NEE$t"E$E$E{uD$E􋀜$ E􃸄u"E$qE$E(ED$ E􋀜D$D$E􋀄$u‹E􋀜9t"E$ E$fEE$t"E$E$5EuD$E􋀜$#F|Ex|u"E$E$EFED$ E􋀜D$D$E@|$‹E􋀜9t"E$.E$EE$%t"E$E$VEuD$E􋀜$DE􃸐u"E$E$EaED$ E􋀜D$D$E􋀐$‹E􋀜9t"E$FE$EE$=t"E$E$nEuD$E􋀜$\E􃸌u"E$E$EyED$ E􋀜D$D$E􋀌$‹E􋀜9t"E$^E$EE$Ut"E$-E$EExXuD$E􋀰$jE􃸬u"E$E$)EED$ E􋀰D$D$E􋀬$‹E;t"E$tE$E+E$kt"E$CE$EE􃸘uD$E􋀘$zE􃸔u"E$E$9EED$ E􋀘D$D$E􋀔$‹E􋀘9t"E$|E$E3E$st"E$KE$EuD$E@p$F`Ex`u"E$E$]EED$ E@pD$D$E@`$‹E;PptE$E$ EkE$tE$E$E=E$E$@uE$JEUEEE@[^]numeric.umfrby⍀Pe`⍀PLG⍀P3.⍀Po⍀oPZ⍀ZPE⍀EP0⍀0P %>$Ë$M > 3         | W L = &      _ T E . #     u j [ D 9       s \ Q 4 tiLm1& I>!aV9|qZ/${PE6mbB^S{g>/ s  f6f6 bb ^^~ y sZ kZ e ` ZV RV L G AR 9R 3 . 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(AgNe AgNe  =g5e=g5e PLHD@<840,($          bd/ggy\V2 @`lzG___i686.get_pc_thunk.bx_umfpack_dl_qsymbolic___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_dl_free_symbolic_umfpack_toc_umf_l_set_stats_umf_l_analyze_umf_l_colamd_umf_l_colamd_set_defaults_umf_l_free_umfdl_2by2_amd_l_aat_umfdl_transpose_sqrt_umf_l_singletons_umf_l_is_permutation_umf_l_malloc_umfdl_symbolic_usage_ceil_amd_l_defaults_umfpack_tic_amd_l1_do_amd_prune_singletons_combine_ordering_free_work_error#1/36 1200792871 0 0 100644 9556 ` umfpack_dl_report_control.o X__text__TEXT d__data__DATA {__cstring__TEXT S |__literal8__TEXTX__const__DATAP,__picsymbolstub2__TEXT`<D$__la_sym_ptr2__DATAyUt$__textcoal_nt__TEXT}Y @$$p P|$USd}t1EUf.ztE,EEEEE}8 D$ $ $$ED$D$=$}t>EUf.ztEݝxݝxݝx݅x]}t>EUf.ztEݝpݝpݝp݅p]ED$D$q$ED$$ED$D$$ED$Q$}t>EUf.ztEݝhݝhݝh݅h]Mf.wMf.w2Mf.w Eݝ`ݝ`ݝ`݅`]ED$D$$}t@E U f.ztE ,\Dž\ Dž\ \EEXX} DžXXEED$D$$}t@E(U(f.ztE(,TDžT DžTTE}x}EED$D$$p}u1$\A}u$F+}uQ$0E^$}t>E0U0f.ztE0ݝH ݝH ݝH݅H]MЍf.s#ED$D$q$\MЍAf(fW,EEDD} DžDDEED$D$$(}t@E8U8f.ztE8,@Dž@ Dž@@EE<<y Dž<E`U`f.ztE`ݝ0ݝ0ݝ0݅0]Mf.wMf.w2Mf.w Eݝ(ݝ(ݝ(݅(]ED$D$ 1$}t>EhUhf.ztEhݝ ݝ ݝ ݅ ]ED$D$ q$ Mf.w$5Mf.w$$}t>EpUpf.ztEpݝݝݝ݅]ED$D$$HMf.w$#ED$1$$}t>ExUxf.ztExݝ!ݝ!ݝ݅]M؍f.wM؍f.w2M؍f.w Eݝݝݝ݅]ED$D$$ }t@E耋Uf.ztE,Dž DžE}t }tEED$D$-$}uC$l*}uQ$V}u$@$2}tEEUˆf.ztEݝ)ݝ)ݝ݅]Mȍf.wݝ Eݝ݅]Mȍf.s#ED$D$$_\MȍAf(fW,EE} DžEED$D$$}tEEUf.ztEݝݝݝ݅]ED$D$K$~ }tEEU˜f.ztEݝݝݝ݅]ED$D$q$ Mf.uz$ $ $ D$$ 0$ D$ Q$| D$ $f D$ $P .D$Q$8 1D$,1D$$9D$9D$9D$ 9D$$ d[]UMFPACK V4.4 (Jan. 28, 2005) %s, Control: Matrix entry defined as: double Int (generic integer) defined as: long %ld: print level: %ld %ld: dense row parameter: %g "dense" rows have > max (16, (%g)*16*sqrt(n_col) entries) %ld: dense column parameter: %g "dense" columns have > max (16, (%g)*16*sqrt(n_row) entries) %ld: pivot tolerance: %g %ld: block size for dense matrix kernels: %ld %ld: strategy: %ld (symmetric) Q = AMD (A+A'), Q not refined during numerical factorization, and diagonal pivoting (P=Q') attempted. (unsymmetric) Q = COLAMD (A), Q refined during numerical factorization, and no attempt at diagonal pivoting. (symmetric, with 2-by-2 block pivoting) P2 = row permutation that tries to place large entries on the diagonal. Q = AMD (P2*A+(P2*A)'), Q not refined during numerical factorization, attempt to select pivots from the diagonal of P2*A. (auto) %ld: initial allocation ratio: %g %ld: initial allocation (in Units): %ld %ld: max iterative refinement steps: %ld %ld: 2-by-2 pivot tolerance: %g %ld: Q fixed during numerical factorization: %g (yes) (no) (auto) %ld: AMD dense row/col parameter: %g no "dense" rows/columns "dense" rows/columns have > max (16, (%g)*sqrt(n)) entries Only used if the AMD ordering is used. %ld: diagonal pivot tolerance: %g Only used if diagonal pivoting is attempted. %ld: scaling: %ld (no) (divide each row by sum of abs. values in each row) (divide each row by max. abs. value in each row) %ld: frontal matrix allocation ratio: %g %ld: initial frontal matrix size (# of Entry's): %ld %ld: drop tolerance: %g %ld: AMD and COLAMD aggressive absorption: %g (yes) (no) The following options can only be changed at compile-time: %ld: BLAS library used: none. UMFPACK will be slow. %ld: compiled for ANSI C (uses malloc, free, realloc, and printf) %ld: CPU timer is POSIX times ( ) routine. %ld: compiled for normal operation (debugging disabled) unknown computer/operating system: %s size of int: %g long: %g Int: %g pointer: %g double: %g Entry: %g (in bytes) ???ffffff?{Gz?$@MbP?? @@⍀Pm$Ë$  z Hj HZ HJ H: @* @$  ` =      `  ?  !      l a Y /    Z  [ S  P     { 8k 8* "     `  R  <S K !  00bZTL@91  ((naYG<4 @~aL5   4,P}C;m,$`@aYgR;` zP@L x rj `    yeye 4}eL_umfpack_dl_report_control___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/28 1200792871 0 0 100644 25612 ` umfpack_dl_report_info.o| 5G5G__text__TEXT*I$__data__DATA*U-__cstring__TEXT*X-__literal8__TEXTFPXI__picsymbolstub2__TEXTGIb__la_sym_ptr2__DATA)GI c__textcoal_nt__TEXT-GI @0cxcx P(cUS4EEEEMFf.wM荃Ff.+ED$*$FMFf.sED$E $~F*$nFM荃Ff.sED$E $AF*$1FMFf.swM荃Ff.s`MFf.uz%E^EEFYEE F]E\$*$E*$E4[]ÐUSm}t7EUf.ztE,DDžD DžDDX} (X(`)D$})$D)$D)$D *$D4*$Dm*$D*$D*$D*$DE ,dE ,``@@;d~ d@@\*d=Ef.wdD$ +$D*`=Ef.w`D$M+$CE ,*ȍ=Ef.w E ,D$+$CE ,*ȍ=Ef.w E ,D$+$MCE ,*ȍ=Ef.w E ,D$ ,$ CE (,*ȍ=Ef.w E (,D$M,$BE 0,*ȍ=Ef.w E 0,D$,$BE 8,*ȍ=Ef.w E 8,D$,$EBE EEf.zt -$B^E MEf.ztM-$A.E UEf.zt-$AE MEf.zt-$A^E =Ef.zt .$YA.E UEf.ztM.$)AE MEf.zt.$@.E =Ef.zt.$@E =Ef.zt /$@.E MEf.ztM/$m@E U f(X E U Xf.u/z-E U f(X =Ef.w-E U XD$/$?E @U @f.uzE @=Ef.wE @D$/$?E PU Pf.uzE P=Ef.wE PD$M0$-?E HU Hf.uzE H=Ef.wE HD$0$>E XU Xf.uzE X=Ef.wE XD$0$>E ,TT~ 1$X>TuM1$?>E hh=Ef.s1$>hhf.uzh=Ef.whD$1$=E U f.uzE =Ef.w E D$ 2$Z=E U f.uzE =Ef.w E D$M2$<E U f.uzE =Ef.w E D$2$<E =Ef.sBh=Ef.w(E ^hD$2$@<E U ˜f.uzE =Ef.w E D$ 3$;E U  f.uzE =Ef.w E D$3$;E U ¨f.uzE =Ef.w E D$3$);E U °f.uzE =Ef.w E D$ 4$:E U ¸f.uzE =Ef.w E D$M4$o:E =Ef.sBh=Ef.w(E ^hD$4$:E MEf.ztE 8H4$9E (U (f.uzE (=Ef.w E (D$ 5$m9E  U f.uzE  =Ef.w E  D$M5$9Hf(YHHYHf.u&z$Hf(YH=Ef.w$HYHD$5$8HHf.uzH=Ef.wHD$5$P8E 0U 0f.uzE 0=Ef.w E 0D$ 6$7E xEE EE `U `f.uzE `=Ef.wE `D$M6$7E hU hf.uzE h=Ef.wE hD$6$+7E h]EYȍeEf(^ЋE h]EYȍeE^f(f.u8z6E h]EYȍeE^ȍ=Ef.w>E h]EYȍeE^f(D$6$[6E pU pf.uzE p=Ef.wE pD$ 7$6E p]EYȍeEf(^ЋE p]EYȍeE^f(f.u8z6E p]EYȍeE^ȍ=Ef.w>E p]EYȍeE^f(D$M7$75MEf.uzM=Ef.wED$7$4MEf.uzM=Ef.wED$7$4E  =Ef.zt8$4E  MEf.zt^8$V4M8$H4E (D$8$(4E 0D$8$4|E  UEf.zt\8$3 9$3E (D$M9$3E 0D$9$3E `=Ef.sE =Ef.s*9$D3 :$63-:$(3E hD$E D$Y:D$a:$E pD$E D$Y:D$z:$E xD$E D$Y:D$:$dE @D$E D$Y:D$:$(E @]EYȍeE^f(D$E ]EYȍeE^f(D$:D$:$E HD$E D$Y:D$:$pE H]EYȍeE^f(D$E ]EYȍeE^f(D$:D$;$E PD$E D$;D$#;$E EE EM=Ef.s<M荃=Ef.s%Ef(XM*\\f(EmEEE XE؋E `EM؍=Ef.s<MЍ=Ef.s%Ef(XM*\\f(EmEEED$ED$Y:D$?;$ED$ED$Y:D$W;$TED$ED$Y:D$o;$&E D$E D$Y:D$;$E D$E D$Y:D$;$E D$E D$Y:D$;$rE EE XEE PEE HU Hf.uzE H=Ef.w E HD$;$-E PU Pf.uzE P=Ef.w E PD$-<$-E `U `f.uzE `=Ef.w E `D$m<$8-E hU hf.uzE h=Ef.w E hD$<$,E pU pf.uzE p=Ef.w E pD$<$~,E xU xf.uzE x=Ef.w E xD$-=$!,E U f.uzE =Ef.w E D$m=$+E 8U 8f.uzE 8=Ef.w E 8D$=$g+E @U @f.uzE @=Ef.w E @D$=$ +E U f.uzE =Ef.w E D$->$*E U f.uzE =Ef.w E D$m>$P*E U f.uzE =Ef.w E D$>$)E U f.uzE =Ef.w E D$>$)E U f.uzE =Ef.w E D$-?$9)E U f.uzE =Ef.w E D$m?$(MEf.uzM=Ef.wED$?$(MEf.uzM=Ef.wED$?$\(M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$-@$'M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$m@$&mEEEEM=Ef.s1M=Ef.sEXEEMEf.uzM=Ef.wED$@$0&M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$@$h%mEpM=Ef.sOM=Ef.s5EXEpppf.uzp=Ef.wpD$-A$$M=Ef.wp=Ef.wMuEYf(^pMuEY^pf.u1z/MuEYf(^p=Ef.w/MuEY^pD$mA$#E EE xE EMEf.uzM=Ef.wED$A$w#E U €f.uzE =Ef.w E D$A$#E U ˆf.uzE =Ef.w E D$-B$"E U f.uzE =Ef.w E D$mB$`"E U ˜f.uzE =Ef.w E D$B$"MEf.uzM=Ef.wED$B$!xxf.uzx=Ef.wxD$-C$w!M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$mC$ M=Ef.wx=Ef.wMuEYf(^xMuEY^xf.u1z/MuEYf(^x=Ef.w/MuEY^xD$C$M=Ef.sfM=Ef.sOEXEEMEf.uzM=Ef.wED$C$[M=Ef.sKM=Ef.s1M=Ef.sEXEEMEf.uzM=Ef.wED$-D$M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$mD$x=Ef.sop=Ef.sRM=Ef.s8pXEpppf.uzp=Ef.wpD$D$AM=Ef.wp=Ef.wMuEYf(^pMuEY^pf.u1z/MuEYf(^p=Ef.w/MuEY^pD$D$j&E$\[] %-27s - %5.0f%% - UMFPACK V4.4 (Jan. 28, 2005) %s, Info: matrix entry defined as: double Int (generic integer) defined as: long BLAS library used: none. UMFPACK will be slow. MATLAB: no. CPU timer: POSIX times ( ) routine. number of rows in matrix A: %ld number of columns in matrix A: %ld entries in matrix A: %ld memory usage reported in: %ld-byte Units size of int: %ld bytes size of long: %ld bytes size of pointer: %ld bytes size of numerical entry: %ld bytes strategy used: symmetric strategy used: unsymmetric strategy used: symmetric 2-by-2 ordering used: amd on A+A' ordering used: colamd on A ordering used: provided by user modify Q during factorization: no modify Q during factorization: yes prefer diagonal pivoting: no prefer diagonal pivoting: yes pivots with zero Markowitz cost: %0.f submatrix S after removing zero-cost pivots: number of "dense" rows: %.0f number of "dense" columns: %.0f number of empty rows: %.0f number of empty columns %.0f submatrix S square and diagonal preserved submatrix S not square or diagonal not preserved pattern of square submatrix S: number rows and columns %.0f symmetry of nonzero pattern: %.6f nz in S+S' (excl. diagonal): %.0f nz on diagonal of matrix S: %.0f fraction of nz on diagonal: %.6f 2-by-2 pivoting to place large entries on diagonal: # of small diagonal entries of S: %.0f # unmatched: %.0f symmetry of P2*S: %.6f nz in P2*S+(P2*S)' (excl. diag.): %.0f nz on diagonal of P2*S: %.0f fraction of nz on diag of P2*S: %.6f AMD statistics, for strict diagonal pivoting: est. flops for LU factorization: %.5e est. nz in L+U (incl. diagonal): %.0f est. largest front (# entries): %.0f est. max nz in any column of L: %.0f number of "dense" rows/columns in S+S': %.0f symbolic factorization defragmentations: %.0f symbolic memory usage (Units): %.0f symbolic memory usage (MBytes): %.1f Symbolic size (Units): %.0f Symbolic size (MBytes): %.0f symbolic factorization CPU time (sec): %.2f symbolic factorization wallclock time(sec): %.2f matrix scaled: no matrix scaled: yes (divided each row by sum of abs values in each row) minimum sum (abs (rows of A)): %.5e maximum sum (abs (rows of A)): %.5e (divided each row by max abs value in each row) minimum max (abs (rows of A)): %.5e maximum max (abs (rows of A)): %.5e symbolic/numeric factorization: upper bound actual %% variable-sized part of Numeric object: %20.0f initial size (Units) peak size (Units) final size (Units)Numeric final size (Units) %20.1fNumeric final size (MBytes)peak memory usage (Units)peak memory usage (MBytes) %20.5enumeric factorization flopsnz in L (incl diagonal)nz in U (incl diagonal)nz in L+U (incl diagonal)largest front (# entries)largest # rows in frontlargest # columns in front initial allocation ratio used: %0.3g # of forced updates due to frontal growth: %.0f number of off-diagonal pivots: %.0f nz in L (incl diagonal), if none dropped %.0f nz in U (incl diagonal), if none dropped %.0f number of small entries dropped %.0f nonzeros on diagonal of U: %.0f min abs. value on diagonal of U: %.2e max abs. value on diagonal of U: %.2e estimate of reciprocal of condition number: %.2e indices in compressed pattern: %.0f numerical values stored in Numeric object: %.0f numeric factorization defragmentations: %.0f numeric factorization reallocations: %.0f costly numeric factorization reallocations: %.0f numeric factorization CPU time (sec): %.2f numeric factorization wallclock time (sec): %.2f numeric factorization mflops (CPU time): %.2f numeric factorization mflops (wallclock): %.2f symbolic + numeric CPU time (sec): %.2f symbolic + numeric mflops (CPU time): %.2f symbolic + numeric wall clock time (sec): %.2f symbolic + numeric mflops (wall clock): %.2f solve flops: %.5e iterative refinement steps taken: %.0f iterative refinement steps attempted: %.0f sparse backward error omega1: %.2e sparse backward error omega2: %.2e solve CPU time (sec): %.2f solve wall clock time (sec): %.2f solve mflops (CPU time): %.2f solve mflops (wall clock time): %.2f total symbolic + numeric + solve flops: %.5e total symbolic + numeric + solve CPU time: %.2f total symbolic + numeric + solve mflops (CPU): %.2f total symbolic+numeric+solve wall clock time: %.2f total symbolic+numeric+solve mflops(wallclock) %.2f Y@@?@ @0Aư>⍀P׸G$Ë$**F**F~*Gi*FO*G,*G *G)F)F))@F)F[)FA)F$)F))F(G(F(G(G(Gs(FY(FN(F(E+(F'F'F'F''E'FV'F?'F4','@E'G&F&G&G&G&Fh&F]&U&E<&G'&F&G%G%G%F%F%%Do%FI%A%D&%F %%@D$F$$D$FO$G$C%$F##C#F##@Cr#F##C"G"F"G"G"Gp"FS"FH"@"B""F!F!F!G!!B!Gn!FW!G7!G!G!F F  @B F~ Fd FF G@ 8 B G FGGGFFxpAWGBF+G GGFFAFph@AMF0(AF@Fvn@LF@@F@F_W?5F?F@?{FH@?F>F>dF1)@>F>Fwo=MF=FN=x;NF6=<; =;=;<;zr<h;CG FFGFqFD<<2<<U<FFFFy<z;PH]<>U<&FFFF:<;#<;\T <J; ;;;;`;FFz ;bZ:B::4,9F`: :99F{9gFUM`92F  9F8FFFFqFMF?F#FF8F`8FFiF[FMF)FFFF 8F7eF7F`7Fph 7BF  6 F  6u FB : `6 F  6 F F  5s F@ 8 5 F  `5 F ~ 5\ F) ! 4 F  `4 F~ Fl d 4B F  3 F  3 FU M `3/ F  3F22`2_F3+ 2 F1F`1cF7/ 1F0Fog0SFA9`0%F  0F/F/F{`/gFUM /9F%. F.F`.F} .[FC;-F-F`-F}u -SF;3,F ,Fyg,sk@,e]',WO,IA+;3+-%`+ + +* wo* g_* MF 7F F F F * F * lF aY* >F 'F   )GG)GG j1-G1GbI___i686.get_pc_thunk.bx_umfpack_dl_report_info___i686.get_pc_thunk.axdyld_stub_binding_helper_printf_print_ratio#1/36 1200792871 0 0 100644 3708 ` umfpack_dl_report_matrix.o| UU__text__TEXT} P__data__DATA}__cstring__TEXT__literal8__TEXT( __picsymbolstub2__TEXT0 p __la_sym_ptr2__DATAI __textcoal_nt__TEXTM @  l P USt} t1E U f.ztE ,EEEEE} E}t tE{EE EċEE{EtEEEċE EE D$ ED$ED$$g}~} ~$KE}u$+EcUĉЍEEԋEԉD$ $}y4$EE8t3D$ ED$D$T$E}ux$E}E}~$YEE;E|vUЍE<y!ED$$EVUЍE;E~!ED$$EEEE;E|`UEHUЍE)ЉE}y(ED$ED$$uEE떋EEEE;E|U} EЉEUЍEE̋UEEȋŰE)ЉE}~4ED$EȃD$ẺD$ ED$ED$$EẺE؋E;E|U؉ЍEE}~ED$ED$C$z}tm}~gL$`E؍EEMf.uzED$N$T$}x E;E}6ED$ED$ ED$ED$t$EE;E6ED$ED$ ED$ED$$E}~$o}u/E̋U)‰Ѓ u } ~}~$@E(EE܍E؃k}u&} u } ~}~$E(EEЉE}~ED$$$EEt[]columnrow%s-form matrix, n_row %ld n_col %ld, ERROR: n_row <= 0 or n_col <= 0 ERROR: Ap missing nz = %ld. ERROR: number of entries < 0 ERROR: Ap [%ld] = %ld must be %ld ERROR: Ai missing ERROR: Ap [%ld] < 0 ERROR: Ap [%ld] > size of Ai ERROR: # entries in %s %ld is < 0 %s %ld: start: %ld end: %ld entries: %ld %s %ld : (%g) (0) ERROR: %s index %ld out of range in %s %ld ERROR: %s index %ld out of order (or duplicate) in %s %ld ... ... %s-form matrix OK ⍀P=$Ë$ia! [S  )!    _W %`  Z ( X O aY   F>    ~` KC@ 7/      s j   I5I5 3MQdK_umfpack_dl_report_matrix___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/36 1200792872 0 0 100644 12492 ` umfpack_dl_report_numeric.o| X!X!__text__TEXT#*__data__DATA__cstring__TEXTI __literal8__TEXTP "__picsymbolstub2__TEXTh #@-0__la_sym_ptr2__DATA0! #.__textcoal_nt__TEXTP!# @@/ / P/USt} t1E U f.ztE ,EEEEȉE} Eu$ EEЋEЉ$} u$ E8EЋEEЋEEEċE;E}EEċEĉEEEE;E~EEEEEЋEԋEEMUЃ MUЃ EUԉЃ EE EEEЃxXtEEEE܋EЋ@pMEЋЃE؃}ED$ED$"$PE@D$T$4E@D$$$ EЃxXu$EЃxXuH$E@0D$4$E@8D$t$OEЃxXuF$E@0D$$jE@8D$4$Ni$@E@ D$t$$E@(D$$E؉D$$ERP,$d$]MD ^f(D$4$EЋD$t$EЋRP,$d$]MD ^f(D$$NEЋD$$3EЋD$4$EЋD$t$EЋD$$EЋD$$EЋD$4$EЋD$t$EЋD$$vEЋD$$[ED$4$@EЋD$t$%E@@D$$ E@HD$$E@PD$4$D$E$E}ut$E[EЃEЃt}~$$k}~$U}~$AD$D$ED$ D$EЋD$E$}~4$}~V$D$ED$ ED$EЋ@tD$E$QtE$)EZ}~_$D$ED$ ED$EЋ@xD$E$tE$EED$ED$EЉ$u%E$k$ EED$ED$EЉ$6u"E$Y$E}~$D$D$ED$ D$EЋD$E$)E$}~$U$GEẼt[]UVSpEEEEEEEE܋EE؋EE̋EEE}~$E EE;E|}~EEUЍE̋EUЍE؋EUEB`EUЃEUEB`EUЍEЃ(~EE}um$E(}~ED$v$}~ED$$EE;E|UЍEE}~ED$$}~\EE kf.uz(EED$$?$/E;E~ E;E} E }~$}u } u} ~$E(EEEEE;E|}~EEUЍE̋EEEȃ}t EEUЍEЃ(~EE}um$IE(}~ED$v$(UЍE܋E}}~+ED$UЍE D$$E}u2}~,E;E}$}xUЍE ;EuEEEԃ}u E}UЍ4M E(UЍE 1UЍE؋Eă}y E,UĉЃEEUEB`E}}%EUE;Pp~ E}~h}~EĉD$$UEB`EEE;E|-E‰Ѝ U E EEEɃ}~ED$$N}t}~$4}~$ EE;E|UЍE E}~ED$$}~FEkf.uzED$$$E;E~ E;E} Eq}~$aE}u } u} ~$;E(EEd}~$ EEp[^]ÐUWVS|EEEEEEE@|EЋEE̋EEEEă}~$E EE}~CEE;E|2U܉Ѝ4} MU܉Ѝ7E܃ă}~ED$ED$R$ EEE;E}}~EĉEUЍEEUЍE̋E}y ErEE}tEUЃEEEEUEB`E}~%EUE;Pp~ EEE;E|U܉ЍE Eԃ}~EԉD$~$}~FE2f.uzED$a$g$E;E~ E;E} EW}~G $|E}u } u} ~l$VE(E܃UȍEȃ(~EĉE}u,$E(}~}~ED$$}}EE}~ED$$UЃUE;Pp~ EZUEB`EEE;E|U܉Ѝ U E؋ E؃E܃΃}~}~ED$$*UE)}y EUЍEЋE}t}~ED$ED$$}x E;E E~E‰Ѝ u UЍE EUЍ U E }~ED$$[E(PEE}y}~EĉEUЍEEUЍE̋EUEB`EUЃEUEB`EUȍEȃ(~EĉE}u,$ E(}~ED$$ }~ED$F$k EE;E|U܉ЍEEԃ}~EԉD$$' }~\E܍E 2f.uz(E܍ED$a$ g$ E;E~ E;E} Eq}~G $ }u } u} ~l$v E(E܃E(EĉE}~G $@ EE|[^_]Numeric object: ERROR: LU factors invalid n_row: %ld n_col: %ld relative pivot tolerance used: %g relative symmetric pivot tolerance used: %g matrix scaled: noyes (divided each row by sum abs value in each row) minimum sum (abs (rows of A)): %.5e maximum sum (abs (rows of A)): %.5eyes (divided each row by max abs value in each row) minimum max (abs (rows of A)): %.5e maximum max (abs (rows of A)): %.5e initial allocation parameter used: %g frontal matrix allocation parameter used: %g final total size of Numeric object (Units): %ld final total size of Numeric object (MBytes): %.1f peak size of variable-size part (Units): %ld peak size of variable-size part (MBytes): %.1f largest actual frontal matrix size: %ld memory defragmentations: %ld memory reallocations: %ld costly memory reallocations: %ld entries in compressed pattern (L and U): %ld number of nonzeros in L (excl diag): %ld number of entries stored in L (excl diag): %ld number of nonzeros in U (excl diag): %ld number of entries stored in U (excl diag): %ld factorization floating-point operations: %g number of nonzeros on diagonal of U: %ld min abs. value on diagonal of U: %.5e max abs. value on diagonal of U: %.5e reciprocal condition number estimate: %.2e ERROR: out of memory to check Numeric object Scale factors applied via multiplication Scale factors applied via division Scale factors, Rs: Scale factors, Rs: (not present) P: row Q: column ERROR: L factor invalid ERROR: U factor invalid diagonal of U: Numeric object: OK L in Numeric object, in column-oriented compressed-pattern form: Diagonal entries are all equal to 1.0 (not stored) ... column %ld: length %ld. row %ld : (%g) (0) ... remove row %ld at position %ld. add %ld entries. length %ld. Start of Lchain. U in Numeric object, in row-oriented compressed-pattern form: Diagonal is stored separately. row %ld: length %ld. End of Uchain. col %ld : row %ld: length %ld. End of Uchain. remove %ld entries. add column %ld at position %ld. length %ld. row %ld: col %ld : 0A⍀Pz⍀Pfa⍀PMH⍀P4/o⍀oPZ⍀ZPE⍀EP0⍀0Pu !$!$Ë$u..}uu.NF.>6. ` .= .t./ .ldZ." .@8 ..VN.!.Z..u.e].UM.,` .. ..* u    u { s k J X 7 /   u    ] U ; 3   c  Z6 .   u     X  z > 6 t#  c ZRJ   h` KC =. w k m^3+b @ %   ld UB:@ &   @   z g_@ LD 1)  @   P }u bZ@ BP    u @   tl XP@ <4    ` .  }ld  L!!L!! H!!H!! D! D! ~ y s@! k@! e ` Z 0 ERROR: input matrix is invalid ERROR: system argument invalid ERROR: invalid permutation ERROR: pattern of matrix (Ap and/or Ai) has changed INTERNAL ERROR! Input arguments might be corrupted or aliased, or an internal error has occurred. Check your input arguments with the umfpack_*_report_* routines before calling the umfpack_* computational routines. Recompile UMFPACK with debugging enabled, and look for failed assertions. If all else fails please report this error to Tim Davis (davis@cise.ufl.edu). ERROR: Unrecognized error code: %ld ⍀P $Ë$  qi` aY QI A9 1) !  @      } `         vn      3" & dK_umfpack_dl_report_status___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/36 1200792874 0 0 100644 6812 ` umfpack_dl_report_symbolic.o| II__text__TEXTk__data__DATAk __cstring__TEXT __literal8__TEXT8__picsymbolstub2__TEXT}H__la_sym_ptr2__DATA-__textcoal_nt__TEXTA @T  P, US} t1E U f.ztE ,EEEEE؃} Eq$EEE$wu$~EEEEEEEE@@EEEE@PEE@TE܋E@DEE@HEE@LEE@XEE@\EE@`EE@dE}<$ED$ED$$ED$$ED$ $Q $vEu $\6Eu $@Eu $$ $ $Eu $ 6Eu $ Eu $ $  $ EtB $ F $p Q $b EtF $H B $8 $* EH Yȍ^f(D$ E@ D$ $ EYȍ^f(D$ ED$ $ EHYȍ^f(D$ E@D$Q $N EHYȍ^f(D$ E@D$ $ $ ED$1 $ ED$Q $ ED$ $ E܉D$ $ EEEE;E|UЉЍEEȋUЉEEă}~#EĉD$ EȉD$EЉD$ $) }~:UЉЍED$UЉЍED$Q $ EȉE̋E;E~ỦЍEE}~0EEԃD$EԉD$ ED$ẺD$ $ }~MỦED$ỦЍEЍED$ $8 }~$ỦЍED$$ }~$ỦЍED$1$ }~S$ ỦЍE<u}~:`$ *}~$ỦЍED$i${ E}uE9E} }uE}t}~#o$< EUẼDUЍE<t1}~+UЍED$ED$$}t EЃAD$EEE;E}EEE$uE}u$E}~$pD$E؉D$ ED$E@hD$E$E}~Q$.D$E؉D$ ED$E@lD$E$EE$}u}u E)}~p$$EEĤ[]Symbolic object: ERROR: invalid matrix to be factorized: n_row: %ld n_col: %ld number of entries: %ld block size used for dense matrix kernels: %ld strategy used: symmetricunsymmetricsymmetric 2-by-2 ordering used: colamd on A amd on A+A' provided by user performn column etree postorder: no yes prefer diagonal pivoting (attempt P=Q): variable-size part of Numeric object: minimum initial size (Units): %.20g (MBytes): %.1f estimated peak size (Units): %.20g (MBytes): %.1f estimated final size (Units): %.20g (MBytes): %.1f symbolic factorization memory usage (Units): %.20g (MBytes): %.1f frontal matrices / supercolumns: number of frontal chains: %ld number of frontal matrices: %ld largest frontal matrix row dimension: %ld largest frontal matrix column dimension: %ld Frontal chain: %ld. Frontal matrices %ld to %ld Largest frontal matrix in Frontal chain: %ld-by-%ld Front: %ld pivot cols: %ld (pivot columns %ld to %ld) pivot row candidates: %ld to %ld leftmost descendant: %ld 1st new candidate row : %ld parent: (none) %ld ... Front: %ld placeholder for %ld empty columns ERROR: out of memory to check Symbolic object Initial column permutation, Q1: Initial row permutation, P1: Symbolic object: OK @0AKx⍀xP72c⍀cPN⍀NP9⍀9P$⍀$P!$Ë$TLF> ` xi/'~xiao@8b,$@  } '`  nf YQ D<` /'@    ` xp K=0(  Q U ` U Q vn h` ZR >6 "      `  qi\T@8og  y s=k=e ` Z9R9L G A5953 . (1 1  --  5AEfrM_umfpack_dl_report_symbolic___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_l_free_umf_l_report_perm_umf_l_malloc_umfdl_valid_symbolic_printf #1/36 1200792874 0 0 100644 2244 ` umfpack_dl_report_triplet.o| __text__TEXT`*__data__DATA0__cstring__TEXT8__literal8__TEXT0__picsymbolstub2__TEXT8__la_sym_ptr2__DATAQ__textcoal_nt__TEXTU @,p PUSD} t1E U f.ztE ,EEEEЉE} E-ED$ E D$ED$$}t}u$E}~} ~$E}y$E}~'$}E؋EEEE;E|2UЍEEUЍEE܃}~#E܉D$ ED$ED$)$}t_}~YEEEMf.uzED$<$B$}~'$}xE;E}}x E;E }G$zE`}u } u} ~`$QE(EEE}~i$&$EEԃD[]triplet-form matrix, n_row = %ld, n_col = %ld nz = %ld. ERROR: indices not present ERROR: n_row or n_col is <= 0 ERROR: nz is < 0 %ld : %ld %ld (%g) (0)ERROR: invalid triplet ... triplet-form matrix OK [⍀PG$Ë$| vnu KCl "S 3 N H  }u5 3     y    4eL_umfpack_dl_report_triplet___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf #1/36 1200792874 0 0 100644 972 ` umfpack_dl_report_vector.o __text__TEXT__data__DATA__picsymbolstub2__TEXT__la_sym_ptr2__DATA__textcoal_nt__TEXT @Dd P U8E}t1EUf.ztE,EEEEE} E3D$D$ED$ ED$E D$E$EEc⍀PO$  L3_umfpack_dl_report_vector___i686.get_pc_thunk.axdyld_stub_binding_helper_umfdl_report_vector#1/28 1200792875 0 0 100644 2868 ` umfpack_dl_solve.o8 .T.__text__TEXTJT__data__DATAJ__literal8__TEXTP(__picsymbolstub2__TEXTxl$__la_sym_ptr2__DATAb __textcoal_nt__TEXT&z @ d P USD$}$t@E$8U$8f.ztE$8,Dž Dž}(tKE(DžPU~{ A ȍ(DžY~- A ȋI IE $u#QDž*ꀋ*;t#YDžD ; |=HPIf.zt HPBPf.uz Dž}t}u#aDž}~ Dž~ Љ D$ $D$$t u?A$q$cDžD$(D$$D$ D$D$ED$ED$ED$ ED$E D$E$$$*x<$w D[]*⍀Poj|⍀|PVQg⍀gP=8R⍀RP$=⍀=P (⍀(P$Ë$C5Pxp*Xhi`Y:X XPP  ""~ y ske ` ZRL G A93 . (   }}  +&*vi\C_umfpack_dl_solve___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_toc_umfdl_solve_umf_l_free_umf_l_malloc_umfdl_valid_numeric_umfpack_tic#1/28 1200792875 0 0 100644 892 ` umfpack_dl_symbolic.o ss__text__TEXTR__data__DATARb__picsymbolstub2__TEXTRb__la_sym_ptr2__DATAk{__textcoal_nt__TEXTo @` PUHEE$D$ E D$ED$ED$ED$ED$ ED$E D$E$⍀P_$L kWkW oG._umfpack_dl_symbolic___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_dl_qsymbolic #1/28 1200792875 0 0 100644 1268 ` umfpack_dl_transpose.o 22__text__TEXTD__data__DATA__picsymbolstub2__TEXTK\__la_sym_ptr2__DATA" 2__textcoal_nt__TEXT.> @dt PUhE EE;E}EEEEEE}}EEED$E$E}u EtD$0ED$,E,D$(E(D$$E$D$ E D$E D$ED$ED$ED$ ED$E D$E$2EE$ EEE$F⍀FP 1⍀1P⍀P$HG A*9*3 . (& &  "" .HeT/_umfpack_dl_transpose___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_l_free_umfdl_transpose_umf_l_malloc#1/36 1200792876 0 0 100644 2612 ` umfpack_dl_triplet_to_col.o __text__TEXT__data__DATA__picsymbolstub2__TEXT`$__la_sym_ptr2__DATAz__textcoal_nt__TEXT @ L P U}$t} t }t}u E}~} ~ E}y EE EȋE;E}EEȋEȉEEE}(t }tEEĉE}t+D$E$EЃ}u E},EE}t6D$E$fE؃}uEЉ$9ED$E$0ED$E$ED$E$ED$E$E}t}t }t}uNEЉ$E؉$E$E$E$E$uE}}t|E؉D$$Ë$M > 3         | W L = &      _ T E . #     u j [ D 9       s \ Q 4 tiLm1& I>!aV9|qZ/${PE6mbB^S{g>/ s  f6f6 bb ^^~ y sZ kZ e ` ZV RV L G AR 9R 3 . (N N   J J     2jncxJ_umfpack_dl_load_numeric___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfdl_valid_numeric_umfpack_dl_free_numeric_ferror_umf_l_free_fread_fclose_umf_l_malloc_fopen #1/36 1200792878 0 0 100644 2868 ` umfpack_dl_save_numeric.o8 T__text__TEXT.T"__data__DATA.__cstring__TEXT.__picsymbolstub2__TEXT=d __la_sym_ptr2__DATA __textcoal_nt__TEXT @  P USDEEE$ku E} u "EE E.D$E$E}u EED$ D$D$E$tE$EyED$ EEE􋀴EEU;~ UUED$D$E􋀤$TE܋EEԋE􋀴E؋E؋U;~ UԋU؋E؃9EtE$EED$ E􋀰D$D$E@t$‹E􋀰9tE$E|ED$ E􋀴D$D$E@x$‹E􋀴9tE$JE&ED$ E􋀜D$D$E􋀀$'‹E􋀜9tE$EED$ E􋀜D$D$E􋀈$‹E􋀜9tE$EtED$ E􋀜D$D$E􋀄$u‹E􋀜9tE$?EED$ E􋀜D$D$E@|$‹E􋀜9tE$EED$ E􋀜D$D$E􋀐$‹E􋀜9tE$ElED$ E􋀜D$D$E􋀌$m‹E􋀜9tE$7EExXtQED$ E􋀰D$D$E􋀬$‹E;tE$EE􃸘~VED$ E􋀘D$D$E􋀔$‹E􋀘9tE$xEWED$ E@pD$D$E@`$a‹E;PptE$3EE$EED[]numeric.umfwb_⍀_PJ⍀JP5⍀5Pxs ⍀ P_Jc|$Ë$\DP3H+|CUF: 5.  ` ZRL G At9t3 . ([ [  BB 2cskzJ_umfpack_dl_save_numeric___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_fclose_fwrite_fopen_umfdl_valid_numeric#1/36 1200792878 0 0 100644 6308 ` umfpack_dl_load_symbolic.o8 T__text__TEXT T__data__DATA __cstring__TEXT __picsymbolstub2__TEXT  0__la_sym_ptr2__DATAb __textcoal_nt__TEXT @   P UVS E} u } EE E D$E$E}u E) D$$ E}uE$ E ED$ D$D$E$Q t"E$( E$O E E$ t"E$ E$ E{ Ex82u;E􃸔~/E􃸘~#E􃸐xEx@xE􃸌x"E$ E$ E E@hE@lE@XE@dE@\E@`E@DE@HE@LE@pE@tE@xEǀuD$E􋀘$ FhExhu"E$ E$ E@ ED$ E􋀘D$D$E@h$ ‹E􋀘9t"E$) E$ E E$ t"E$ E$Q E uD$E􋀔$? FlExlu"E$ E$ Ea ED$ E􋀔D$D$E@l$ ‹E􋀔9t"E$J E$ E E$A t"E$ E$r E uD$E􋀐$` FXExXu"E$ E$% E ED$ E􋀐D$D$E@X$ ‹E􋀐9t"E$k E$ E! E$b t"E$: E$ EuD$E􋀐$ FdExdu"E$E$F EED$ E􋀐D$D$E@d$‹E􋀐9t"E$E$EBE$t"E$[E$EuD$E􋀐$F\Ex\u"E$E$gEED$ E􋀐D$D$E@\$‹E􋀐9t"E$E$EcE$t"E$|E$E2uD$E􋀐$F`Ex`u"E$/E$EED$ E􋀐D$D$E@`$6‹E􋀐9t"E$E$'EE$t"E$E$ESuD$E@@$FDExDu"E$SE$E ED$ E@@D$D$E@D$]‹E@@9t"E$E$QEE$t"E$E$ E}uD$E@@$FHExHu"E$}E$E3ED$ E@@D$D$E@H$‹E@@9t"E$"E${EE$t"E$E$JEuD$E@@$;FLExLu"E$E$E]ED$ E@@D$D$E@L$‹E@@9t"E$LE$EE$Ct"E$E$tEuD$E􋀘$bFpExpu"E$E$'EED$ E􋀘D$D$E@p$‹E􋀘9t"E$mE$E#E$dt"E$<E$EuD$E􋀔$FtExtu"E$E$HEED$ E􋀔D$D$E@t$‹E􋀔9t"E$E$EDE$t"E$]E$EE􃸌uD$E􋀌$FxExxu"E$E$\EED$ E􋀌D$D$E@x$ ‹E;t"E$E$E`E$t"E$yE$E/E􃸼uD$E􋀘$E􃸈u"E$E$oEED$ E􋀘D$D$E􋀈$‹E􋀘9tE$E$ EkE$tE$E$E=E$E$AuE$KEUEEE [^]symbolic.umfrba⍀PMH⍀P4/⍀P⍀Po⍀oPZ⍀ZPE⍀EP0⍀0P $=V$Ë$d U J 6 +       | A 6 '       ] R C , !     ~ s d M B %       n c I   s=2g\Ei>3$ _TE.#ufOD'peHi0%^S{g>/   ~N~N z5z5 vv~ y srkre ` Zn Rn L G Aj 9j 3 . (f f   b b     3dzK_umfpack_dl_load_symbolic___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfdl_valid_symbolic_umfpack_dl_free_symbolic_ferror_umf_l_free_fread_fclose_umf_l_malloc_fopen #1/36 1200792878 0 0 100644 2876 ` umfpack_dl_save_symbolic.o8 T__text__TEXT T$__data__DATA t__cstring__TEXT t__picsymbolstub2__TEXT0d __la_sym_ptr2__DATA __textcoal_nt__TEXT @  P US$EEE$^u E} u EE E!D$E$ E}u EED$ D$D$E$tE$EkED$ E􋀘D$D$E@h$p‹E􋀘9tE$:EED$ E􋀔D$D$E@l$‹E􋀔9tE$EED$ E􋀐D$D$E@X$‹E􋀐9tE$EiED$ E􋀐D$D$E@d$n‹E􋀐9tE$8EED$ E􋀐D$D$E@\$‹E􋀐9tE$EED$ E􋀐D$D$E@`$‹E􋀐9tE$EgED$ E@@D$D$E@D$o‹E@@9tE$<EED$ E@@D$D$E@H$‹E@@9tE$EED$ E@@D$D$E@L$‹E@@9tE$EwED$ E􋀘D$D$E@p$|‹E􋀘9tE$FE!ED$ E􋀔D$D$E@t$&‹E􋀔9tE$EE􃸌~KED$ E􋀌D$D$E@x$‹E;tE$EtE􃸼tVED$ E􋀘D$D$E􋀈$j‹E􋀘9tE$4EE$ EE$[]symbolic.umfwb_⍀_PJ⍀JP5⍀5P ⍀ Pl=Vo$Ë$ ~<v@&J-H+UF- 5   ` ZRL G Ag9g3 . (N N  55 3dtl{K_umfpack_dl_save_symbolic___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_fclose_fwrite_fopen_umfdl_valid_symbolic #1/20 1200792879 0 0 100644 2100 ` umf_zi_lhsolve.o H__text__TEXT__data__DATA__literal8__TEXT__textcoal_nt__TEXT @( PUVS`EU;t]EEEEȋEEċEEEEEEEEE;E}FEE}xUЍE<E(EEE܋E;E~U܉ЍEȋE}t*UЍ4ME؃(U؉ЍE1U܉ЍEEE;EuEUEB`EԋU܉ЍEċEEE;E|3EԋE̍EԃE؉‰Ѝ UẺ E؃EЃÍE܃EE܋E;E}U܉ЍEEE;EuEU܉ЍEċEUЃEEH`EE܉U  ED ED ED EEE;E|UЉЍEE Uf(Y UЉЍEE UDYBXE\EUЉЍEE UDf(Y UЉЍEE UYB\E\EEEЃE܉U E ED ED ED UE)U܉ЍEȋE}tAE؉‰Ѝ uUЍEE؃UЍ UE܉ E܃(EEEE܃}yU܉ЍEċE؃}E܉U  ED ED ED EU܉ЍEEUEB`EU؉ЃEUEB`EEE;E|UЉЍEM EЉE1f(Y UЉЍEM EЉED1YDXE\EUЉЍEM EЉED1f(Y UЉЍEM EЉE1YD\E\EEЃE܉U E ED ED ED E܃()E*YEE`[^] @$ü # _umfzi_lhsolve___i686.get_pc_thunk.bx#1/20 1200792887 0 0 100644 4644 ` umf_zi_uhsolve.o DD__text__TEXTT/__data__DATA __literal8__TEXT __const__DATA0@__textcoal_nt__TEXT@P @( PUWVSEU;t ݝH EEEEE@|EEEEEEEEEEEE;E|!EȉEXEȉEDPEȉE hEȉE D`݅Xݝ@X f.wf(GP f.w)Pf(fW@f.s P@f.sPf(fW^Xxxf(YPX\p`YxXh^pEhf(Yx`\^pEPf(fWX^xxYX\PphYxX`^pE`Yx\h^pEEȉU E؉ E܉D ED ED UȉЍEEă}M؍ f.uzM f.uznUȉЍEEUEB`EUĉЃEUEB`EEE;E|UЍEE UЍEu UЍEM EEf(YEEY@\D\D>EԃEEȃiEEXEEȋE;E|AEȉEpEȉEDxEȉE `EȉE Dh݅pݝ(p f.wf(/x f.w)xf(fW(f.s x(f.sx^pPPf(YxpXXhYPX`^XE`f(YPh\^XEp^xPPYpXxX`YPXh^XEhYP\`^XEEȉU E؉ E܉D ED ED Eȃ*MYȋE*YXH݅H[^_]"@ @$  C 0)  0   E 00\0B)07 J00a0G.0' @_umfzi_uhsolve___i686.get_pc_thunk.bx #1/28 1200792890 0 0 100644 1804 ` umf_zi_triplet_map_nox.o |__text__TEXT PUWV0EE;E|UЍE,EEE;E|oUЍEEUЍEE}xE;E}}x E;E } EUЍE,E뇋E$EE;E|cUE$xUЍ u$UЍE,UЍ u,UЍE$EEE;E|iUЍEЍE, MUЍ U4E UЍ u(UЍEEEE;E |UЍE,EEEE;E|UЍE$EUE$E܋EE؋EEE;E|UЍE(EUЍE,EԋE;E|UЍ U8Eԉ EMUЍ U,E؉ UЍ U8E؉ E;EtU؉Ѝ U(E E؃EKUЍ4M0UE)Љ1E}tLEE;E|;UЍ u4UЍE4ЍE8EEE;E |UЍE,EEE;E|{UЍE$EUЍ u$UЍE09E|0UЍE(EUЍE,E륍E{EEE;E |?UExUЍ uUЍE,EEE;E |,UЍ u,UЍEEEE;E|UЍE$EUЍ u$UЍE09E|]UЍE(ЍE, MUЍ U8E UЍ U E ExEKEE;E|;UЍ u4UЍE4ЍE8EEẼ0^_]_umfzi_triplet_map_nox #1/28 1200792891 0 0 100644 2268 ` umf_zi_triplet_nomap_x.o |__text__TEXT PUWV@E}@t}Dt }HtEEȉEEE;E|UЍE,EEE;E|oUЍEEUЍEE}xE;E}}x E;E } EUЍE,E뇋E$EE;E|cUE$xUЍ u$UЍE,UЍ u,UЍE$EEE;E|UЍEЍE, MUЍ u(UЍE}tJE4ME;EEE;E|UЍEEUЍE܋}UЍE܋EUX7UЍE܋}UЍE܋EUDXBD7EEE9EE;E|UЍEE}UЍE܋}UЍE܋EUX7UЍE܋}UЍE܋EUDXBD7EEE/EhEEPQEEUЍ4M̋UE)1p^_]ÐUWVĀE EЋUЍEЋE}uE @`EEEEE܋EE؋E @tEԋE E̋EEE @`EE@xEȋEEEEEEEEEUЍE̋EEE;Er;EEUЍE<uE@EċUЍEEEEEE EEUĉЍE<uE;EUĉЍEE@EE@EUEEEU‰ЃEEEEEE@EUЍE܋EEE;EEE;E|UЍEEUЍEԃ,UЍE؋EEUЍE؋MEE1XE8UЍE؋EEUЍE؋MEED1XDED8EEE;E|UЍEE}UЍEԃ,UЍE؋EEUЍE؋MEE1XE8UЍE؋E쉅|UЍE؋MEED1XD|D8EEh EEPQEEUЍ4M̋UE)1^_]ÐUWVPE 8E UЍ uUЍDE냋E;EPEE;E|<UЍEEUЍ@LHEE;E|UЍEHUЍEHEP1X8UЍEHUЍEHEPD1XDD8EEPEEE;E|UЍEE} UЍ@LHEE;E|UЍEHUЍEHEP1X8UЍEHUЍEHEPD1XDD8EEPEEEE;E|UЍEE}xsUЍ<|UЍ |U)Љ>UЍ UE E‰Ѝ uUЍDEEZE;EnEE;E|UЍEEUЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EEPEEE;E|dUЍEE}*UЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EEPEUЍED$E$ UЍE }}Dž4E;E}}uDž4E ǀ4E;EEE;E|sUЍEEUЍ<|UЍ |U)Љ>UЍ uUЍDEEE;E|UЍEE}>UЍ@<"UЍ@LHEE;E|UЍEHUЍEHEP1X8UЍEHUЍEHEPD1XDD8EUЍEEPE{EEE;E|UЍEE}xsUЍ<|UЍ |U)Љ>UЍ UE E‰Ѝ uUЍDEEZEE;E|UЍEE}\UЍ@<@UЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EUЍEEPE]dẺB 1}'Dž4E;E}}uE ǀDž44EEE;E|UЍEE}UЍD<UЍ<|UЍ |U)Љ>UЍ UE E‰Ѝ uUЍDEUЍEE$E;EnEE;E|UЍEEUЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EEPEEE;E|dUЍEE}*UЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EEPEdEЉBEEUE tE D$ED$E $E t}E EE;<|dM UЍA(E}y E؃EU E;u E uE D$ED$E$qE돋E tE D$ED$E $RE t}E $EE;8|dM UЍA,E}y E؃EU E;u E uE D$ED$E$E돁P^_]⍀Pb"$?"!! 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(    2cJ_umfzi_mem_alloc_element___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfzi_mem_alloc_tail_block_ceil#1/36 1200792899 0 0 100644 484 ` umf_zi_mem_alloc_head_block.o |__text__TEXT PU(MEPdAh)9E ~ EhE@dEMUE BdAdUEBdEEEUUEEEU;} UUUE艐EEE_umfzi_mem_alloc_head_block #1/36 1200792900 0 0 100644 820 ` umf_zi_mem_alloc_tail_block.o |__text__TEXT PUV4EEExltUE@lB`EE؉E}E;E EEEEEU E)ЃE}UE؉E@lUE MUE BlAlUE@lB`EUE؉UE BUEBwUE@hB`Eu MEPdAh)9~ EMEU @h)ЃAhUE@hB`EUE E@UE BMUEUEBdEEE܋UUԋEE؋E؋U;} UԋU؋U؋E܉EP`E)ЉEЋEEЋEЉEE4^]_umfzi_mem_alloc_tail_block#1/36 1200792900 0 0 100644 756 ` umf_zi_mem_free_tail_block.o |__text__TEXT PUV$} } uUE B`EE(uME)ЃEEEE8yuME)ЃUE@hB`9Ev>E@E)ЃEEE}yMEU)ЃEEEEEUE@hB`9EuEMEP`E)AhE@ExlEU@l;BhxE@llExluMEP`E)Al6UE@lB`EEڋE;}MEP`E)AlUEBUE؉$^]_umfzi_mem_free_tail_block#1/36 1200792900 0 0 100644 524 ` umf_zi_mem_init_memoryspace.o |__text__TEXT PUEǀEǀEǀE@lE@dUE@pBhUE@hBhUE@hB`EEǀE@EE@dEǀUE_umfzi_mem_init_memoryspace #1/28 1200792901 0 0 100644 2676 ` umf_zi_report_vector.o X__text__TEXTmd?__data__DATAmI__cstring__TEXT\__literal8__TEXTH$__const__DATAP,__picsymbolstub2__TEXT`<\ __la_sym_ptr2__DATAyU __textcoal_nt__TEXT}Y @  t P US$ED$t$?}tdEE  <f.uz+EE D$}$3$ }t0EE EEEE&EU  ED ED ED EM荃<f.uzED$$G$7M<f.w)MDf(fWD$$BM<f.zt$ED$$$$[]ÐUS$4}u}ED$$q}t@} u$WEO}y4$7E/}u}}~$ }EE} ~E EEEE;E|(ED$ ED$E D$E$UE΋E;E}rU$ED$ ED$E D$E$?}~9EE;E|(ED$ ED$E D$E$E΃}~^$}u}p$EE$[] %d : (%g) (0) (%g (0 - %gi) + 0i) + %gi) dense vector, n = %d. 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(hf hf  h}fh}f PLHD@<840,($          |d8e/hhuZT0hz`>G___i686.get_pc_thunk.bx_umfpack_zi_qsymbolic___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_zi_free_symbolic_umfpack_toc_umfzi_set_stats_umf_i_analyze_umf_i_colamd_umf_i_colamd_set_defaults_umf_i_free_umfzi_2by2_amd_aat_umfzi_transpose_sqrt_umf_i_singletons_umf_i_is_permutation_umf_i_malloc_umfzi_symbolic_usage_ceil_amd_defaults_umfpack_tic_amd_1_do_amd_prune_singletons_combine_ordering_free_work_error #1/36 1200792912 0 0 100644 9540 ` umfpack_zi_report_control.o Xuu__text__TEXT T__data__DATA {__cstring__TEXT 3 |__literal8__TEXT`__const__DATA@__picsymbolstub2__TEXTP,4$__la_sym_ptr2__DATAiEd$__textcoal_nt__TEXTmI @t$$p Pl$USd}t1EUf.ztE,EEEEE}8 D$ $ $$ED$D$<$}t>EUf.ztEݝxݝxݝx݅x]}t>EUf.ztEݝpݝpݝp݅p]ED$D$q$ED$$ED$D$$ED$Q$w}t>EUf.ztEݝhݝhݝh݅h]Mf.wMf.w2Mf.w Eݝ`ݝ`ݝ`݅`]ED$D$$}t@E U f.ztE ,\Dž\ Dž\ \EEXX} DžXXEED$D$$}t@E(U(f.ztE(,TDžT DžTTE}x}EED$D$$`}u1$LA}u$6+}uQ$ E^$ }t>E0U0f.ztE0ݝHݝHݝH݅H]MЍf.s#ED$D$q$v\MЍ1f(fW,EEDD} DžDDEED$D$$}t@E8U8f.ztE8,@Dž@ Dž@@EE<<y Dž<E`U`f.ztE`ݝ0ݝ0ݝ0݅0]Mf.wMf.w2Mf.w Eݝ(ݝ(ݝ(݅(]ED$D$ 1$}t>EhUhf.ztEhݝ ݝ ݝ ݅ ]ED$D$ q$Mf.w$5Mf.w$$}t>EpUpf.ztEpݝݝݝ݅]ED$D$$8Mf.w$ED$1$$}t>ExUxf.ztExݝݝݝ݅]M؍f.wM؍f.w2M؍f.w Eݝݝݝ݅]ED$D$$}t@E耋Uf.ztE,Dž DžE}t }tEED$D$,$p}u@$\*}uQ$F}u$0$"}tEEUˆf.ztEݝ ݝ ݝ݅]Mȍf.wݝ Eݝ݅]Mȍf.s#ED$D$$O\Mȍ1f(fW,EE} DžEED$D$$ }tEEUf.ztEݝݝݝ݅]ED$D$I$n }tEEU˜f.ztEݝݝݝ݅]ED$D$q$ Mf.uz$ $ $ D$$ $ D$ 1$l D$ $V D$ $@ D$1$( D$,D$$!D$!D$!D$ !D$q$ d[]UMFPACK V4.4 (Jan. 28, 2005) %s, Control: Matrix entry defined as: double complex Int (generic integer) defined as: int %d: print level: %d %d: dense row parameter: %g "dense" rows have > max (16, (%g)*16*sqrt(n_col) entries) %d: dense column parameter: %g "dense" columns have > max (16, (%g)*16*sqrt(n_row) entries) %d: pivot tolerance: %g %d: block size for dense matrix kernels: %d %d: strategy: %d (symmetric) Q = AMD (A+A'), Q not refined during numerical factorization, and diagonal pivoting (P=Q') attempted. (unsymmetric) Q = COLAMD (A), Q refined during numerical factorization, and no attempt at diagonal pivoting. (symmetric, with 2-by-2 block pivoting) P2 = row permutation that tries to place large entries on the diagonal. Q = AMD (P2*A+(P2*A)'), Q not refined during numerical factorization, attempt to select pivots from the diagonal of P2*A. (auto) %d: initial allocation ratio: %g %d: initial allocation (in Units): %d %d: max iterative refinement steps: %d %d: 2-by-2 pivot tolerance: %g %d: Q fixed during numerical factorization: %g (yes) (no) (auto) %d: AMD dense row/col parameter: %g no "dense" rows/columns "dense" rows/columns have > max (16, (%g)*sqrt(n)) entries Only used if the AMD ordering is used. %d: diagonal pivot tolerance: %g Only used if diagonal pivoting is attempted. %d: scaling: %d (no) (divide each row by sum of abs. values in each row) (divide each row by max. abs. value in each row) %d: frontal matrix allocation ratio: %g %d: initial frontal matrix size (# of Entry's): %d %d: drop tolerance: %g %d: AMD and COLAMD aggressive absorption: %g (yes) (no) The following options can only be changed at compile-time: %d: BLAS library used: Fortran BLAS. %d: compiled for ANSI C (uses malloc, free, realloc, and printf) %d: CPU timer is POSIX times ( ) routine. %d: compiled for normal operation (debugging disabled) unknown computer/operating system: %s size of int: %g long: %g Int: %g pointer: %g double: %g Entry: %g (in bytes) ???ffffff?{Gz?$@MbP??0@ @@⍀P]$Ë$  z 0j 0Z 0J 0: (* $  @       @          l a Y /    X  [ S  @     { k * "     `  O  ;S K !  bZTL@91  naYG<4 @~aL5 4,@}C;m,$`@aYgR;` zP@K x rj `    iUiU 4mqeL_umfpack_zi_report_control___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/28 1200792913 0 0 100644 25580 ` umfpack_zi_report_info.o| GG__text__TEXT*I$__data__DATA*U-__cstring__TEXT*X-__literal8__TEXTFP8I__picsymbolstub2__TEXTFIb__la_sym_ptr2__DATA GIc__textcoal_nt__TEXT GI @cXcx PcUS4EEEEMFf.wM荃Ff.+ED$*$FMFf.sED$E $^F*$NFM荃Ff.sED$E $!F*$FMFf.swM荃Ff.s`MFf.uz%E^EEFYEE F]E\$*$E*$uE4[]ÐUSm}t7EUf.ztE,DDžD DžDDX} (X(`)D$})$D)$D)$D *$D4*$DM*$Dt*$D*$yD*$kDE ,dE ,``@@;d~ d@@\*dEf.wdD$*$C*`Ef.w`D$-+$CE ,*ȍEf.w E ,D$m+$oCE ,*ȍEf.w E ,D$+$-CE ,*ȍEf.w E ,D$+$BE (,*ȍEf.w E (,D$-,$BE 0,*ȍEf.w E 0,D$m,$gBE 8,*ȍEf.w E 8,D$,$%BE %Ef.zt,$A^E -Ef.zt--$A.E 5Ef.ztm-$AE -Ef.zt-$iA^E Ef.zt-$9A.E 5Ef.zt-.$ AE -Ef.ztm.$@.E Ef.zt.$@E Ef.zt.$}@.E -Ef.zt-/$M@E U f(X E U Xf.u/z-E U f(X Ef.w-E U XD$m/$?E @U @f.uzE @Ef.wE @D$/$a?E PU Pf.uzE PEf.wE PD$-0$ ?E HU Hf.uzE HEf.wE HD$m0$>E XU Xf.uzE XEf.wE XD$0$e>E ,TT~0$8>Tu-1$>E hhEf.sm1$=hhf.uzhEf.whD$1$=E U f.uzE Ef.w E D$1$:=E U f.uzE Ef.w E D$-2$<E U f.uzE Ef.w E D$m2$<E Ef.sBhEf.w(E ^hD$2$ <E U ˜f.uzE Ef.w E D$2$;E U  f.uzE Ef.w E D$m3$f;E U ¨f.uzE Ef.w E D$3$ ;E U °f.uzE Ef.w E D$3$:E U ¸f.uzE Ef.w E D$-4$O:E Ef.sBhEf.w(E ^hD$m4$9E -Ef.ztE 8H4$9E (U (f.uzE (Ef.w E (D$4$M9E  U f.uzE  Ef.w E  D$-5$8Hf(YHHYHf.u&z$Hf(YHEf.w$HYHD$m5$|8HHf.uzHEf.wHD$5$08E 0U 0f.uzE 0Ef.w E 0D$5$7E xEE EE `U `f.uzE `Ef.wE `D$-6$_7E hU hf.uzE hEf.wE hD$m6$ 7E h=EYȍEEf(^ЋE h=EYȍEE^f(f.u8z6E h=EYȍEE^ȍEf.w>E h=EYȍEE^f(D$6$;6E pU pf.uzE pEf.wE pD$6$5E p=EYȍEEf(^ЋE p=EYȍEE^f(f.u8z6E p=EYȍEE^ȍEf.w>E p=EYȍEE^f(D$-7$5MEf.uzMEf.wED$m7$4MEf.uzMEf.wED$7$4E  Ef.zt7$i4E  -Ef.zt^7$64-8$(4E (D$m8$4E 0D$8$3|E  5Ef.zt\7$38$3E (D$-9$3E 0D$m9$j3E `Ef.sE Ef.s*9$$39$3 :$3E hD$E D$9:D$A:$E pD$E D$9:D$Z:$E xD$E D$9:D$p:$dE @D$E D$9:D$:$(E @=EYȍEE^f(D$E =EYȍEE^f(D$:D$:$E HD$E D$9:D$:$pE H=EYȍEE^f(D$E =EYȍEE^f(D$:D$:$E PD$E D$:D$;$E EE EMEf.s<M荃Ef.s%Ef(XM*\\f(EMEEE XE؋E `EM؍Ef.s<MЍEf.s%Ef(XM*\\f(EMEEED$ED$9:D$;$ED$ED$9:D$7;$TED$ED$9:D$O;$&E D$E D$9:D$i;$E D$E D$9:D$;$E D$E D$9:D$;$rE EE XEE PEE HU Hf.uzE HEf.w E HD$;$-E PU Pf.uzE PEf.w E PD$ <$u-E `U `f.uzE `Ef.w E `D$M<$-E hU hf.uzE hEf.w E hD$<$,E pU pf.uzE pEf.w E pD$<$^,E xU xf.uzE xEf.w E xD$ =$,E U f.uzE Ef.w E D$M=$+E 8U 8f.uzE 8Ef.w E 8D$=$G+E @U @f.uzE @Ef.w E @D$=$*E U f.uzE Ef.w E D$ >$*E U f.uzE Ef.w E D$M>$0*E U f.uzE Ef.w E D$>$)E U f.uzE Ef.w E D$>$v)E U f.uzE Ef.w E D$ ?$)E U f.uzE Ef.w E D$M?$(MEf.uzMEf.wED$?$|(MEf.uzMEf.wED$?$<(MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$ @$t'MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$M@$&MEEEEMEf.s1MEf.sEXEEMEf.uzMEf.wED$@$&MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$@$H%MEpMEf.sOMEf.s5EXEpppf.uzpEf.wpD$ A$$MEf.wpEf.wMUEYf(^pMUEY^pf.u1z/MUEYf(^pEf.w/MUEY^pD$MA$#E EE xE EMEf.uzMEf.wED$A$W#E U €f.uzE Ef.w E D$A$"E U ˆf.uzE Ef.w E D$ B$"E U f.uzE Ef.w E D$MB$@"E U ˜f.uzE Ef.w E D$B$!MEf.uzMEf.wED$B$!xxf.uzxEf.wxD$ C$W!MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$MC$ MEf.wxEf.wMUEYf(^xMUEY^xf.u1z/MUEYf(^xEf.w/MUEY^xD$C$MEf.sfMEf.sOEXEEMEf.uzMEf.wED$C$;MEf.sKMEf.s1MEf.sEXEEMEf.uzMEf.wED$ D$MEf.wMEf.wMUEYf(^UMUEY^Ef.u.z,MUEYf(^MEf.w,MUEY^ED$MD$xEf.sopEf.sRMEf.s8pXEpppf.uzpEf.wpD$D$!MEf.wpEf.wMUEYf(^pMUEY^pf.u1z/MUEYf(^pEf.w/MUEY^pD$D$JE$<[] %-27s - %5.0f%% - UMFPACK V4.4 (Jan. 28, 2005) %s, Info: matrix entry defined as: double complex Int (generic integer) defined as: int BLAS library used: Fortran BLAS. MATLAB: no. CPU timer: POSIX times ( ) routine. number of rows in matrix A: %d number of columns in matrix A: %d entries in matrix A: %d memory usage reported in: %d-byte Units size of int: %d bytes size of long: %d bytes size of pointer: %d bytes size of numerical entry: %d bytes strategy used: symmetric strategy used: unsymmetric strategy used: symmetric 2-by-2 ordering used: amd on A+A' ordering used: colamd on A ordering used: provided by user modify Q during factorization: no modify Q during factorization: yes prefer diagonal pivoting: no prefer diagonal pivoting: yes pivots with zero Markowitz cost: %0.f submatrix S after removing zero-cost pivots: number of "dense" rows: %.0f number of "dense" columns: %.0f number of empty rows: %.0f number of empty columns %.0f submatrix S square and diagonal preserved submatrix S not square or diagonal not preserved pattern of square submatrix S: number rows and columns %.0f symmetry of nonzero pattern: %.6f nz in S+S' (excl. diagonal): %.0f nz on diagonal of matrix S: %.0f fraction of nz on diagonal: %.6f 2-by-2 pivoting to place large entries on diagonal: # of small diagonal entries of S: %.0f # unmatched: %.0f symmetry of P2*S: %.6f nz in P2*S+(P2*S)' (excl. diag.): %.0f nz on diagonal of P2*S: %.0f fraction of nz on diag of P2*S: %.6f AMD statistics, for strict diagonal pivoting: est. flops for LU factorization: %.5e est. nz in L+U (incl. diagonal): %.0f est. largest front (# entries): %.0f est. max nz in any column of L: %.0f number of "dense" rows/columns in S+S': %.0f symbolic factorization defragmentations: %.0f symbolic memory usage (Units): %.0f symbolic memory usage (MBytes): %.1f Symbolic size (Units): %.0f Symbolic size (MBytes): %.0f symbolic factorization CPU time (sec): %.2f symbolic factorization wallclock time(sec): %.2f matrix scaled: no matrix scaled: yes (divided each row by sum of abs values in each row) minimum sum (abs (rows of A)): %.5e maximum sum (abs (rows of A)): %.5e (divided each row by max abs value in each row) minimum max (abs (rows of A)): %.5e maximum max (abs (rows of A)): %.5e symbolic/numeric factorization: upper bound actual %% variable-sized part of Numeric object: %20.0f initial size (Units) peak size (Units) final size (Units)Numeric final size (Units) %20.1fNumeric final size (MBytes)peak memory usage (Units)peak memory usage (MBytes) %20.5enumeric factorization flopsnz in L (incl diagonal)nz in U (incl diagonal)nz in L+U (incl diagonal)largest front (# entries)largest # rows in frontlargest # columns in front initial allocation ratio used: %0.3g # of forced updates due to frontal growth: %.0f number of off-diagonal pivots: %.0f nz in L (incl diagonal), if none dropped %.0f nz in U (incl diagonal), if none dropped %.0f number of small entries dropped %.0f nonzeros on diagonal of U: %.0f min abs. value on diagonal of U: %.2e max abs. value on diagonal of U: %.2e estimate of reciprocal of condition number: %.2e indices in compressed pattern: %.0f numerical values stored in Numeric object: %.0f numeric factorization defragmentations: %.0f numeric factorization reallocations: %.0f costly numeric factorization reallocations: %.0f numeric factorization CPU time (sec): %.2f numeric factorization wallclock time (sec): %.2f numeric factorization mflops (CPU time): %.2f numeric factorization mflops (wallclock): %.2f symbolic + numeric CPU time (sec): %.2f symbolic + numeric mflops (CPU time): %.2f symbolic + numeric wall clock time (sec): %.2f symbolic + numeric mflops (wall clock): %.2f solve flops: %.5e iterative refinement steps taken: %.0f iterative refinement steps attempted: %.0f sparse backward error omega1: %.2e sparse backward error omega2: %.2e solve CPU time (sec): %.2f solve wall clock time (sec): %.2f solve mflops (CPU time): %.2f solve mflops (wall clock time): %.2f total symbolic + numeric + solve flops: %.5e total symbolic + numeric + solve CPU time: %.2f total symbolic + numeric + solve mflops (CPU): %.2f total symbolic+numeric+solve wall clock time: %.2f total symbolic+numeric+solve mflops(wallclock) %.2f Y@@?@ @0Aư> ⍀PF$Ë$**F**`F~*Fi*FO*F,*F *F)F)F)) F)F[)FA)F$)F))E(F(F(F(F(Fs(FY(FN(F(E+(F'F'F'F''`E'FV'F?'F4',' E'F&F&F&F&F&Fh&F]&U&D<&F'&F&F%F%F%F%F%%Do%FI%A%`D&%F %% D$F$$C$FO$G$C%$F##`C#F## Cr#F##B"F"F"F"F"Fp"FS"FH"@"B""F!F!F!F!!`B!Fn!FW!F7!F!F!F F  B F~ Fd FF F@ 8 A F FFFFFFxpAWFBF+F FFFF`AFph AMF0(@F@Fvn`@LF @F?F_W?5F`?F ?{FH@>F>F`>dF1) >F=Fwo=MF`=F.=x;NF=<; <;<;<;zr<h;CF FFFFqFD<<2<s<5<FFFFY<z;PH=<>5<&FFFF<;<;\T;J; ;;;;@;FFz;bZ:B::4,9F@::99F{y9gFUM@92F 9F8FFFFqFMF?F#FF8F@8FFiF[FMF)FFFF8F7eF7F@7Fph7BF  6 F  6u FB : @6 F  6 F F  5s F@ 8 5 F  @5 F ~ 5\ F) ! 4 F  @4 F~ Fl d 4B F  3 F  3 FU M @3/ F  3F22@2_F3+2 F1F@1cF7/1F0Fog0SFA9@0%F 0F/F/F{@/gFUM/9F%. F.F@.F}.[FC;-F-F@-F}u-SF;3,F ,FyG,sk ,e],WO+IA+;3+-%`+ + +* wo* g_* MF 7F F F F * F * lF aY* >F 'F    GF GF j1 GGbI___i686.get_pc_thunk.bx_umfpack_zi_report_info___i686.get_pc_thunk.axdyld_stub_binding_helper_printf_print_ratio#1/36 1200792914 0 0 100644 4108 ` umfpack_zi_report_matrix.o X% % __text__TEXT_ ___data__DATA_; __cstring__TEXT`< __literal8__TEXT __const__DATA __picsymbolstub2__TEXT  __la_sym_ptr2__DATA  ,__textcoal_nt__TEXT  @<xl P4US}E}$t1E$U$f.ztE$,EEEEE} E} t QEXEE EEEXEQEEEE EE D$ ED$ED$q$'}~} ~$ ER}u$E2UЍEE̋ẺD$$}y$EE8t3D$ ED$D$$fE}u2$FE}E}~F$EE;E|vU܉ЍE<y!E܉D$H$E%U܉ЍE;E~!E܉D$]$EE܃EE;E|`U܉EHU܉ЍE)ЉE؃}y(E܉D$ED$$5E|E܃떋EEEE;E|$} EȉEU܉ЍEEċU܉EEUċE)ЉE؃}~4E؉D$ED$EĉD$ E܉D$ED$$EEĉEЋE;E|WUЉЍEE}~ED$ED$$:}8}.$}t0EЍEEEЍEE&EЉU ED ED ED EM荃f.uzED$$ $zMf.w)Mf(fWD$$<BMf.zt$ED$$}x E;E}6E܉D$ED$ ED$ED$1$EE;E6E܉D$ED$ ED$ED$q$E}~F$`}u/EċU)‰Ѓ u } ~}~$1E(EEԍEЃ}u&} u } ~}~$E(E܃EȉE}~ED$$$EEĄ[]columnrow%s-form matrix, n_row %d n_col %d, ERROR: n_row <= 0 or n_col <= 0 ERROR: Ap missing nz = %d. ERROR: number of entries < 0 ERROR: Ap [%d] = %d must be %d ERROR: Ai missing ERROR: Ap [%d] < 0 ERROR: Ap [%d] > size of Ai ERROR: # entries in %s %d is < 0 %s %d: start: %d end: %d entries: %d %s %d : (%g (0 - %gi) + 0i) + %gi) ERROR: %s index %d out of range in %s %d ERROR: %s index %d out of order (or duplicate) in %s %d ... ... %s-form matrix OK ⍀P $Ë$H@:2U|t>6@-&zrjK qiVNlWUA [SG? `ggz`        3 ! dK_umfpack_zi_report_matrix___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf #1/36 1200792920 0 0 100644 13740 ` umfpack_zi_report_numeric.o X$$__text__TEXTq&f__data__DATAqM__cstring__TEXTd \__literal8__TEXT"%__const__DATA# %__picsymbolstub2__TEXT #%20__la_sym_ptr2__DATA# &3__textcoal_nt__TEXT$& @4 4 P3USt} t1E U f.ztE ,EEEEȉE} Eut$_#EEЋEЉ$5#u$<#E8EЋEEЋEEEċE;E}EEċEĉEEEE;E~EEEEEЋEԋEEMUЃ MUЃ EUԉЃ EE EEEЃxXtEEEE܋EЋ@pMEЋЃE؃}ED$ED$$"E@D$$!E@D$$!H$!EЃxXu\$!EЃxXuHt$!E@0D$$s!E@8D$$W!OEЃxXuF4$>!E@0D$t$"!E@8D$$!$ E@ D$$ E@(D$4$ E؉D$t$ ERP,$d$]M"^f(D$$i EЋD$$N EЋRP,$d$]M"^f(D$4$ EЋD$t$EЋD$$EЋD$$EЋD$4$EЋD$t$EЋD$$dEЋD$$IEЋD$4$.EЋD$t$ED$$EЋD$$E@@D$4$E@HD$t$E@PD$$D$E$DE}u$_E[EЃEЃt}~$4$#}~t$ }~$D$D$ED$ D$EЋD$E$w}~$}~$D$ED$ ED$EЋ@tD$E$ tE$EZ}~$>D$ED$ ED$EЋ@xD$E$tE$EED$ED$EЉ$Iu%E$S$EED$ED$EЉ$u"E$ $E}~! $cD$D$ED$ D$EЋD$E$E$}~2 $ H $EẼt[]UVSpEEEEEEEE܋EE؋EE̋EEE}~s$yE EE;E|}~EEUЍE̋EUЍE؋EUEB`EUЃEUEB`EUЍEЃ(~EE}u$E(}~ED$$}~ED$$EE;E|UЍEE}~ED$$I} EE f.uz&EED$$$$EELf.w5EELf(fWD$($ZEELf.zt0$\%EEDD$7$5E;E~ E;E} E}~$}u } u} ~?$E(ELE\EEE;E|!}~EEUЍE̋EEEȃ}t EEUЍEЃ(~EE}u$OE(}~ED$$.UЍE܋E}}~+ED$UЍE D$S$E}u2}~,E;E}$}xUЍE ;EuEEEԃ}u EUЍ4M E(UЍE 1UЍE؋Eă}y EUĉЃEEUEB`E}}%EUE;Pp~ Ee}~h}~EĉD$s$UEB`EEE;E|-E‰Ѝ U E EEEɃ}~ED$$T}t}~$:}~$&EE;E|tUЍE E}~ED$$}Ef.uzED$$$$EHf.w,EHf(fWD$($NHEHf.zt0$"E@D$7$E;E~ E;E} Eq}~$E}u } u} ~?$E(EE}~$EEp[^]ÐUWVS|EEEEEEE@|EЋEE̋EEEEă}~.$E EE}~CEE;E|2U܉Ѝ4} MU܉Ѝ7E܃ă}~ED$ED$$}EEE;E}5}~EĉEUЍEEUЍE̋E}y EEE}tEUЃEEEEUEB`E}~%EUE;Pp~ EIEE;E|wU܉ЍE Eԃ}~EԉD$$n}Ef.uzED$$.$EHf.w,EHf(fWD$$HEHf.zt$E@D$$E;E~ E;E} E }~ $^E}u } u} ~$8E(E܃|UȍEȃ(~EĉE}uh$E(}~}~ED$$}}EE}~ED$$UЃUE;Pp~ E UEB`EEE;E|U܉Ѝ U E؋ E؃E܃΃}~}~ED$ $ UE)}y EUЍEЋE}t}~ED$ED$.$}x E;E E0E‰Ѝ u UЍE EUЍ U E }~ED$N$=E(EE}y}~EĉEUЍEEUЍE̋EUEB`EUЃEUEB`EUȍEȃ(~EĉE}uh$E(}~ED$Z$h}~ED$$MEE;E|U܉ЍEEԃ}~EԉD$g$ } E܉E f.uz&E܉ED$$ $ E܉ELf.w5E܉ELf(fWD$$Q ZE܉ELf.zt$ %E܉EDD$$ E;E~ E;E} Eq}~ $ }u } u} ~$ E(E܃OE(aEĉE}~ $p EE|[^_]Numeric object: ERROR: LU factors invalid n_row: %d n_col: %d relative pivot tolerance used: %g relative symmetric pivot tolerance used: %g matrix scaled: noyes (divided each row by sum abs value in each row) minimum sum (abs (rows of A)): %.5e maximum sum (abs (rows of A)): %.5eyes (divided each row by max abs value in each row) minimum max (abs (rows of A)): %.5e maximum max (abs (rows of A)): %.5e initial allocation parameter used: %g frontal matrix allocation parameter used: %g final total size of Numeric object (Units): %d final total size of Numeric object (MBytes): %.1f peak size of variable-size part (Units): %d peak size of variable-size part (MBytes): %.1f largest actual frontal matrix size: %d memory defragmentations: %d memory reallocations: %d costly memory reallocations: %d entries in compressed pattern (L and U): %d number of nonzeros in L (excl diag): %d number of entries stored in L (excl diag): %d number of nonzeros in U (excl diag): %d number of entries stored in U (excl diag): %d factorization floating-point operations: %g number of nonzeros on diagonal of U: %d min abs. value on diagonal of U: %.5e max abs. value on diagonal of U: %.5e reciprocal condition number estimate: %.2e ERROR: out of memory to check Numeric object Scale factors applied via multiplication Scale factors applied via division Scale factors, Rs: Scale factors, Rs: (not present) P: row Q: column ERROR: L factor invalid ERROR: U factor invalid diagonal of U: Numeric object: OK L in Numeric object, in column-oriented compressed-pattern form: Diagonal entries are all equal to 1.0 (not stored) ... column %d: length %d. row %d : (%g (0 - %gi) + 0i) + %gi) ... remove row %d at position %d. add %d entries. length %d. Start of Lchain. U in Numeric object, in row-oriented compressed-pattern form: Diagonal is stored separately. row %d: length %d. End of Uchain. col %d : row %d: length %d. End of Uchain. remove %d entries. add column %d at position %d. length %d. row %d: col %d : 0A⍀P⍀P⍀P⍀P|wo⍀oPc^Z⍀ZPJEE⍀EP1,0⍀0P-#F#_#x#####$Ë$[Sr%,!rr$!r!r"rzr!r^#r;"r$!r  !r"r"r~v rc["rB: r"r"r"r,$c"rT"r r,!rmer;3$!r!r"r!r#r"r!r !rt"r]UJ"rNF "r!rn LD,!$!!"}u!a#G"91!)! !"  !    !w o r!  `!  @!  | t   ,!    $!o g !S ": 2 ! # "  !  ! " z !> 6 #    RJ`  T > h`- KC =.   m^3+    @ ld UB: & @    @ z g_ LD 1)@    @ " }u bZ B"  @     @ tl XP <4 h T      }ld  $#$# $#$# ####~ y s##k##e ` Z#p#R#p#L G A#W#9#W#3 . (#># #>#  #%##%#      d4$ $eqL_umfpack_zi_report_numeric___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_i_free_umf_i_report_perm_umfzi_report_vector_umf_i_malloc_umfzi_valid_numeric_printf_report_L_report_U #1/28 1200792920 0 0 100644 1252 ` umfpack_zi_report_perm.o __text__TEXT0__data__DATA__picsymbolstub2__TEXTKH__la_sym_ptr2__DATA __textcoal_nt__TEXT* @Px PUH}t1EUf.ztE,EEEEE} EeD$EE}}EE$vED$ED$ ED$E D$E$2EE$ EEE8F⍀FP$1⍀1P ⍀P${G A93 . (    JiV1_umfpack_zi_report_perm___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_i_free_umf_i_report_perm_umf_i_malloc#1/36 1200792920 0 0 100644 4804 ` umfpack_zi_report_status.o8 ) T) __text__TEXTTG__data__DATA__cstring__TEXTd __picsymbolstub2__TEXT X__la_sym_ptr2__DATA q__textcoal_nt__TEXT! u @4l PUS$}t1EUf.ztE,EEEEE}?} u }.$ }~D$$l }~D$|$N }~D$|$0 }~ D$|$ T D$q $ E E}}E} }}q*}+}}}tv}}}ts}t} }t6}tv $N z $; $( $ $ 4 $ ut $ e $ U $ E $ 5 $ %T $ E D$ $x $j $[] UMFPACK: Copyright (c) 2005 by Timothy A. Davis. All Rights Reserved. %s UMFPACK License: Your use or distribution of UMFPACK or any modified version of UMFPACK implies that you agree to this License. This library is free software; you can redistribute it and/or modify it under the terms of the GNU Lesser General Public License as published by the Free Software Foundation; either version 2.1 of the License, or (at your option) any later version. This library is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU Lesser General Public License for more details. You should have received a copy of the GNU Lesser General Public License along with this library; if not, write to the Free Software Foundation, Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301 USA %s Permission is hereby granted to use or copy this program under the terms of the GNU LGPL, provided that the Copyright, this License, and the Availability of the original version is retained on all copies. User documentation of any code that uses this code or any modified version of this code must cite the Copyright, this License, the Availability note, and 'Used by permission.' Permission to modify the code and to distribute modified code is granted, provided the Copyright, this License, and the Availability note are retained, and a notice that the code was modified is included. Availability: http://www.cise.ufl.edu/research/sparse/umfpack UMFPACK V4.4 (Jan. 28, 2005)%s: OK WARNING: matrix is singular ERROR: out of memory ERROR: Numeric object is invalid ERROR: Symbolic object is invalid ERROR: required argument(s) missing ERROR: dimension (n_row or n_col) must be > 0 ERROR: input matrix is invalid ERROR: system argument invalid ERROR: invalid permutation ERROR: pattern of matrix (Ap and/or Ai) has changed INTERNAL ERROR! Input arguments might be corrupted or aliased, or an internal error has occurred. Check your input arguments with the umfpack_*_report_* routines before calling the umfpack_* computational routines. Recompile UMFPACK with debugging enabled, and look for failed assertions. If all else fails please report this error to Tim Davis (davis@cise.ufl.edu). ERROR: Unrecognized error code: %d ⍀P $Ë$  qi` aY QI A9 1) !  @      } `         vn      3! % dK_umfpack_zi_report_status___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/36 1200792921 0 0 100644 6812 ` umfpack_zi_report_symbolic.o| II__text__TEXTk__data__DATAk __cstring__TEXT __literal8__TEXT8__picsymbolstub2__TEXT}H__la_sym_ptr2__DATA-__textcoal_nt__TEXTA @T  P, US} t1E U f.ztE ,EEEEE؃} Eq$EEE$wu$~EEEEEEEE@@EEEE@PEE@TE܋E@DEE@HEE@LEE@XEE@\EE@`EE@dE}<$ED$ED$$ED$$ED$ $Q $vEu $\6Eu $@Eu $$ $ $Eu $ 6Eu $ Eu $ $  $ EtB $ F $p Q $b EtF $H B $8 $* EH Yȍ^f(D$ E@ D$ $ EYȍ^f(D$ ED$ $ EHYȍ^f(D$ E@D$Q $N EHYȍ^f(D$ E@D$ $ $ ED$1 $ ED$Q $ ED$ $ E܉D$ $ EEEE;E|UЉЍEEȋUЉEEă}~#EĉD$ EȉD$EЉD$ $) }~:UЉЍED$UЉЍED$Q $ EȉE̋E;E~ỦЍEE}~0EEԃD$EԉD$ ED$ẺD$ $ }~MỦED$ỦЍEЍED$ $8 }~$ỦЍED$ $ }~$ỦЍED$1$ }~R$ ỦЍE<u}~:_$ *}~$ỦЍED$h${ E}uE9E} }uE}t}~#m$< EUẼDUЍE<t1}~+UЍED$ED$$}t EЃAD$EEE;E}EEE$uE}u$E}~$pD$E؉D$ ED$E@hD$E$E}~Q$.D$E؉D$ ED$E@lD$E$EE$}u}u E)}~p$$EEĤ[]Symbolic object: ERROR: invalid matrix to be factorized: n_row: %d n_col: %d number of entries: %d block size used for dense matrix kernels: %d strategy used: symmetricunsymmetricsymmetric 2-by-2 ordering used: colamd on A amd on A+A' provided by user performn column etree postorder: no yes prefer diagonal pivoting (attempt P=Q): variable-size part of Numeric object: minimum initial size (Units): %.20g (MBytes): %.1f estimated peak size (Units): %.20g (MBytes): %.1f estimated final size (Units): %.20g (MBytes): %.1f symbolic factorization memory usage (Units): %.20g (MBytes): %.1f frontal matrices / supercolumns: number of frontal chains: %d number of frontal matrices: %d largest frontal matrix row dimension: %d largest frontal matrix column dimension: %d Frontal chain: %d. Frontal matrices %d to %d Largest frontal matrix in Frontal chain: %d-by-%d Front: %d pivot cols: %d (pivot columns %d to %d) pivot row candidates: %d to %d leftmost descendant: %d 1st new candidate row : %d parent: (none) %d ... Front: %d placeholder for %d empty columns ERROR: out of memory to check Symbolic object Initial column permutation, Q1: Initial row permutation, P1: Symbolic object: OK @0AKx⍀xP72c⍀cPN⍀NP9⍀9P$⍀$P!$Ë$TLF> ` xi/'|wian@8a,$@ } '`  nf YQ D<` /'@    ` xp K=0(  Q U ` U Q vn h` ZR >6 "      `  qi\T@8og  y s=k=e ` Z9R9L G A5953 . (1 1  --  5AEfrM_umfpack_zi_report_symbolic___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_i_free_umf_i_report_perm_umf_i_malloc_umfzi_valid_symbolic_printf #1/36 1200792921 0 0 100644 2684 ` umfpack_zi_report_triplet.o X__text__TEXTt9__data__DATAtP__cstring__TEXT\__literal8__TEXTd__const__DATAl__picsymbolstub2__TEXT|l __la_sym_ptr2__DATA __textcoal_nt__TEXT @  p P UST} Ẽ}$t1E$U$f.ztE$,EEEEĉE} EED$ E D$ED$t$}t}u$E}~} ~$E}y$Ek}~$}EЋEEEE;E|U܉ЍEE؋U܉ЍEEԃ}~#EԉD$ E؉D$E܉D$ $}*} }t0E܍EEE܍E E&E܉U ED ED ED EM荃|f.uzED$$p$`M|f.w)Mf(fWD$"$"BM|f.zt*$ED$1$}~$}xE;E}}x E;E }9$E`}u } u} ~R$uE(E܃EE}~[$Jt$<EEȃT[]triplet-form matrix, n_row = %d, n_col = %d nz = %d. ERROR: indices not present ERROR: n_row or n_col is <= 0 ERROR: nz is < 0 %d : %d %d (%g (0 - %gi) + 0i) + %gi)ERROR: invalid triplet ... triplet-form matrix OK [⍀PG$Ë$`X RJg '^ E  = 6  zr. ^ G <4* ,$%           4eL_umfpack_zi_report_triplet___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/36 1200792921 0 0 100644 964 ` umfpack_zi_report_vector.o __text__TEXT__data__DATA__picsymbolstub2__TEXT__la_sym_ptr2__DATA__textcoal_nt__TEXT @ <d PU8}t1EUf.ztE,EEEEE} E3D$D$ED$ ED$E D$E$EEj⍀PV$  L3_umfpack_zi_report_vector___i686.get_pc_thunk.axdyld_stub_binding_helper_umfzi_report_vector#1/28 1200792922 0 0 100644 2900 ` umfpack_zi_solve.o8 NTN__text__TEXTiT__data__DATAi__literal8__TEXTp(__picsymbolstub2__TEXT$__la_sym_ptr2__DATA. __textcoal_nt__TEXTF @ P UST$}0t@E08U08f.ztE08,Dž Dž}4tKE4DžPU~{ a ȍ(DžY~- a ȋi iE,$u#qDž*ꀋ*;t#yDžc ; |=HPif.zt HPBPf.uz Dž}t}$u#Dž}~ Dž~  ЉD$ $D$$t u?a$$yDžD$4D$0D$,D$(D$$E(D$ E D$ED$E$D$ED$ED$ ED$E D$E$$$*x<$x T[]*c⍀POJ|⍀|P61g⍀gPR⍀RP=⍀=P(⍀(P "$Ë$M?)px*xiY:x xpp  BB~ y s>k>e ` Z:R:L G A6963 . (2 2  ..  +FJv\iC_umfpack_zi_solve___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_toc_umfzi_solve_umf_i_free_umf_i_malloc_umfzi_valid_numeric_umfpack_tic#1/28 1200792922 0 0 100644 900 ` umfpack_zi_symbolic.o zz__text__TEXTY__data__DATAYi__picsymbolstub2__TEXTYi__la_sym_ptr2__DATAr__textcoal_nt__TEXTv @` PUHEE(D$$E$D$ E D$ED$ED$ED$ED$ ED$E D$E$⍀Pf$S r^r^ vG._umfpack_zi_symbolic___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_zi_qsymbolic #1/28 1200792922 0 0 100644 1292 ` umfpack_zi_transpose.o JJ__text__TEXT\__data__DATA__picsymbolstub2__TEXTKt__la_sym_ptr2__DATA: J__textcoal_nt__TEXTFV @4|t PUhE EE;E}EEEEEE}}EEED$E$E}u EE8D$  >   :: FHeT/_umfpack_zi_transpose___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_i_free_umfzi_transpose_umf_i_malloc#1/36 1200792924 0 0 100644 2724 ` umfpack_zi_triplet_to_col.o __text__TEXTS__data__DATASc__picsymbolstub2__TEXTSc$__la_sym_ptr2__DATA__textcoal_nt__TEXT @P P U}(t}$t }t}u E!}~} ~ E}y EE EE;E}EEEEEE},t }tEEE}thD$E$EE} t }0tEEEȃ}tEEЉEE}u EF}4EE}t6D$E$E؃}uEЉ$kED$E$bED$E$IED$E$3ED$E$E}t}t }t}uNEЉ$E؉$E$E$E$E$E2}}E؉D$HE4D$DẺD$@E0D$$Ë$M > 3         | W L = &      _ T E . #     u j [ D 9       s \ Q 4 tiLm1& I>!aV9|qZ/${PE6mbB^S{g>/ s  f6f6 bb ^^~ y sZ kZ e ` ZV RV L G AR 9R 3 . (N N   J J     2jnxcJ_umfpack_zi_load_numeric___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfzi_valid_numeric_umfpack_zi_free_numeric_ferror_umf_i_free_fread_fclose_umf_i_malloc_fopen #1/36 1200792926 0 0 100644 2868 ` umfpack_zi_save_numeric.o8 T__text__TEXT.T"__data__DATA.__cstring__TEXT.__picsymbolstub2__TEXT=d __la_sym_ptr2__DATA __textcoal_nt__TEXT @  P USDEEE$ku E} u "EE E.D$E$E}u EED$ D$D$E$tE$EyED$ EEE􋀴EEU;~ UUED$D$E􋀤$TE܋EEԋE􋀴E؋E؋U;~ UԋU؋E؃9EtE$EED$ E􋀰D$D$E@t$‹E􋀰9tE$E|ED$ E􋀴D$D$E@x$‹E􋀴9tE$JE&ED$ E􋀜D$D$E􋀀$'‹E􋀜9tE$EED$ E􋀜D$D$E􋀈$‹E􋀜9tE$EtED$ E􋀜D$D$E􋀄$u‹E􋀜9tE$?EED$ E􋀜D$D$E@|$‹E􋀜9tE$EED$ E􋀜D$D$E􋀐$‹E􋀜9tE$ElED$ E􋀜D$D$E􋀌$m‹E􋀜9tE$7EExXtQED$ E􋀰D$D$E􋀬$‹E;tE$EE􃸘~VED$ E􋀘D$D$E􋀔$‹E􋀘9tE$xEWED$ E@pD$D$E@`$a‹E;PptE$3EE$EED[]numeric.umfwb_⍀_PJ⍀JP5⍀5Pxs ⍀ P_Jc|$Ë$\DP3H+|CUF: 5.  ` ZRL G At9t3 . ([ [  BB 2cskzJ_umfpack_zi_save_numeric___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_fclose_fwrite_fopen_umfzi_valid_numeric#1/36 1200792926 0 0 100644 6308 ` umfpack_zi_load_symbolic.o8 T__text__TEXT T__data__DATA __cstring__TEXT __picsymbolstub2__TEXT  0__la_sym_ptr2__DATAb __textcoal_nt__TEXT @   P UVS E} u } EE E D$E$E}u E) D$$ E}uE$ E ED$ D$D$E$Q t"E$( E$O E E$ t"E$ E$ E{ Ex8ߟu;E􃸔~/E􃸘~#E􃸐xEx@xE􃸌x"E$ E$ E E@hE@lE@XE@dE@\E@`E@DE@HE@LE@pE@tE@xEǀuD$E􋀘$ FhExhu"E$ E$ E@ ED$ E􋀘D$D$E@h$ ‹E􋀘9t"E$) E$ E E$ t"E$ E$Q E uD$E􋀔$? FlExlu"E$ E$ Ea ED$ E􋀔D$D$E@l$ ‹E􋀔9t"E$J E$ E E$A t"E$ E$r E uD$E􋀐$` FXExXu"E$ E$% E ED$ E􋀐D$D$E@X$ ‹E􋀐9t"E$k E$ E! E$b t"E$: E$ EuD$E􋀐$ FdExdu"E$E$F EED$ E􋀐D$D$E@d$‹E􋀐9t"E$E$EBE$t"E$[E$EuD$E􋀐$F\Ex\u"E$E$gEED$ E􋀐D$D$E@\$‹E􋀐9t"E$E$EcE$t"E$|E$E2uD$E􋀐$F`Ex`u"E$/E$EED$ E􋀐D$D$E@`$6‹E􋀐9t"E$E$'EE$t"E$E$ESuD$E@@$FDExDu"E$SE$E ED$ E@@D$D$E@D$]‹E@@9t"E$E$QEE$t"E$E$ E}uD$E@@$FHExHu"E$}E$E3ED$ E@@D$D$E@H$‹E@@9t"E$"E${EE$t"E$E$JEuD$E@@$;FLExLu"E$E$E]ED$ E@@D$D$E@L$‹E@@9t"E$LE$EE$Ct"E$E$tEuD$E􋀘$bFpExpu"E$E$'EED$ E􋀘D$D$E@p$‹E􋀘9t"E$mE$E#E$dt"E$<E$EuD$E􋀔$FtExtu"E$E$HEED$ E􋀔D$D$E@t$‹E􋀔9t"E$E$EDE$t"E$]E$EE􃸌uD$E􋀌$FxExxu"E$E$\EED$ E􋀌D$D$E@x$ ‹E;t"E$E$E`E$t"E$yE$E/E􃸼uD$E􋀘$E􃸈u"E$E$oEED$ E􋀘D$D$E􋀈$‹E􋀘9tE$E$ EkE$tE$E$E=E$E$AuE$KEUEEE [^]symbolic.umfrba⍀PMH⍀P4/⍀P⍀Po⍀oPZ⍀ZPE⍀EP0⍀0P $=V$Ë$d U J 6 +       | A 6 '       ] R C , !     ~ s d M B %       n c I   s=2g\Ei>3$ _TE.#ufOD'peHi0%^S{g>/   ~N~N z5z5 vv~ y srkre ` Zn Rn L G Aj 9j 3 . (f f   b b     3zdK_umfpack_zi_load_symbolic___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfzi_valid_symbolic_umfpack_zi_free_symbolic_ferror_umf_i_free_fread_fclose_umf_i_malloc_fopen #1/36 1200792927 0 0 100644 2876 ` umfpack_zi_save_symbolic.o8 T__text__TEXT T$__data__DATA t__cstring__TEXT t__picsymbolstub2__TEXT0d __la_sym_ptr2__DATA __textcoal_nt__TEXT @  P US$EEE$^u E} u EE E!D$E$ E}u EED$ D$D$E$tE$EkED$ E􋀘D$D$E@h$p‹E􋀘9tE$:EED$ E􋀔D$D$E@l$‹E􋀔9tE$EED$ E􋀐D$D$E@X$‹E􋀐9tE$EiED$ E􋀐D$D$E@d$n‹E􋀐9tE$8EED$ E􋀐D$D$E@\$‹E􋀐9tE$EED$ E􋀐D$D$E@`$‹E􋀐9tE$EgED$ E@@D$D$E@D$o‹E@@9tE$<EED$ E@@D$D$E@H$‹E@@9tE$EED$ E@@D$D$E@L$‹E@@9tE$EwED$ E􋀘D$D$E@p$|‹E􋀘9tE$FE!ED$ E􋀔D$D$E@t$&‹E􋀔9tE$EE􃸌~KED$ E􋀌D$D$E@x$‹E;tE$EtE􃸼tVED$ E􋀘D$D$E􋀈$j‹E􋀘9tE$4EE$ EE$[]symbolic.umfwb_⍀_PJ⍀JP5⍀5P ⍀ Pl=Vo$Ë$ ~<v@&J-H+UF- 5   ` ZRL G Ag9g3 . (N N  55 3dtl{K_umfpack_zi_save_symbolic___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_fclose_fwrite_fopen_umfzi_valid_symbolic #1/20 1200792928 0 0 100644 2100 ` umf_zl_lhsolve.o H__text__TEXT__data__DATA__literal8__TEXT__textcoal_nt__TEXT @( PUVS`EU;t]EEEEȋEEċEEEEEEEEE;E}FEE}xUЍE<E(EEE܋E;E~U܉ЍEȋE}t*UЍ4ME؃(U؉ЍE1U܉ЍEEE;EuEUEB`EԋU܉ЍEċEEE;E|3EԋE̍EԃE؉‰Ѝ UẺ E؃EЃÍE܃EE܋E;E}U܉ЍEEE;EuEU܉ЍEċEUЃEEH`EE܉U  ED ED ED EEE;E|UЉЍEE Uf(Y UЉЍEE UDYBXE\EUЉЍEE UDf(Y UЉЍEE UYB\E\EEEЃE܉U E ED ED ED UE)U܉ЍEȋE}tAE؉‰Ѝ uUЍEE؃UЍ UE܉ E܃(EEEE܃}yU܉ЍEċE؃}E܉U  ED ED ED EU܉ЍEEUEB`EU؉ЃEUEB`EEE;E|UЉЍEM EЉE1f(Y UЉЍEM EЉED1YDXE\EUЉЍEM EЉED1f(Y UЉЍEM EЉE1YD\E\EEЃE܉U E ED ED ED E܃()E*YEE`[^] @$ü # _umfzl_lhsolve___i686.get_pc_thunk.bx#1/20 1200792928 0 0 100644 4644 ` umf_zl_uhsolve.o DD__text__TEXTT/__data__DATA __literal8__TEXT __const__DATA0@__textcoal_nt__TEXT@P @( PUWVSEU;t ݝH EEEEE@|EEEEEEEEEEEE;E|!EȉEXEȉEDPEȉE hEȉE D`݅Xݝ@X f.wf(GP f.w)Pf(fW@f.s P@f.sPf(fW^Xxxf(YPX\p`YxXh^pEhf(Yx`\^pEPf(fWX^xxYX\PphYxX`^pE`Yx\h^pEEȉU E؉ E܉D ED ED UȉЍEEă}M؍ f.uzM f.uznUȉЍEEUEB`EUĉЃEUEB`EEE;E|UЍEE UЍEu UЍEM EEf(YEEY@\D\D>EԃEEȃiEEXEEȋE;E|AEȉEpEȉEDxEȉE `EȉE Dh݅pݝ(p f.wf(/x f.w)xf(fW(f.s x(f.sx^pPPf(YxpXXhYPX`^XE`f(YPh\^XEp^xPPYpXxX`YPXh^XEhYP\`^XEEȉU E؉ E܉D ED ED Eȃ*MYȋE*YXH݅H[^_]"@ @$  C 0)  0   E 00\0B)07 J00a0G.0' @_umfzl_uhsolve___i686.get_pc_thunk.bx #1/28 1200792928 0 0 100644 1804 ` umf_zl_triplet_map_nox.o |__text__TEXT PUWV0EE;E|UЍE,EEE;E|oUЍEEUЍEE}xE;E}}x E;E } EUЍE,E뇋E$EE;E|cUE$xUЍ u$UЍE,UЍ u,UЍE$EEE;E|iUЍEЍE, MUЍ U4E UЍ u(UЍEEEE;E |UЍE,EEEE;E|UЍE$EUE$E܋EE؋EEE;E|UЍE(EUЍE,EԋE;E|UЍ U8Eԉ EMUЍ U,E؉ UЍ U8E؉ E;EtU؉Ѝ U(E E؃EKUЍ4M0UE)Љ1E}tLEE;E|;UЍ u4UЍE4ЍE8EEE;E |UЍE,EEE;E|{UЍE$EUЍ u$UЍE09E|0UЍE(EUЍE,E륍E{EEE;E |?UExUЍ uUЍE,EEE;E |,UЍ u,UЍEEEE;E|UЍE$EUЍ u$UЍE09E|]UЍE(ЍE, MUЍ U8E UЍ U E ExEKEE;E|;UЍ u4UЍE4ЍE8EEẼ0^_]_umfzl_triplet_map_nox #1/28 1200792929 0 0 100644 2268 ` umf_zl_triplet_nomap_x.o |__text__TEXT PUWV@E}@t}Dt }HtEEȉEEE;E|UЍE,EEE;E|oUЍEEUЍEE}xE;E}}x E;E } EUЍE,E뇋E$EE;E|cUE$xUЍ u$UЍE,UЍ u,UЍE$EEE;E|UЍEЍE, MUЍ u(UЍE}tJE4ME;EEE;E|UЍEEUЍE܋}UЍE܋EUX7UЍE܋}UЍE܋EUDXBD7EEE9EE;E|UЍEE}UЍE܋}UЍE܋EUX7UЍE܋}UЍE܋EUDXBD7EEE/EhEEPQEEUЍ4M̋UE)1p^_]ÐUWVĀE EЋUЍEЋE}uE @`EEEEE܋EE؋E @tEԋE E̋EEE @`EE@xEȋEEEEEEEEEUЍE̋EEE;Er;EEUЍE<uE@EċUЍEEEEEE EEUĉЍE<uE;EUĉЍEE@EE@EUEEEU‰ЃEEEEEE@EUЍE܋EEE;EEE;E|UЍEEUЍEԃ,UЍE؋EEUЍE؋MEE1XE8UЍE؋EEUЍE؋MEED1XDED8EEE;E|UЍEE}UЍEԃ,UЍE؋EEUЍE؋MEE1XE8UЍE؋E쉅|UЍE؋MEED1XD|D8EEh EEPQEEUЍ4M̋UE)1^_]ÐUWVPE 8E UЍ uUЍDE냋E;EPEE;E|<UЍEEUЍ@LHEE;E|UЍEHUЍEHEP1X8UЍEHUЍEHEPD1XDD8EEPEEE;E|UЍEE} UЍ@LHEE;E|UЍEHUЍEHEP1X8UЍEHUЍEHEPD1XDD8EEPEEEE;E|UЍEE}xsUЍ<|UЍ |U)Љ>UЍ UE E‰Ѝ uUЍDEEZE;EnEE;E|UЍEEUЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EEPEEE;E|dUЍEE}*UЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EEPEUЍED$E$ UЍE }}Dž4E;E}}uDž4E ǀ4E;EEE;E|sUЍEEUЍ<|UЍ |U)Љ>UЍ uUЍDEEE;E|UЍEE}>UЍ@<"UЍ@LHEE;E|UЍEHUЍEHEP1X8UЍEHUЍEHEPD1XDD8EUЍEEPE{EEE;E|UЍEE}xsUЍ<|UЍ |U)Љ>UЍ UE E‰Ѝ uUЍDEEZEE;E|UЍEE}\UЍ@<@UЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EUЍEEPE]dẺB 1}'Dž4E;E}}uE ǀDž44EEE;E|UЍEE}UЍD<UЍ<|UЍ |U)Љ>UЍ UE E‰Ѝ uUЍDEUЍEE$E;EnEE;E|UЍEEUЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EEPEEE;E|dUЍEE}*UЍ@LHEE;E|UЍEHUЍEHUЍEPX8UЍEHUЍEHUЍEPDXDD8EEPEdEЉBEEUE tE D$ED$E $E t}E EE;<|dM UЍA(E}y E؃EU E;u E uE D$ED$E$qE돋E tE D$ED$E $RE t}E $EE;8|dM UЍA,E}y E؃EU E;u E uE D$ED$E$E돁P^_]⍀Pb"$?"!! 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XMEf.TXu E}uEE@@EE@HEH@f.uzXu TuEE@@^EUH@B@f.ztDEEH@Ef.wE@@ݝ Eݝ݅X@TtEE@H^EUHHBHf.ztDE EHHEf.wE@Hݝ Eݝ݅ XHEԃdElEpE;dEEEE;d|ỦЍp<xbỦЍ UE؃ ỦЍEỦЍEỦЍEEԃẼkE;`EEEE;`|UЉЍl<xbUЉЍ UE؃ UЉЍEUЉЍEUЉЍEEԃEЃkE;\}PEEԋE;\|=EԉU܍ EԉU܍D Eԃ붋E~UE@4E@4E;\},EUH@B@f.ztUB@ExEtE@ |E@0EE@EEE;d|XUЍEEԋE؃EԋUԉЍ |E UЍ xEԉ EEE;d|/UԉЍ uUԉЍ|EԃEE;`|XUЍEEԋE؃EԋUԉЍ |E UЍ tEԉ EEE;`|/UԉЍ uUԉЍ|EԃEE;E|hUԉЍEEUԉЍ uUЍEUԉЍ |UЍEEԃEE;E|SUԉЍ uUԉЍEUԉЍ uUԉЍ|EԃEE;E|DUԉЍEEUԉЍ |UЍEEԃEE;E|/UԉЍ uUԉЍ|EԃEE;E|hUԉЍEEUԉЍ uUЍEUԉЍ |UЍEEԃEE;E|SUԉЍ uUԉЍEUԉЍ uUԉЍ|EԃEE;E|DUԉЍEEUԉЍ |UЍEEԃEE;E|/UԉЍ uUԉЍ|EԃNjUЍEUЍEUЍEUЍEUЍEUЍEE PEE;P|UԉЍEEă}~gUԉЍEEUEB`EEE;E|2EEЋEUЉЍtEE؃čEԃcPEԋE;E|UԉЍEE}yrUԉЍEEă}~WEUEB`EEE;E|2EEЋEUЉЍtEE؃čEԃ[EEă}~aEE;E|PMU؉ЍEЋMU؉Ѝ4UЉЍt1E؃EE;P|UԉЍEEȃ}~gUԉЍEEUEB`EEE;E|2EE̋EỦЍxEE؃čEԃcPEԋE;E|UԉЍEEȃ}~rUԉЍEE}yEUEB`EEE;E|2EE̋EỦЍxEE؃čEԃ[E @hEE @lhEE;d|>UԉЍ uUԉЍEЍhEԃEE;`|;UԉЍ uUԉЍEЍEEԃ븁 [^]?+⍀P$Ë$C)s.nC1    ._F_umfzl_kernel_wrapup___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_sqrt #1/28 1200792936 0 0 100644 10692 ` umf_zl_local_search.o8 $T$__text__TEXT$T@'__data__DATA$&__literal8__TEXT$ &__picsymbolstub2__TEXT$2&0( __la_sym_ptr2__DATA$.'(__textcoal_nt__TEXT$6' @() P(UVEt6E ~E U ~E ǀoE ~u ME Au MU E U E DŽE E ^]UWVS'E@`PE E@xEEE @EȋE @EċE @ ,E @E @E @E @ E (E $E E E E E EE E E dDžXDž\Et#ݝ#ݝ݅]E EE DžE EЋE E܋E E؋E EE EuuE U Dž0Dž4Dž|DžDž8Dž<Dž@DžDDžhDžlDžpDžtDžDžE ǀDžDžDžDžDžDžxDž|DžDžDžhDžlDžpDžtE EEuUЍ DžUЍ(<x!E0|DžE4DžEU E;|U EEUЍUЍ(<xI;||;|utE;0|gE0|EG;|;u+E;4|E4EEDž|Dž0 0Ѝ(EЉEԋ0Ѝ(Ћ9E؉EdEEEEE;d|CE}EU 7D D7D D7D D7 E밃dmE4EE;d|MEU D D  D $EEE;d|EME}E4f(YE4DY \7\EME}E4Df(YE4Y XD7\DE E4EEE;|D D>D D>D D> EEE;d|EE܉4EU D D  D $#f.u!z #f.uzEE;|EMċE}ċE4f(YE4DY \7\EMċE}ċE4Df(YE4Y XD7\DE Ef|0ЍPHH@H<0ЍHDH;DrHEUЍ<uWH@EUЍPLL8L LEUЍE<u8PEE8@E8ER‰ЃLEELEEE;E|YUЍEE}/UЍ$E}|;E|DžUЍ $| |Ѝ E |uċEŰ >D D>D D>D D> |{EMĉEMċEE1X8EUĉEMċEED1XDD9ED D>D D>D D> {EUȉEMȋEE1X9EEȉEMȋEED1XDD:EUЍEu UЍEM EEf(YEEY@XD\D>EԃEẼE*YEE|[^_] @$$ _umfzl_lsolve___i686.get_pc_thunk.bx#1/20 1200792937 0 0 100644 2100 ` umf_zl_ltsolve.o H__text__TEXT__data__DATA__literal8__TEXT__textcoal_nt__TEXT @( PUVS`EU;t]EEEEȋEEċEEEEEEEEE;E}FEE}xUЍE<E(EEE܋E;E~U܉ЍEȋE}t*UЍ4ME؃(U؉ЍE1U܉ЍEEE;EuEUEB`EԋU܉ЍEċEEE;E|3EԋE̍EԃE؉‰Ѝ UẺ E؃EЃÍE܃EE܋E;E}U܉ЍEEE;EuEU܉ЍEċEUЃEEH`EE܉U  ED ED ED EEE;E|UЉЍEE Uf(Y UЉЍEE UDYB\E\EUЉЍEE UDf(Y UЉЍEE UYBXE\EEEЃE܉U E ED ED ED UE)U܉ЍEȋE}tAE؉‰Ѝ uUЍEE؃UЍ UE܉ E܃(EEEE܃}yU܉ЍEċE؃}E܉U  ED ED ED EU܉ЍEEUEB`EU؉ЃEUEB`EEE;E|UЉЍEM EЉE1f(Y UЉЍEM EЉED1YD\E\EUЉЍEM EЉED1f(Y UЉЍEM EЉE1YDXE\EEЃE܉U E ED ED ED E܃()E*YEE`[^] @$ü # _umfzl_ltsolve___i686.get_pc_thunk.bx#1/36 1200792938 0 0 100644 2436 ` umf_zl_mem_alloc_element.o8 "T"__text__TEXTTx3__data__DATA__literal8__TEXT8__picsymbolstub2__TEXT24 __la_sym_ptr2__DATAfp__textcoal_nt__TEXTn @ PUVSpM E U‰ЃEE $]*M*E XȍYȍ^f($j]EMXM*M*E YȍYȍ^f($]EMXȍXȍYȍf.s$]*M*E XȍYȍ^f($]EMXM*M*E YȍYȍ^f($=]EMXȍXM$]*M*E XȍYȍ^f($]EMXM*M*E YȍYȍ^f($|]EMXȍXMf.uz EE D$E$EE }u EUEB`EEEE UEuMUE U‰ЃEUEUE BUEBUE BUEB EE@E@U$EEEEp[^] @@ @0@?1?A-⍀-P⍀P$Ë$ yc U +      jT F /!      u g PB  . (    2cJ_umfzl_mem_alloc_element___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfzl_mem_alloc_tail_block_ceil#1/36 1200792938 0 0 100644 484 ` umf_zl_mem_alloc_head_block.o |__text__TEXT PU(MEPdAh)9E ~ EhE@dEMUE BdAdUEBdEEEUUEEEU;} UUUE艐EEE_umfzl_mem_alloc_head_block #1/36 1200792938 0 0 100644 820 ` umf_zl_mem_alloc_tail_block.o |__text__TEXT PUV4EEExltUE@lB`EE؉E}E;E EEEEEU E)ЃE}UE؉E@lUE MUE BlAlUE@lB`EUE؉UE BUEBwUE@hB`Eu MEPdAh)9~ EMEU @h)ЃAhUE@hB`EUE E@UE BMUEUEBdEEE܋UUԋEE؋E؋U;} UԋU؋U؋E܉EP`E)ЉEЋEEЋEЉEE4^]_umfzl_mem_alloc_tail_block#1/36 1200792939 0 0 100644 756 ` umf_zl_mem_free_tail_block.o |__text__TEXT PUV$} } uUE B`EE(uME)ЃEEEE8yuME)ЃUE@hB`9Ev>E@E)ЃEEE}yMEU)ЃEEEEEUE@hB`9EuEMEP`E)AhE@ExlEU@l;BhxE@llExluMEP`E)Al6UE@lB`EEڋE;}MEP`E)AlUEBUE؉$^]_umfzl_mem_free_tail_block#1/36 1200792939 0 0 100644 524 ` umf_zl_mem_init_memoryspace.o |__text__TEXT PUEǀEǀEǀE@lE@dUE@pBhUE@hBhUE@hB`EEǀE@EE@dEǀUE_umfzl_mem_init_memoryspace #1/28 1200792939 0 0 100644 2676 ` umf_zl_report_vector.o X__text__TEXTmd?__data__DATAmI__cstring__TEXT\__literal8__TEXTH$__const__DATAP,__picsymbolstub2__TEXT`<\ __la_sym_ptr2__DATAyU __textcoal_nt__TEXT}Y @  t P US$ED$t$?}tdEE  <f.uz+EE D$~$3$ }t0EE EEEE&EU  ED ED ED EM荃<f.uzED$$G$7M<f.w)MDf(fWD$$BM<f.zt$ED$$$$[]ÐUS$4}u}ED$$q}t@} u$WEO}y4$7E/}u}}~$ }EE} ~E EEEE;E|(ED$ ED$E D$E$UE΋E;E}rU$ED$ ED$E D$E$?}~9EE;E|(ED$ ED$E D$E$E΃}~^$}u}p$EE$[] %ld : (%g) (0) (%g (0 - %gi) + 0i) + %gi) dense vector, n = %ld. 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(unsymmetric) Q = COLAMD (A), Q refined during numerical factorization, and no attempt at diagonal pivoting. (symmetric, with 2-by-2 block pivoting) P2 = row permutation that tries to place large entries on the diagonal. Q = AMD (P2*A+(P2*A)'), Q not refined during numerical factorization, attempt to select pivots from the diagonal of P2*A. (auto) %ld: initial allocation ratio: %g %ld: initial allocation (in Units): %ld %ld: max iterative refinement steps: %ld %ld: 2-by-2 pivot tolerance: %g %ld: Q fixed during numerical factorization: %g (yes) (no) (auto) %ld: AMD dense row/col parameter: %g no "dense" rows/columns "dense" rows/columns have > max (16, (%g)*sqrt(n)) entries Only used if the AMD ordering is used. %ld: diagonal pivot tolerance: %g Only used if diagonal pivoting is attempted. %ld: scaling: %ld (no) (divide each row by sum of abs. values in each row) (divide each row by max. abs. value in each row) %ld: frontal matrix allocation ratio: %g %ld: initial frontal matrix size (# of Entry's): %ld %ld: drop tolerance: %g %ld: AMD and COLAMD aggressive absorption: %g (yes) (no) The following options can only be changed at compile-time: %ld: BLAS library used: none. UMFPACK will be slow. %ld: compiled for ANSI C (uses malloc, free, realloc, and printf) %ld: CPU timer is POSIX times ( ) routine. %ld: compiled for normal operation (debugging disabled) unknown computer/operating system: %s size of int: %g long: %g Int: %g pointer: %g double: %g Entry: %g (in bytes) ???ffffff?{Gz?$@MbP??0@ @@⍀Pw}$Ë$  z Pj PZ PJ P: H* @$  ` =      `  ?  !      l a Y /    Z  [ S  `     { 8k 8* "     `  R  <S K !  00bZTL@91  ((naYG<4 @~aL5   4,`}C;m,$`@aYgR;` zP@L x rj `    uu 4eL_umfpack_zl_report_control___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/28 1200792953 0 0 100644 25612 ` umfpack_zl_report_info.o| 5G5G__text__TEXT*I$__data__DATA*U-__cstring__TEXT*X-__literal8__TEXTFPXI__picsymbolstub2__TEXTGIb__la_sym_ptr2__DATA)GI c__textcoal_nt__TEXT-GI @0cxcx P(cUS4EEEEMFf.wM荃Ff.+ED$*$FMFf.sED$E $~F*$nFM荃Ff.sED$E $AF*$1FMFf.swM荃Ff.s`MFf.uz%E^EEFYEE F]E\$*$E*$E4[]ÐUSm}t7EUf.ztE,DDžD DžDDX} (X(`)D$})$D)$D)$D *$D4*$Dm*$D*$D*$D*$DE ,dE ,``@@;d~ d@@\*d=Ef.wdD$ +$D*`=Ef.w`D$M+$CE ,*ȍ=Ef.w E ,D$+$CE ,*ȍ=Ef.w E ,D$+$MCE ,*ȍ=Ef.w E ,D$ ,$ CE (,*ȍ=Ef.w E (,D$M,$BE 0,*ȍ=Ef.w E 0,D$,$BE 8,*ȍ=Ef.w E 8,D$,$EBE EEf.zt -$B^E MEf.ztM-$A.E UEf.zt-$AE MEf.zt-$A^E =Ef.zt .$YA.E UEf.ztM.$)AE MEf.zt.$@.E =Ef.zt.$@E =Ef.zt /$@.E MEf.ztM/$m@E U f(X E U Xf.u/z-E U f(X =Ef.w-E U XD$/$?E @U @f.uzE @=Ef.wE @D$/$?E PU Pf.uzE P=Ef.wE PD$M0$-?E HU Hf.uzE H=Ef.wE HD$0$>E XU Xf.uzE X=Ef.wE XD$0$>E ,TT~ 1$X>TuM1$?>E hh=Ef.s1$>hhf.uzh=Ef.whD$1$=E U f.uzE =Ef.w E D$ 2$Z=E U f.uzE =Ef.w E D$M2$<E U f.uzE =Ef.w E D$2$<E =Ef.sBh=Ef.w(E ^hD$2$@<E U ˜f.uzE =Ef.w E D$ 3$;E U  f.uzE =Ef.w E D$3$;E U ¨f.uzE =Ef.w E D$3$);E U °f.uzE =Ef.w E D$ 4$:E U ¸f.uzE =Ef.w E D$M4$o:E =Ef.sBh=Ef.w(E ^hD$4$:E MEf.ztE 8H4$9E (U (f.uzE (=Ef.w E (D$ 5$m9E  U f.uzE  =Ef.w E  D$M5$9Hf(YHHYHf.u&z$Hf(YH=Ef.w$HYHD$5$8HHf.uzH=Ef.wHD$5$P8E 0U 0f.uzE 0=Ef.w E 0D$ 6$7E xEE EE `U `f.uzE `=Ef.wE `D$M6$7E hU hf.uzE h=Ef.wE hD$6$+7E h]EYȍeEf(^ЋE h]EYȍeE^f(f.u8z6E h]EYȍeE^ȍ=Ef.w>E h]EYȍeE^f(D$6$[6E pU pf.uzE p=Ef.wE pD$ 7$6E p]EYȍeEf(^ЋE p]EYȍeE^f(f.u8z6E p]EYȍeE^ȍ=Ef.w>E p]EYȍeE^f(D$M7$75MEf.uzM=Ef.wED$7$4MEf.uzM=Ef.wED$7$4E  =Ef.zt8$4E  MEf.zt^8$V4M8$H4E (D$8$(4E 0D$8$4|E  UEf.zt\8$3 9$3E (D$M9$3E 0D$9$3E `=Ef.sE =Ef.s*9$D3 :$63-:$(3E hD$E D$Y:D$a:$E pD$E D$Y:D$z:$E xD$E D$Y:D$:$dE @D$E D$Y:D$:$(E @]EYȍeE^f(D$E ]EYȍeE^f(D$:D$:$E HD$E D$Y:D$:$pE H]EYȍeE^f(D$E ]EYȍeE^f(D$:D$;$E PD$E D$;D$#;$E EE EM=Ef.s<M荃=Ef.s%Ef(XM*\\f(EmEEE XE؋E `EM؍=Ef.s<MЍ=Ef.s%Ef(XM*\\f(EmEEED$ED$Y:D$?;$ED$ED$Y:D$W;$TED$ED$Y:D$o;$&E D$E D$Y:D$;$E D$E D$Y:D$;$E D$E D$Y:D$;$rE EE XEE PEE HU Hf.uzE H=Ef.w E HD$;$-E PU Pf.uzE P=Ef.w E PD$-<$-E `U `f.uzE `=Ef.w E `D$m<$8-E hU hf.uzE h=Ef.w E hD$<$,E pU pf.uzE p=Ef.w E pD$<$~,E xU xf.uzE x=Ef.w E xD$-=$!,E U f.uzE =Ef.w E D$m=$+E 8U 8f.uzE 8=Ef.w E 8D$=$g+E @U @f.uzE @=Ef.w E @D$=$ +E U f.uzE =Ef.w E D$->$*E U f.uzE =Ef.w E D$m>$P*E U f.uzE =Ef.w E D$>$)E U f.uzE =Ef.w E D$>$)E U f.uzE =Ef.w E D$-?$9)E U f.uzE =Ef.w E D$m?$(MEf.uzM=Ef.wED$?$(MEf.uzM=Ef.wED$?$\(M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$-@$'M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$m@$&mEEEEM=Ef.s1M=Ef.sEXEEMEf.uzM=Ef.wED$@$0&M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$@$h%mEpM=Ef.sOM=Ef.s5EXEpppf.uzp=Ef.wpD$-A$$M=Ef.wp=Ef.wMuEYf(^pMuEY^pf.u1z/MuEYf(^p=Ef.w/MuEY^pD$mA$#E EE xE EMEf.uzM=Ef.wED$A$w#E U €f.uzE =Ef.w E D$A$#E U ˆf.uzE =Ef.w E D$-B$"E U f.uzE =Ef.w E D$mB$`"E U ˜f.uzE =Ef.w E D$B$"MEf.uzM=Ef.wED$B$!xxf.uzx=Ef.wxD$-C$w!M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$mC$ M=Ef.wx=Ef.wMuEYf(^xMuEY^xf.u1z/MuEYf(^x=Ef.w/MuEY^xD$C$M=Ef.sfM=Ef.sOEXEEMEf.uzM=Ef.wED$C$[M=Ef.sKM=Ef.s1M=Ef.sEXEEMEf.uzM=Ef.wED$-D$M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$mD$x=Ef.sop=Ef.sRM=Ef.s8pXEpppf.uzp=Ef.wpD$D$AM=Ef.wp=Ef.wMuEYf(^pMuEY^pf.u1z/MuEYf(^p=Ef.w/MuEY^pD$D$j&E$\[] %-27s - %5.0f%% - UMFPACK V4.4 (Jan. 28, 2005) %s, Info: matrix entry defined as: double complex Int (generic integer) defined as: long BLAS library used: none. UMFPACK will be slow. MATLAB: no. CPU timer: POSIX times ( ) routine. number of rows in matrix A: %ld number of columns in matrix A: %ld entries in matrix A: %ld memory usage reported in: %ld-byte Units size of int: %ld bytes size of long: %ld bytes size of pointer: %ld bytes size of numerical entry: %ld bytes strategy used: symmetric strategy used: unsymmetric strategy used: symmetric 2-by-2 ordering used: amd on A+A' ordering used: colamd on A ordering used: provided by user modify Q during factorization: no modify Q during factorization: yes prefer diagonal pivoting: no prefer diagonal pivoting: yes pivots with zero Markowitz cost: %0.f submatrix S after removing zero-cost pivots: number of "dense" rows: %.0f number of "dense" columns: %.0f number of empty rows: %.0f number of empty columns %.0f submatrix S square and diagonal preserved submatrix S not square or diagonal not preserved pattern of square submatrix S: number rows and columns %.0f symmetry of nonzero pattern: %.6f nz in S+S' (excl. diagonal): %.0f nz on diagonal of matrix S: %.0f fraction of nz on diagonal: %.6f 2-by-2 pivoting to place large entries on diagonal: # of small diagonal entries of S: %.0f # unmatched: %.0f symmetry of P2*S: %.6f nz in P2*S+(P2*S)' (excl. diag.): %.0f nz on diagonal of P2*S: %.0f fraction of nz on diag of P2*S: %.6f AMD statistics, for strict diagonal pivoting: est. flops for LU factorization: %.5e est. nz in L+U (incl. diagonal): %.0f est. largest front (# entries): %.0f est. max nz in any column of L: %.0f number of "dense" rows/columns in S+S': %.0f symbolic factorization defragmentations: %.0f symbolic memory usage (Units): %.0f symbolic memory usage (MBytes): %.1f Symbolic size (Units): %.0f Symbolic size (MBytes): %.0f symbolic factorization CPU time (sec): %.2f symbolic factorization wallclock time(sec): %.2f matrix scaled: no matrix scaled: yes (divided each row by sum of abs values in each row) minimum sum (abs (rows of A)): %.5e maximum sum (abs (rows of A)): %.5e (divided each row by max abs value in each row) minimum max (abs (rows of A)): %.5e maximum max (abs (rows of A)): %.5e symbolic/numeric factorization: upper bound actual %% variable-sized part of Numeric object: %20.0f initial size (Units) peak size (Units) final size (Units)Numeric final size (Units) %20.1fNumeric final size (MBytes)peak memory usage (Units)peak memory usage (MBytes) %20.5enumeric factorization flopsnz in L (incl diagonal)nz in U (incl diagonal)nz in L+U (incl diagonal)largest front (# entries)largest # rows in frontlargest # columns in front initial allocation ratio used: %0.3g # of forced updates due to frontal growth: %.0f number of off-diagonal pivots: %.0f nz in L (incl diagonal), if none dropped %.0f nz in U (incl diagonal), if none dropped %.0f number of small entries dropped %.0f nonzeros on diagonal of U: %.0f min abs. value on diagonal of U: %.2e max abs. value on diagonal of U: %.2e estimate of reciprocal of condition number: %.2e indices in compressed pattern: %.0f numerical values stored in Numeric object: %.0f numeric factorization defragmentations: %.0f numeric factorization reallocations: %.0f costly numeric factorization reallocations: %.0f numeric factorization CPU time (sec): %.2f numeric factorization wallclock time (sec): %.2f numeric factorization mflops (CPU time): %.2f numeric factorization mflops (wallclock): %.2f symbolic + numeric CPU time (sec): %.2f symbolic + numeric mflops (CPU time): %.2f symbolic + numeric wall clock time (sec): %.2f symbolic + numeric mflops (wall clock): %.2f solve flops: %.5e iterative refinement steps taken: %.0f iterative refinement steps attempted: %.0f sparse backward error omega1: %.2e sparse backward error omega2: %.2e solve CPU time (sec): %.2f solve wall clock time (sec): %.2f solve mflops (CPU time): %.2f solve mflops (wall clock time): %.2f total symbolic + numeric + solve flops: %.5e total symbolic + numeric + solve CPU time: %.2f total symbolic + numeric + solve mflops (CPU): %.2f total symbolic+numeric+solve wall clock time: %.2f total symbolic+numeric+solve mflops(wallclock) %.2f Y@@?@ @0Aư>⍀P׸G$Ë$**F**F~*Gi*FO*G,*G *G)F)F))@F)F[)FA)F$)F))F(G(F(G(G(Gs(FY(FN(F(E+(F'F'F'F''E'FV'F?'F4','@E'G&F&G&G&G&Fh&F]&U&E<&G'&F&G%G%G%F%F%%Do%FI%A%D&%F %%@D$F$$D$FO$G$C%$F##C#F##@Cr#F##C"G"F"G"G"Gp"FS"FH"@"B""F!F!F!G!!B!Gn!FW!G7!G!G!F F  @B F~ Fd FF G@ 8 B G FGGGFFxpAWGBF+G GGFFAFph@AMF0(AF@Fvn@LF@@F@F_W?5F?F@?{FH@?F>F>dF1)@>F>Fwo=MF=FN=x;NF6=<; =;=;<;zr<h;CG FFGFqFD<<2<<U<FFFFy<z;PH]<>U<&FFFF:<;#<;\T <J; ;;;;`;FFz ;bZ:B::4,9F`: :99F{9gFUM`92F  9F8FFFFqFMF?F#FF8F`8FFiF[FMF)FFFF 8F7eF7F`7Fph 7BF  6 F  6u FB : `6 F  6 F F  5s F@ 8 5 F  `5 F ~ 5\ F) ! 4 F  `4 F~ Fl d 4B F  3 F  3 FU M `3/ F  3F22`2_F3+ 2 F1F`1cF7/ 1F0Fog0SFA9`0%F  0F/F/F{`/gFUM /9F%. F.F`.F} .[FC;-F-F`-F}u -SF;3,F ,Fyg,sk@,e]',WO,IA+;3+-%`+ + +* wo* g_* MF 7F F F F * F * lF aY* >F 'F   )GG)GG j1-G1GbI___i686.get_pc_thunk.bx_umfpack_zl_report_info___i686.get_pc_thunk.axdyld_stub_binding_helper_printf_print_ratio#1/36 1200792954 0 0 100644 4140 ` umfpack_zl_report_matrix.o XE E __text__TEXT_$ ___data__DATA_; __cstring__TEXT`< __literal8__TEXT  __const__DATA  __picsymbolstub2__TEXT  __la_sym_ptr2__DATA9  L__textcoal_nt__TEXT=  @\l PTUS}E}$t1E$U$f.ztE$,EEEEE} E} t QEXEE EEEXEQEEEE EE D$ ED$ED$q$G}~} ~$+ER}u$ E2UЍEE̋ẺD$$}y$EE8t3D$ ED$D$1$E}uU$fE}E}~i$9EE;E|vU܉ЍE<y!E܉D$k$E%U܉ЍE;E~!E܉D$$EE܃EE;E|`U܉EHU܉ЍE)ЉE؃}y(E܉D$ED$$UE|E܃떋EEEE;E|$} EȉEU܉ЍEEċU܉EEUċE)ЉE؃}~4E؉D$ED$EĉD$ E܉D$ED$$EEĉEЋE;E|WUЉЍEE}~ED$ED$ $Z}8}.)$8}t0EЍEEEЍEE&EЉU ED ED ED EM荃f.uzED$+$0$Mf.w)M f(fWD$4$\BMf.zt<$3ED$C$}x E;E}6E܉D$ED$ ED$ED$Q$EE;E6E܉D$ED$ ED$ED$$E}~i$}u/EċU)‰Ѓ u } ~}~$QE(EEԍEЃ}u&} u } ~}~$E(E܃EȉE}~ED$$$EEĄ[]columnrow%s-form matrix, n_row %ld n_col %ld, ERROR: n_row <= 0 or n_col <= 0 ERROR: Ap missing nz = %ld. ERROR: number of entries < 0 ERROR: Ap [%ld] = %ld must be %ld ERROR: Ai missing ERROR: Ap [%ld] < 0 ERROR: Ap [%ld] > size of Ai ERROR: # entries in %s %ld is < 0 %s %ld: start: %ld end: %ld entries: %ld %s %ld : (%g (0 - %gi) + 0i) + %gi) ERROR: %s index %ld out of range in %s %ld ERROR: %s index %ld out of order (or duplicate) in %s %ld ... ... %s-form matrix OK ⍀P- $Ë$H@ :2x|t>6`RK C  z?rj:K 8/qiVNzxd@[S G? `ggz`   9 % 9 %  3= A dK_umfpack_zl_report_matrix___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf #1/36 1200792954 0 0 100644 13756 ` umfpack_zl_report_numeric.o X $ $__text__TEXTq&f__data__DATAqM__cstring__TEXTi \__literal8__TEXT"%__const__DATA# %__picsymbolstub2__TEXT0# &,20__la_sym_ptr2__DATA# &3__textcoal_nt__TEXT$& @,4 4 P3USt} t1E U f.ztE ,EEEEȉE} Eut$o#EEЋEЉ$E#u$L#E8EЋEEЋEEEċE;E}EEċEĉEEEE;E~EEEEEЋEԋEEMUЃ MUЃ EUԉЃ EE EEEЃxXtEEEE܋EЋ@pMEЋЃE؃}ED$ED$$"E@D$$!E@D$$!H$!EЃxXu\$!EЃxXuHt$!E@0D$$!E@8D$$g!OEЃxXuF4$N!E@0D$t$2!E@8D$$!$!E@ D$$ E@(D$4$ E؉D$t$ ERP,$d$]M"^f(D$$y EЋD$$^ EЋRP,$d$]M"^f(D$4$ EЋD$t$EЋD$$EЋD$$EЋD$4$EЋD$t$EЋD$$tEЋD$$YEЋD$4$>EЋD$t$#ED$$EЋD$$E@@D$4$E@HD$t$E@PD$$D$E$TE}u$oE[EЃEЃt}~$4$3}~t$}~$ D$D$ED$ D$EЋD$E$}~$}~$D$ED$ ED$EЋ@tD$E$tE$EZ}~$ND$ED$ ED$EЋ@xD$E$tE$EED$ED$EЉ$Yu%E$c$EED$ED$EЉ$u"E$! $E}~! $sD$D$ED$ D$EЋD$E$E$}~2 $H $EẼt[]UVSpEEEEEEEE܋EE؋EE̋EEE}~s$E EE;E|}~EEUЍE̋EUЍE؋EUEB`EUЃEUEB`EUЍEЃ(~EE}u$E(}~ED$$}~ED$$EE;E|UЍEE}~ED$$Y} EE  f.uz&EED$"$'$EEL f.w5EEL#f(fWD$+$ZEEL f.zt3$l%EEDD$:$EE;E~ E;E} E}~$}u } u} ~B$E(ELE\EEE;E|!}~EEUЍE̋EEEȃ}t EEUЍEЃ(~EE}u$_E(}~ED$$>UЍE܋E}}~+ED$UЍE D$S$E}u2}~,E;E}$}xUЍE ;EuEEEԃ}u EUЍ4M E(UЍE 1UЍE؋Eă}y EUĉЃEEUEB`E}}%EUE;Pp~ Ee}~h}~EĉD$u$UEB`EEE;E|-E‰Ѝ U E EEEɃ}~ED$$d}t}~$J}~$6EE;E|tUЍE E}~ED$$}E f.uzED$"$'$EH f.w,EH#f(fWD$+$^HEH f.zt3$2E@D$:$E;E~ E;E} Eq}~$E}u } u} ~B$E(EE}~$EEp[^]ÐUWVS|EEEEEEE@|EЋEE̋EEEEă}~.$E EE}~CEE;E|2U܉Ѝ4} MU܉Ѝ7E܃ă}~ED$ED$$EEE;E}5}~EĉEUЍEEUЍE̋E}y EEE}tEUЃEEEEUEB`E}~%EUE;Pp~ EIEE;E|wU܉ЍE Eԃ}~EԉD$$~}Ef.uzED$$>$.EHf.w,EHf(fWD$$HEHf.zt$E@D$$E;E~ E;E} E }~ $nE}u } u} ~$HE(E܃|UȍEȃ(~EĉE}uh$E(}~}~ED$$}}EE}~ED$$UЃUE;Pp~ E UEB`EEE;E|U܉Ѝ U E؋ E؃E܃΃}~}~ED$$UE)}y EUЍEЋE}t}~ED$ED$.$}x E;E E0E‰Ѝ u UЍE EUЍ U E }~ED$P$ME(EE}y}~EĉEUЍEEUЍE̋EUEB`EUЃEUEB`EUȍEȃ(~EĉE}uh$E(}~ED$]$x}~ED$$]EE;E|U܉ЍEEԃ}~EԉD$k$} E܉E f.uz&E܉ED$$ $ E܉ELf.w5E܉ELf(fWD$$a ZE܉ELf.zt$, %E܉EDD$$ E;E~ E;E} Eq}~ $ }u } u} ~$ E(E܃OE(aEĉE}~ $ EE|[^_]Numeric object: ERROR: LU factors invalid n_row: %ld n_col: %ld relative pivot tolerance used: %g relative symmetric pivot tolerance used: %g matrix scaled: noyes (divided each row by sum abs value in each row) minimum sum (abs (rows of A)): %.5e maximum sum (abs (rows of A)): %.5eyes (divided each row by max abs value in each row) minimum max (abs (rows of A)): %.5e maximum max (abs (rows of A)): %.5e initial allocation parameter used: %g frontal matrix allocation parameter used: %g final total size of Numeric object (Units): %ld final total size of Numeric object (MBytes): %.1f peak size of variable-size part (Units): %ld peak size of variable-size part (MBytes): %.1f largest actual frontal matrix size: %ld memory defragmentations: %ld memory reallocations: %ld costly memory reallocations: %ld entries in compressed pattern (L and U): %ld number of nonzeros in L (excl diag): %ld number of entries stored in L (excl diag): %ld number of nonzeros in U (excl diag): %ld number of entries stored in U (excl diag): %ld factorization floating-point operations: %g number of nonzeros on diagonal of U: %ld min abs. value on diagonal of U: %.5e max abs. value on diagonal of U: %.5e reciprocal condition number estimate: %.2e ERROR: out of memory to check Numeric object Scale factors applied via multiplication Scale factors applied via division Scale factors, Rs: Scale factors, Rs: (not present) P: row Q: column ERROR: L factor invalid ERROR: U factor invalid diagonal of U: Numeric object: OK L in Numeric object, in column-oriented compressed-pattern form: Diagonal entries are all equal to 1.0 (not stored) ... column %ld: length %ld. row %ld : (%g (0 - %gi) + 0i) + %gi) ... remove row %ld at position %ld. add %ld entries. length %ld. Start of Lchain. U in Numeric object, in row-oriented compressed-pattern form: Diagonal is stored separately. row %ld: length %ld. End of Uchain. col %ld : row %ld: length %ld. End of Uchain. remove %ld entries. add column %ld at position %ld. length %ld. row %ld: col %ld : 0A⍀P⍀P⍀P⍀Plgo⍀oPSNZ⍀ZP:5E⍀EP!0⍀0P=#V#o######$Ë$[Sr%/!rr'!r !r#rzr!r^ #r;#r$!r !r#r"r~v rc["rB: r"r"r"r,$g"rW"r r/!rmer;3'!r !r#r!r #r#r!r!rt#r]UL"rNF "r!rn LD/!'! !"}u!a#G"91!)!!"  !    !w o u!  b!  @!  | t   /!    '!o g !S ": 2 ! # "  !  ! " z !> 6 #    RJ`  T > h`- KC =.   m^3+    @ ld UB: & @    @ z g_ LD 1)@    @ " }u bZ B"  @     @ tl XP <4 h T      }ld  $#$# $#$# $# $#~ y s$#k$#e ` Z$#R$#L G A$g#9$g#3 . (#N# #N#  #5##5#      d4$$eqL_umfpack_zl_report_numeric___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_l_free_umf_l_report_perm_umfzl_report_vector_umf_l_malloc_umfzl_valid_numeric_printf_report_L_report_U #1/28 1200792954 0 0 100644 1252 ` umfpack_zl_report_perm.o __text__TEXT0__data__DATA__picsymbolstub2__TEXTKH__la_sym_ptr2__DATA __textcoal_nt__TEXT* @Px PUH}t1EUf.ztE,EEEEE} EeD$EE}}EE$vED$ED$ ED$E D$E$2EE$ EEE8F⍀FP$1⍀1P ⍀P${G A93 . (    JiV1_umfpack_zl_report_perm___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_l_free_umf_l_report_perm_umf_l_malloc#1/36 1200792955 0 0 100644 4804 ` umfpack_zl_report_status.o8 * T* __text__TEXTTG__data__DATA__cstring__TEXTe __picsymbolstub2__TEXT Y__la_sym_ptr2__DATA r__textcoal_nt__TEXT" v @4l PUS$}t1EUf.ztE,EEEEE}?} u }.$ }~D$$m }~D$|$O }~D$|$1 }~ D$|$ T D$q $ E E}}E} }}q*}+}}}tv}}}ts}t} }t6}tv $O z $< $) $ $ 4 $ ut $ e $ U $ E $ 5 $ %T $ E D$ $y $k $[] UMFPACK: Copyright (c) 2005 by Timothy A. Davis. All Rights Reserved. %s UMFPACK License: Your use or distribution of UMFPACK or any modified version of UMFPACK implies that you agree to this License. This library is free software; you can redistribute it and/or modify it under the terms of the GNU Lesser General Public License as published by the Free Software Foundation; either version 2.1 of the License, or (at your option) any later version. This library is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU Lesser General Public License for more details. You should have received a copy of the GNU Lesser General Public License along with this library; if not, write to the Free Software Foundation, Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301 USA %s Permission is hereby granted to use or copy this program under the terms of the GNU LGPL, provided that the Copyright, this License, and the Availability of the original version is retained on all copies. User documentation of any code that uses this code or any modified version of this code must cite the Copyright, this License, the Availability note, and 'Used by permission.' Permission to modify the code and to distribute modified code is granted, provided the Copyright, this License, and the Availability note are retained, and a notice that the code was modified is included. Availability: http://www.cise.ufl.edu/research/sparse/umfpack UMFPACK V4.4 (Jan. 28, 2005)%s: OK WARNING: matrix is singular ERROR: out of memory ERROR: Numeric object is invalid ERROR: Symbolic object is invalid ERROR: required argument(s) missing ERROR: dimension (n_row or n_col) must be > 0 ERROR: input matrix is invalid ERROR: system argument invalid ERROR: invalid permutation ERROR: pattern of matrix (Ap and/or Ai) has changed INTERNAL ERROR! Input arguments might be corrupted or aliased, or an internal error has occurred. Check your input arguments with the umfpack_*_report_* routines before calling the umfpack_* computational routines. Recompile UMFPACK with debugging enabled, and look for failed assertions. If all else fails please report this error to Tim Davis (davis@cise.ufl.edu). ERROR: Unrecognized error code: %ld ⍀P $Ë$  qi` aY QI A9 1) !  @      } `         vn      3" & dK_umfpack_zl_report_status___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/36 1200792955 0 0 100644 6812 ` umfpack_zl_report_symbolic.o| II__text__TEXTk__data__DATAk __cstring__TEXT __literal8__TEXT8__picsymbolstub2__TEXT}H__la_sym_ptr2__DATA-__textcoal_nt__TEXTA @T  P, US} t1E U f.ztE ,EEEEE؃} Eq$EEE$wu$~EEEEEEEE@@EEEE@PEE@TE܋E@DEE@HEE@LEE@XEE@\EE@`EE@dE}<$ED$ED$$ED$$ED$ $Q $vEu $\6Eu $@Eu $$ $ $Eu $ 6Eu $ Eu $ $  $ EtB $ F $p Q $b EtF $H B $8 $* EH Yȍ^f(D$ E@ D$ $ EYȍ^f(D$ ED$ $ EHYȍ^f(D$ E@D$Q $N EHYȍ^f(D$ E@D$ $ $ ED$1 $ ED$Q $ ED$ $ E܉D$ $ EEEE;E|UЉЍEEȋUЉEEă}~#EĉD$ EȉD$EЉD$ $) }~:UЉЍED$UЉЍED$Q $ EȉE̋E;E~ỦЍEE}~0EEԃD$EԉD$ ED$ẺD$ $ }~MỦED$ỦЍEЍED$ $8 }~$ỦЍED$$ }~$ỦЍED$1$ }~S$ ỦЍE<u}~:`$ *}~$ỦЍED$i${ E}uE9E} }uE}t}~#o$< EUẼDUЍE<t1}~+UЍED$ED$$}t EЃAD$EEE;E}EEE$uE}u$E}~$pD$E؉D$ ED$E@hD$E$E}~Q$.D$E؉D$ ED$E@lD$E$EE$}u}u E)}~p$$EEĤ[]Symbolic object: ERROR: invalid matrix to be factorized: n_row: %ld n_col: %ld number of entries: %ld block size used for dense matrix kernels: %ld strategy used: symmetricunsymmetricsymmetric 2-by-2 ordering used: colamd on A amd on A+A' provided by user performn column etree postorder: no yes prefer diagonal pivoting (attempt P=Q): variable-size part of Numeric object: minimum initial size (Units): %.20g (MBytes): %.1f estimated peak size (Units): %.20g (MBytes): %.1f estimated final size (Units): %.20g (MBytes): %.1f symbolic factorization memory usage (Units): %.20g (MBytes): %.1f frontal matrices / supercolumns: number of frontal chains: %ld number of frontal matrices: %ld largest frontal matrix row dimension: %ld largest frontal matrix column dimension: %ld Frontal chain: %ld. Frontal matrices %ld to %ld Largest frontal matrix in Frontal chain: %ld-by-%ld Front: %ld pivot cols: %ld (pivot columns %ld to %ld) pivot row candidates: %ld to %ld leftmost descendant: %ld 1st new candidate row : %ld parent: (none) %ld ... Front: %ld placeholder for %ld empty columns ERROR: out of memory to check Symbolic object Initial column permutation, Q1: Initial row permutation, P1: Symbolic object: OK @0AKx⍀xP72c⍀cPN⍀NP9⍀9P$⍀$P!$Ë$TLF> ` xi/'~xiao@8b,$@  } '`  nf YQ D<` /'@    ` xp K=0(  Q U ` U Q vn h` ZR >6 "      `  qi\T@8og  y s=k=e ` Z9R9L G A5953 . (1 1  --  5AEfrM_umfpack_zl_report_symbolic___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_l_free_umf_l_report_perm_umf_l_malloc_umfzl_valid_symbolic_printf #1/36 1200792955 0 0 100644 2684 ` umfpack_zl_report_triplet.o X__text__TEXTt9__data__DATAtP__cstring__TEXT\__literal8__TEXTd__const__DATAl__picsymbolstub2__TEXT|l __la_sym_ptr2__DATA __textcoal_nt__TEXT @  p P UST} Ẽ}$t1E$U$f.ztE$,EEEEĉE} EED$ E D$ED$t$}t}u$E}~} ~$E}y$Ek}~$}EЋEEEE;E|U܉ЍEE؋U܉ЍEEԃ}~#EԉD$ E؉D$E܉D$ $}*} }t0E܍EEE܍E E&E܉U ED ED ED EM荃|f.uzED$$p!$`M|f.w)Mf(fWD$%$"BM|f.zt-$ED$4$}~$}xE;E}}x E;E }<$E`}u } u} ~U$uE(E܃EE}~^$Jw$<EEȃT[]triplet-form matrix, n_row = %ld, n_col = %ld nz = %ld. ERROR: indices not present ERROR: n_row or n_col is <= 0 ERROR: nz is < 0 %ld : %ld %ld (%g (0 - %gi) + 0i) + %gi)ERROR: invalid triplet ... triplet-form matrix OK [⍀PG$Ë$`X RJj 'a H  @ 9  zr1 ^ G <4- ,$(           4eL_umfpack_zl_report_triplet___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/36 1200792956 0 0 100644 964 ` umfpack_zl_report_vector.o __text__TEXT__data__DATA__picsymbolstub2__TEXT__la_sym_ptr2__DATA__textcoal_nt__TEXT @ <d PU8}t1EUf.ztE,EEEEE} E3D$D$ED$ ED$E D$E$EEj⍀PV$  L3_umfpack_zl_report_vector___i686.get_pc_thunk.axdyld_stub_binding_helper_umfzl_report_vector#1/28 1200792956 0 0 100644 2900 ` umfpack_zl_solve.o8 NTN__text__TEXTiT__data__DATAi__literal8__TEXTp(__picsymbolstub2__TEXT$__la_sym_ptr2__DATA. __textcoal_nt__TEXTF @ P UST$}0t@E08U08f.ztE08,Dž Dž}4tKE4DžPU~{ a ȍ(DžY~- a ȋi iE,$u#qDž*ꀋ*;t#yDžc ; |=HPif.zt HPBPf.uz Dž}t}$u#Dž}~ Dž~  ЉD$ $D$$t u?a$$yDžD$4D$0D$,D$(D$$E(D$ E D$ED$E$D$ED$ED$ ED$E D$E$$$*x<$x T[]*c⍀POJ|⍀|P61g⍀gPR⍀RP=⍀=P(⍀(P "$Ë$M?)px*xiY:x xpp  BB~ y s>k>e ` Z:R:L G A6963 . (2 2  ..  +FJv\iC_umfpack_zl_solve___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_toc_umfzl_solve_umf_l_free_umf_l_malloc_umfzl_valid_numeric_umfpack_tic#1/28 1200792957 0 0 100644 900 ` umfpack_zl_symbolic.o zz__text__TEXTY__data__DATAYi__picsymbolstub2__TEXTYi__la_sym_ptr2__DATAr__textcoal_nt__TEXTv @` PUHEE(D$$E$D$ E D$ED$ED$ED$ED$ ED$E D$E$⍀Pf$S r^r^ vG._umfpack_zl_symbolic___i686.get_pc_thunk.axdyld_stub_binding_helper_umfpack_zl_qsymbolic #1/28 1200792957 0 0 100644 1292 ` umfpack_zl_transpose.o JJ__text__TEXT\__data__DATA__picsymbolstub2__TEXTKt__la_sym_ptr2__DATA: J__textcoal_nt__TEXTFV @4|t PUhE EE;E}EEEEEE}}EEED$E$E}u EE8D$  >   :: FHeT/_umfpack_zl_transpose___i686.get_pc_thunk.axdyld_stub_binding_helper_umf_l_free_umfzl_transpose_umf_l_malloc#1/36 1200792958 0 0 100644 2724 ` umfpack_zl_triplet_to_col.o __text__TEXTS__data__DATASc__picsymbolstub2__TEXTSc$__la_sym_ptr2__DATA__textcoal_nt__TEXT @P P U}(t}$t }t}u E!}~} ~ E}y EE EE;E}EEEEEE},t }tEEE}thD$E$EE} t }0tEEEȃ}tEEЉEE}u EF}4EE}t6D$E$E؃}uEЉ$kED$E$bED$E$IED$E$3ED$E$E}t}t }t}uNEЉ$E؉$E$E$E$E$E2}}E؉D$HE4D$DẺD$@E0D$$Ë$M > 3         | W L = &      _ T E . #     u j [ D 9       s \ Q 4 tiLm1& I>!aV9|qZ/${PE6mbB^S{g>/ s  f6f6 bb ^^~ y sZ kZ e ` ZV RV L G AR 9R 3 . (N N   J J     2jnxcJ_umfpack_zl_load_numeric___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_umfzl_valid_numeric_umfpack_zl_free_numeric_ferror_umf_l_free_fread_fclose_umf_l_malloc_fopen #1/36 1200792959 0 0 100644 2868 ` umfpack_zl_save_numeric.o8 T__text__TEXT.T"__data__DATA.__cstring__TEXT.__picsymbolstub2__TEXT=d __la_sym_ptr2__DATA __textcoal_nt__TEXT @  P USDEEE$ku E} u "EE E.D$E$E}u EED$ D$D$E$tE$EyED$ EEE􋀴EEU;~ UUED$D$E􋀤$TE܋EEԋE􋀴E؋E؋U;~ UԋU؋E؃9EtE$EED$ E􋀰D$D$E@t$‹E􋀰9tE$E|ED$ E􋀴D$D$E@x$‹E􋀴9tE$JE&ED$ E􋀜D$D$E􋀀$'‹E􋀜9tE$EED$ E􋀜D$D$E􋀈$‹E􋀜9tE$EtED$ E􋀜D$D$E􋀄$u‹E􋀜9tE$?EED$ E􋀜D$D$E@|$‹E􋀜9tE$EED$ E􋀜D$D$E􋀐$‹E􋀜9tE$ElED$ E􋀜D$D$E􋀌$m‹E􋀜9tE$7EExXtQED$ E􋀰D$D$E􋀬$‹E;tE$EE􃸘~VED$ E􋀘D$D$E􋀔$‹E􋀘9tE$xEWED$ E@pD$D$E@`$a‹E;PptE$3EE$EED[]numeric.umfwb_⍀_PJ⍀JP5⍀5Pxs ⍀ P_Jc|$Ë$\DP3H+|CUF: 5.  ` ZRL G At9t3 . ([ [  BB 2cskzJ_umfpack_zl_save_numeric___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_fclose_fwrite_fopen_umfzl_valid_numeric#1/36 1200792959 0 0 100644 6308 ` umfpack_zl_load_symbolic.o8 T__text__TEXT T__data__DATA __cstring__TEXT __picsymbolstub2__TEXT  0__la_sym_ptr2__DATAb __textcoal_nt__TEXT @   P UVS E} u } EE E D$E$E}u E) D$$ E}uE$ E ED$ D$D$E$Q t"E$( E$O E E$ t"E$ E$ E{ Ex8u;E􃸔~/E􃸘~#E􃸐xEx@xE􃸌x"E$ E$ E E@hE@lE@XE@dE@\E@`E@DE@HE@LE@pE@tE@xEǀuD$E􋀘$ FhExhu"E$ E$ E@ ED$ E􋀘D$D$E@h$ ‹E􋀘9t"E$) E$ E E$ t"E$ E$Q E uD$E􋀔$? FlExlu"E$ E$ Ea ED$ E􋀔D$D$E@l$ ‹E􋀔9t"E$J E$ E E$A t"E$ E$r E uD$E􋀐$` FXExXu"E$ E$% E ED$ E􋀐D$D$E@X$ ‹E􋀐9t"E$k E$ E! E$b t"E$: E$ EuD$E􋀐$ FdExdu"E$E$F EED$ E􋀐D$D$E@d$‹E􋀐9t"E$E$EBE$t"E$[E$EuD$E􋀐$F\Ex\u"E$E$gEED$ E􋀐D$D$E@\$‹E􋀐9t"E$E$EcE$t"E$|E$E2uD$E􋀐$F`Ex`u"E$/E$EED$ E􋀐D$D$E@`$6‹E􋀐9t"E$E$'EE$t"E$E$ESuD$E@@$FDExDu"E$SE$E ED$ E@@D$D$E@D$]‹E@@9t"E$E$QEE$t"E$E$ E}uD$E@@$FHExHu"E$}E$E3ED$ E@@D$D$E@H$‹E@@9t"E$"E${EE$t"E$E$JEuD$E@@$;FLExLu"E$E$E]ED$ E@@D$D$E@L$‹E@@9t"E$LE$EE$Ct"E$E$tEuD$E􋀘$bFpExpu"E$E$'EED$ E􋀘D$D$E@p$‹E􋀘9t"E$mE$E#E$dt"E$<E$EuD$E􋀔$FtExtu"E$E$HEED$ E􋀔D$D$E@t$‹E􋀔9t"E$E$EDE$t"E$]E$EE􃸌uD$E􋀌$FxExxu"E$E$\EED$ E􋀌D$D$E@x$ ‹E;t"E$E$E`E$t"E$yE$E/E􃸼uD$E􋀘$E􃸈u"E$E$oEED$ E􋀘D$D$E􋀈$‹E􋀘9tE$E$ EkE$tE$E$E=E$E$AuE$KEUEEE [^]symbolic.umfrba⍀PMH⍀P4/⍀P⍀Po⍀oPZ⍀ZPE⍀EP0⍀0P $=V$Ë$d U J 6 +       | A 6 '       ] R C , !     ~ s d M B %       n c I   s=2g\Ei>3$ _TE.#ufOD'peHi0%^S{g>/   ~N~N z5z5 vv~ y srkre ` Zn Rn L G Aj 9j 3 . 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