/* * surf - visualizing algebraic curves and algebraic surfaces * Copyright (C) 1996-1997 Friedrich-Alexander-Universitaet * Erlangen-Nuernberg * 1997-2000 Johannes Gutenberg-Universitaet Mainz * Authors: Stephan Endrass, Hans Huelf, Ruediger Oertel, * Kai Schneider, Ralf Schmitt, Johannes Beigel * * This program is free software; you can redistribute it and/or modify * it under the terms of the GNU General Public License as published by * the Free Software Foundation; either version 2 of the License, or * (at your option) any later version. * * This program 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 General Public License for more details. * * You should have received a copy of the GNU General Public License * along with this program; if not, write to the Free Software * Foundation, Inc., 675 Mass Ave, Cambridge, MA 02139, USA. * */ #include "stdio.h" #include "NewClipAlgebraic.h" #include "NewClipAlgebraicOcta.h" #include "gui_config.h" void NewClipAlgebraicOcta::init( void ) { // ---------------------------- // four polynomials: // p[0] = (r+(x-cx)+(y-cy)+(z-cz))*(r-(x-cx)-(y-cy)-(z-cz)) // p[1] = (r-(x-cx)+(y-cy)+(z-cz))*(r+(x-cx)-(y-cy)-(z-cz)) // p[2] = (r+(x-cx)-(y-cy)+(z-cz))*(r-(x-cx)+(y-cy)-(z-cz)) // p[3] = (r+(x-cx)+(y-cy)-(z-cz))*(r-(x-cx)-(y-cy)+(z-cz)) // // r = clip_numeric.radius // cx = clip_numeric.center_x // cy = clip_numeric.center_y // cz = clip_numeric.center_z // ---------------------------- int i; polyxyz h[8]; for( i=0; i<8; i++ ) { new_coeff_polyxyz( &h[i],4 ); h[i].m[1].kx = h[i].m[2].ky = h[i].m[3].kz = 1; } h[0].m[0].a = clip_numeric.radius - clip_numeric.center_x - clip_numeric.center_y - clip_numeric.center_z; h[1].m[0].a = clip_numeric.radius + clip_numeric.center_x - clip_numeric.center_y - clip_numeric.center_z; h[2].m[0].a = clip_numeric.radius - clip_numeric.center_x + clip_numeric.center_y - clip_numeric.center_z; h[3].m[0].a = clip_numeric.radius - clip_numeric.center_x - clip_numeric.center_y + clip_numeric.center_z; h[0].m[1].a = 1.0; h[0].m[2].a = 1.0; h[0].m[3].a = 1.0; h[1].m[1].a =-1.0; h[1].m[2].a = 1.0; h[1].m[3].a = 1.0; h[2].m[1].a = 1.0; h[2].m[2].a =-1.0; h[2].m[3].a = 1.0; h[3].m[1].a = 1.0; h[3].m[2].a = 1.0; h[3].m[3].a =-1.0; h[4].m[0].a = clip_numeric.radius + clip_numeric.center_x + clip_numeric.center_y + clip_numeric.center_z; h[5].m[0].a = clip_numeric.radius - clip_numeric.center_x + clip_numeric.center_y + clip_numeric.center_z; h[6].m[0].a = clip_numeric.radius + clip_numeric.center_x - clip_numeric.center_y + clip_numeric.center_z; h[7].m[0].a = clip_numeric.radius + clip_numeric.center_x + clip_numeric.center_y - clip_numeric.center_z; h[4].m[1].a =-1.0; h[4].m[2].a =-1.0; h[4].m[3].a =-1.0; h[5].m[1].a = 1.0; h[5].m[2].a =-1.0; h[5].m[3].a =-1.0; h[6].m[1].a =-1.0; h[6].m[2].a = 1.0; h[6].m[3].a =-1.0; h[7].m[1].a =-1.0; h[7].m[2].a =-1.0; h[7].m[3].a = 1.0; for( i=0; i<4; i++ ) { p[i] = polyxyz_mult( &h[i],&h[i+4] ); polyxyz_collect( &p[i] ); polyxyz_set_degree( &p[i] ); polyxyz_adjust( &p[i] ); hp[i] = new hornerpolyxyz ( p[i] ); } for( i=4; i