// show the fundamental domain for quotient spaces // Copyright (C) 2018 Zeno and Tehora Rogue, see 'hyper.cpp' for details namespace hr { namespace fundamental { color_t color1, color2; map same; map gm; bool is_connected(cellwalker cw) { return same[cw.at] & (1<type != S7) { cw++; T = T * calc_relative_matrix(cw.peek(), cw.at, cw.spin); cw += wstep; } return T * C0; } return gm[cw.at] * get_corner_position(cw.at, cw.spin+(cw.mirrored?0:1), 3); } transmatrix rel(cellwalker cw) { return calc_relative_matrix(cw.cpeek(), cw.at, cw.spin); } ld label_dist = .3; transmatrix labelpos(hyperpoint h1, hyperpoint h2) { hyperpoint h = mid(h1, h2); transmatrix T = rgpushxto0(h); hyperpoint hx = inverse(T) * h2; ld alpha = atan2(-hx[1], hx[0]); return T * xspinpush(alpha + M_PI/2, label_dist); } ld widthfactor = 5; ld label_scale = 1; void fundamental_marker() { if(!funmode || !(quotient || euwrap || elliptic)) return; same.clear(); gm.clear(); same[cwt.at] = 0; gm[cwt.at] = ggmatrix(cwt.at); vector cells; cells.push_back(cwt.at); int tree_edges = 0; int face_edges = 0; for(int k=0; ktype; i++) { cellwalker cw(c, i); cell *c2 = cw.cpeek(); if(gm.count(c2)) continue; gm[c2] = gm[c] * rel(cw); // queueline(gm[c2] * C0, gm[c2] * xspinpush0(ticks, 0.2), 0xFFFFFFFF, 3); be_connected(cw); tree_edges++; cells.push_back(c2); } } while(true) { int f = face_edges; for(int k=0; ktype; i++) { cellwalker cw(c, i); if(is_connected(cw) && is_connected(cw+1) && !is_connected(cw+wstep-1)) { face_edges++; be_connected(cw+wstep-1); } } } if(f == face_edges) break; } cellwalker cw; int corners = 0; for(int k=0; ktype; i++) { cellwalker cw0(c, i); if(!is_connected(cw0) && !is_connected(cw0+1) && !is_connected(cw0+wstep-1)) corners++, cw = cw0; } } // printf("tree edges = %d, face edges = %d, corners = %d\n", tree_edges, face_edges, corners); map next_corner; map prev_corner; for(int ci=0; ci nearm; for(int ci=0; citype; i++) { cellwalker cw0(c, i); if(!is_connected(cw0)) continue; int v = 0; for(auto& n: nearm) { queueline(n * gm[cw0.at] * xspinpush0(v, .05), n * gm[cw0.cpeek()] * xspinpush0(v, .05), 0xFF8000FF, 0); v++; } queueline(gm[cw0.at] * C0, gm[cw0.cpeek()] * C0, 0xFF0000FF, 0); } } set visited; int id = 0; for(int ci=0; ci> 8; if(hdist(corner(cw), corner(next_corner[cw])) > 1e-3) { queuestr(labelpos(corner(cw), corner(next_corner[cw])), label_scale/scalefactor, its(id), mc); if(mirrored) queuestr(labelpos(corner(cw1), corner(next_corner[cw1])), label_scale/scalefactor, its(id), mc); else queuestr(labelpos(corner(prev_corner[cw1]), corner(cw1)), label_scale/scalefactor, its(id), mc); id++; } } cw = next_corner[cw]; } vid.linewidth /= widthfactor; } int readArgs() { using namespace arg; if(0) ; else if(argis("-fundamental")) { shift(); funmode = argi(); shift(); color1 = arghex(); shift(); color2 = arghex(); shift_arg_formula(widthfactor); shift_arg_formula(label_scale); shift_arg_formula(label_dist); } else return 1; return 0; } auto fundamentalhook = addHook(hooks_args, 100, readArgs) + addHook(hooks_frame, 100, fundamental_marker); } }