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543 lines
17 KiB
C++
543 lines
17 KiB
C++
// Hyperbolic Rogue -- regular honeycombs
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// works with spherical and hyperbolic ones -- Euclidean cubic tiling implemented in euclid.cpp
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// hyperbolic honeycombs rely on binary:: to deal with floating point errors (just like archimedean)
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// Copyright (C) 2011-2019 Zeno Rogue, see 'hyper.cpp' for details
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namespace hr {
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#if MAXMDIM >= 4
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transmatrix cpush(int cid, ld alpha);
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transmatrix cspin(int a, int b, ld alpha);
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extern
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vector<hpcshape> shWall3D, shMiniWall3D;
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namespace binary {
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void build_tmatrix();
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void virtualRebaseSimple(heptagon*& base, transmatrix& at);
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int celldistance3(heptagon *c1, heptagon *c2);
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hyperpoint deparabolic3(hyperpoint h);
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}
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namespace reg3 {
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map<int, int> close_distances;
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int bucketer(ld x) {
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return int(x * 10 + 100000.5) - 100000;
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}
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int bucketer(hyperpoint h) {
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return bucketer(h[0]) + 1000 * bucketer(h[1]) + 1000000 * bucketer(h[2]);
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}
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int loop, face;
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vector<hyperpoint> cellshape;
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transmatrix spins[12], adjmoves[12];
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template<class T> ld binsearch(ld dmin, ld dmax, const T& f) {
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for(int i=0; i<200; i++) {
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ld d = (dmin + dmax) / 2;
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if(f(d)) dmax = d;
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else dmin = d;
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}
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return dmin;
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}
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void generate() {
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using namespace hyperpoint_vec;
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if(S7 == 4) face = 3;
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if(S7 == 6) face = 4;
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if(S7 == 12) face = 5;
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if(S7 == 8) face = 3;
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/* icosahedron not implemented */
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loop = ginf[geometry].tiling_name[5] - '0';
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println(hlog, "face = ", face, " loop = ", loop, " S7 = ", S7);
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ld dual_angle = binsearch(0, M_PI, [&] (ld d) {
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hyperpoint h0 = cpush(0, 1) * C0;
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hyperpoint h1 = cspin(0, 1, d) * h0;
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hyperpoint h2 = cspin(1, 2, 2*M_PI/loop) * h1;
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return hdist(h0, h1) > hdist(h1, h2);
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});
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ld dodecahedron_angle = binsearch(0, M_PI, [&] (ld d) {
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hyperpoint h0 = cpush(0, 1) * C0;
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hyperpoint h1 = cspin(0, 1, d) * h0;
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hyperpoint h2 = cspin(1, 2, 2*M_PI/face) * h1;
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return hdist(h0, h1) > hdist(h1, h2);
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});
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if(S7 == 8) {
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/* 24-cell is a special case because it is the only one with '4' in the middle of the Schlaefli symbol. */
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/* The computations above assume 3 */
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hyperpoint h1 = hpxy3(.5,.5,.5);
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hyperpoint h2 = hpxy3(.5,.5,-.5);
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dual_angle = hdist(h1, h2);
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}
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println(hlog, "dodecahedron angle = ", dodecahedron_angle);
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println(hlog, "dual angle = ", dual_angle);
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ld inp_length = binsearch(0, 1.55, [&] (ld d) {
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hyperpoint h = xpush(-d) * spin(2*M_PI/face) * xpush0(d);
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ld alpha = M_PI - atan2(-h[1], h[0]);
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return (alpha < dual_angle / 2) ? hyperbolic : sphere;
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});
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println(hlog, "inp length = ", inp_length);
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ld edge_length = hdist(xpush0(inp_length), spin(2*M_PI/face) * xpush0(inp_length));
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if(S7 == 8) edge_length = hdist(normalize(hpxyz3(1,1,0,0)), normalize(hpxyz3(1,0,1,0)));
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println(hlog, "edge length = ", edge_length);
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hyperpoint h0 = cpush(0, 1) * C0;
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hyperpoint h1 = cspin(0, 1, dodecahedron_angle) * h0;
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hyperpoint h2 = cspin(1, 2, 2*M_PI/face) * h1;
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hyperpoint h3 = cspin(1, 2, -2*M_PI/face) * h1;
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hyperpoint a2 = S7 == 8 ? normalize(h1 + h2) : normalize(h0 + h1 + h2);
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hyperpoint a3 = S7 == 8 ? normalize(h1 + h3) : normalize(h0 + h1 + h3);
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println(hlog, "S7 = ", S7);
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ld whereonline = binsearch(0, 5, [&] (ld d) {
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// sometimes breaks in elliptic
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dynamicval<eGeometry> g(geometry, elliptic ? gCell120 : geometry);
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hyperpoint z2 = a2 * d + C0 * (1-d);
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if(hyperbolic && intval(z2, Hypc) >= 0) return true;
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hyperpoint b2 = normalize(z2);
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hyperpoint z3 = a3 * d + C0 * (1-d);
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hyperpoint b3 = normalize(z3);
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return hdist(b2, b3) >= edge_length;
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});
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println(hlog, "whereonline = ", whereonline);
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a2 = normalize(a2 * whereonline + C0 * (1-whereonline));
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a3 = normalize(a3 * whereonline + C0 * (1-whereonline));
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hyperpoint mid = Hypc;
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for(int i=0; i<face; i++) mid += cspin(1, 2, 2*i*M_PI/face) * a2;
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mid = normalize(mid);
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ld between_centers = 2 * hdist0(mid);
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println(hlog, "between_centers = ", between_centers);
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if(S7 == 12 || S7 == 8) {
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spins[0] = Id;
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spins[1] = cspin(0, 1, dodecahedron_angle) * cspin(1, 2, M_PI);
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for(int a=2; a<face+1; a++) spins[a] = cspin(1, 2, 2*M_PI*(a-1)/face) * spins[1];
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for(int a=S7/2; a<S7; a++) spins[a] = cspin(0, 1, M_PI) * spins[a-S7/2];
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}
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if(S7 == 6) {
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spins[0] = Id;
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spins[1] = cspin(0, 1, dodecahedron_angle) * cspin(1, 2, M_PI);
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spins[2] = cspin(1, 2, M_PI/2) * spins[1];
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for(int a=S7/2; a<S7; a++) spins[a] = spins[a-S7/2] * cspin(0, 1, M_PI);
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}
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if(S7 == 4) {
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spins[0] = Id;
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spins[1] = cspin(0, 1, dodecahedron_angle) * cspin(1, 2, M_PI);
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for(int a=2; a<face+1; a++) spins[a] = cspin(1, 2, 2*M_PI*(a-1)/face) * spins[1];
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}
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cellshape.clear();
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for(int a=0; a<S7; a++)
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for(int b=0; b<face; b++)
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cellshape.push_back(spins[a] * cspin(1, 2, 2*M_PI*b/face) * a2);
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adjmoves[0] = cpush(0, between_centers) * cspin(0, 2, M_PI);
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for(int i=1; i<S7; i++) adjmoves[i] = spins[i] * adjmoves[0];
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for(int a=0; a<S7; a++)
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println(hlog, "center of ", a, " is ", tC0(adjmoves[a]));
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println(hlog, "doublemove = ", tC0(adjmoves[0] * adjmoves[0]));
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// exit(1);
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}
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void binary_rebase(heptagon *h, const transmatrix& V) {
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}
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void test();
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struct hrmap_reg3 : hrmap {
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heptagon *origin;
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hrmap *binary_map;
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unordered_map<heptagon*, pair<heptagon*, transmatrix>> reg_gmatrix;
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unordered_map<heptagon*, vector<pair<heptagon*, transmatrix> > > altmap;
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hrmap_reg3() {
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generate();
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origin = tailored_alloc<heptagon> (S7);
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heptagon& h = *origin;
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h.s = hsOrigin;
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h.cdata = NULL;
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h.alt = NULL;
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h.distance = 0;
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h.c7 = newCell(S7, origin);
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worst_error1 = 0, worst_error2 = 0;
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dynamicval<hrmap*> cr(currentmap, this);
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heptagon *alt = NULL;
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transmatrix T = Id;
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if(hyperbolic) {
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dynamicval<eGeometry> g(geometry, gBinary3);
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binary::build_tmatrix();
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alt = tailored_alloc<heptagon> (S7);
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alt->s = hsOrigin;
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alt->emeraldval = 0;
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alt->zebraval = 0;
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alt->distance = 0;
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alt->alt = alt;
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alt->cdata = NULL;
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alt->c7 = NULL;
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binary_map = binary::new_alt_map(alt);
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T = xpush(.01241) * spin(1.4117) * xpush(0.1241) * cspin(0, 2, 1.1249) * xpush(0.07) * Id;
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}
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else binary_map = NULL;
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reg_gmatrix[origin] = make_pair(alt, T);
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altmap[alt].emplace_back(origin, T);
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celllister cl(origin->c7, 4, 100000, NULL);
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for(cell *c: cl.lst) {
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hyperpoint h = tC0(relative_matrix(c->master, origin));
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close_distances[bucketer(h)] = cl.getdist(c);
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}
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}
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ld worst_error1, worst_error2;
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heptagon *getOrigin() {
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return origin;
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}
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void fix_distances(heptagon *h, heptagon *h2) {
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vector<heptagon*> to_fix;
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auto fix_pair = [&] (heptagon *h, heptagon *h2) {
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if(!h2) return;
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if(h->distance > h2->distance+1) {
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h->distance = h2->distance + 1;
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to_fix.push_back(h);
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}
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else if(h2->distance > h->distance+1) {
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h2->distance = h->distance + 1;
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to_fix.push_back(h2);
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}
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if(h->alt && h->alt == h2->alt) {
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if(altdist(h) > altdist(h2) + 1) {
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altdist(h) = altdist(h2) + 1;
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to_fix.push_back(h);
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}
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else if (altdist(h2) > altdist(h) + 1) {
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altdist(h2) = altdist(h) + 1;
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to_fix.push_back(h2);
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}
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}
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};
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if(!h2) to_fix = {h};
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else fix_pair(h, h2);
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for(int i=0; i<isize(to_fix); i++) {
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h = to_fix[i];
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for(int j=0; j<S7; j++) fix_pair(h, h->move(j));
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}
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}
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#define DEB 0
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heptagon *create_step(heptagon *parent, int d) {
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auto& p1 = reg_gmatrix[parent];
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if(DEB) println(hlog, "creating step ", parent, ":", d, ", at ", p1.first, tC0(p1.second));
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heptagon *alt = p1.first;
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transmatrix T = p1.second * adjmoves[d];
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transmatrix T1 = T;
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if(hyperbolic) {
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dynamicval<eGeometry> g(geometry, gBinary3);
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dynamicval<hrmap*> cm(currentmap, binary_map);
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binary::virtualRebaseSimple(alt, T);
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}
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fixmatrix(T);
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auto hT = tC0(T);
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if(DEB) println(hlog, "searching at ", alt, ":", hT);
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if(DEB) for(auto& p2: altmap[alt]) println(hlog, "for ", tC0(p2.second), " intval is ", intval(tC0(p2.second), hT));
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ld err;
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for(auto& p2: altmap[alt]) if((err = intval(tC0(p2.second), hT)) < 1e-3) {
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if(err > worst_error1) println(hlog, format("worst_error1 = %lg", double(worst_error1 = err)));
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// println(hlog, "YES found in ", isize(altmap[alt]));
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if(DEB) println(hlog, "-> found ", p2.first);
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int fb = 0;
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hyperpoint old = T * (inverse(T1) * tC0(p1.second));
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for(int d2=0; d2<S7; d2++) {
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hyperpoint back = p2.second * tC0(adjmoves[d2]);
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if((err = intval(back, old)) < 1e-3) {
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if(err > worst_error2) println(hlog, format("worst_error2 = %lg", double(worst_error2 = err)));
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if(p2.first->move(d2)) println(hlog, "error: repeated edge");
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p2.first->c.connect(d2, parent, d, false);
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fix_distances(p2.first, parent);
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fb++;
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}
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}
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if(fb != 1) {
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println(hlog, "found fb = ", fb);
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println(hlog, old);
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for(int d2=0; d2<S7; d2++) {
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println(hlog, p2.second * tC0(adjmoves[d2]), " in distance ", intval(p2.second * tC0(adjmoves[d2]), old));
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}
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parent->c.connect(d, parent, d, false);
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return parent;
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}
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return p2.first;
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}
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if(DEB) println(hlog, "-> not found");
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heptagon *created = tailored_alloc<heptagon> (S7);
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created->c7 = newCell(S7, created);
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created->alt = NULL;
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created->cdata = NULL;
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created->zebraval = hrand(10);
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created->distance = parent->distance + 1;
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fixmatrix(T);
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reg_gmatrix[created] = make_pair(alt, T);
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altmap[alt].emplace_back(created, T);
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created->c.connect(0, parent, d, false);
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return created;
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}
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~hrmap_reg3() {
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if(binary_map) {
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dynamicval<eGeometry> g(geometry, gBinary3);
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delete binary_map;
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}
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clearfrom(origin);
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}
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map<heptagon*, int> reducers;
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void link_alt(const cellwalker& hs) override {
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auto h = hs.at->master;
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altdist(h) = 0;
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if(h->alt->s != hsOrigin) reducers[h] = hs.spin;
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}
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void generateAlts(heptagon* h, int levs, bool link_cdata) override {
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if(reducers.count(h)) {
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heptspin hs(h, reducers[h]);
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reducers.erase(h);
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hs += wstep;
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hs += rev;
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altdist(hs.at) = altdist(h) - 1;
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hs.at->alt = h->alt;
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reducers[hs.at] = hs.spin;
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}
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for(int i=0; i<S7; i++) {
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auto h2 = h->cmove(i);
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if(h2->alt == NULL) {
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h2->alt = h->alt;
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altdist(h2) = altdist(h) + 1;
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fix_distances(h2, NULL);
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}
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}
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}
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void draw() {
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sphereflip = Id;
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// for(int i=0; i<S6; i++) queuepoly(ggmatrix(cwt.at), shWall3D[i], 0xFF0000FF);
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dq::visited.clear();
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dq::enqueue(viewctr.at, cview());
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while(!dq::drawqueue.empty()) {
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auto& p = dq::drawqueue.front();
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heptagon *h = get<0>(p);
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transmatrix V = get<1>(p);
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dynamicval<ld> b(band_shift, get<2>(p));
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bandfixer bf(V);
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dq::drawqueue.pop();
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cell *c = h->c7;
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if(!do_draw(c, V)) continue;
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drawcell(c, V, 0, false);
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for(int i=0; i<S7; i++)
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if(h->move(i))
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dq::enqueue(h->move(i), V * relative_matrix(h->move(i), h));
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}
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}
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transmatrix relative_matrix(heptagon *h2, heptagon *h1) {
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auto p1 = reg_gmatrix[h1];
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auto p2 = reg_gmatrix[h2];
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transmatrix T = Id;
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if(hyperbolic) {
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dynamicval<eGeometry> g(geometry, gBinary3);
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dynamicval<hrmap*> cm(currentmap, binary_map);
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T = binary_map->relative_matrix(p2.first, p1.first);
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}
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return inverse(p1.second) * T * p2.second;
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}
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};
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hrmap* new_map() {
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return new hrmap_reg3;
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}
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hrmap_reg3* regmap() {
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return ((hrmap_reg3*) currentmap);
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}
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int celldistance(cell *c1, cell *c2) {
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if(c1 == c2) return 0;
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if(c1 == currentmap->gamestart()) return c2->master->distance;
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if(c2 == currentmap->gamestart()) return c1->master->distance;
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auto r = regmap();
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hyperpoint h = tC0(r->relative_matrix(c1->master, c2->master));
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int b = bucketer(h);
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if(close_distances.count(b)) return close_distances[b];
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dynamicval<eGeometry> g(geometry, gBinary3);
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return 20 + binary::celldistance3(r->reg_gmatrix[c1->master].first, r->reg_gmatrix[c2->master].first);
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}
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bool pseudohept(cell *c) {
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auto m = regmap();
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if(sphere) {
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hyperpoint h = tC0(m->relative_matrix(c->master, regmap()->origin));
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if(S7 == 12) {
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hyperpoint h1 = cspin(0, 1, atan2(16, 69) + M_PI/4) * h;
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for(int i=0; i<4; i++) if(abs(abs(h1[i]) - .5) > .01) return false;
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return true;
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}
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if(S7 == 8)
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return h[3] >= .99 || h[3] <= -.99 || abs(h[3]) < .01;
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if(loop == 3 && face == 3 && S7 == 4)
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return c == m->gamestart();
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if(loop == 4 && face == 3)
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return abs(h[3]) > .9;
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if(loop == 3 && face == 4)
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return abs(h[3]) > .9;
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if(loop == 5 && face == 3)
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return abs(h[3]) > .99 || abs(h[0]) > .99 || abs(h[1]) > .99 || abs(h[2]) > .99;
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}
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if(hyperbolic) {
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heptagon *h = m->reg_gmatrix[c->master].first;
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return (h->zebraval == 1) && (h->distance & 1);
|
|
}
|
|
return false;
|
|
}
|
|
#endif
|
|
|
|
#if 0
|
|
/* More precise, but very slow distance. Not used/optimized for now */
|
|
|
|
ld adistance(cell *c) {
|
|
hyperpoint h = tC0(regmap()->reg_gmatrix[c->master].second);
|
|
h = binary::deparabolic3(h);
|
|
return regmap()->reg_gmatrix[c->master].first->distance * log(2) - h[0];
|
|
}
|
|
|
|
unordered_map<pair<cell*, cell*>, int> memo;
|
|
|
|
bool cdd;
|
|
|
|
int celldistance(cell *c1, cell *c2) {
|
|
if(memo.count(make_pair(c1, c2))) return memo[make_pair(c1, c2)];
|
|
if(c1 == c2) return 0;
|
|
vector<cell*> v[2];
|
|
v[0].push_back(c1);
|
|
v[1].push_back(c2);
|
|
|
|
int steps = 0;
|
|
|
|
map<cell*, int> visited;
|
|
visited[c1] = 1;
|
|
visited[c2] = 2;
|
|
|
|
while(true) {
|
|
if(cdd) {
|
|
println(hlog, "state ", steps, "/",isize(v[0]), "/", isize(v[1]));
|
|
println(hlog, " A: ", v[0]);
|
|
println(hlog, " B: ", v[1]);
|
|
}
|
|
for(int i: {0,1}) {
|
|
vector<cell*> new_v;
|
|
for(cell *c: v[i]) forCellCM(cn, c) if(adistance(cn) < adistance(c)) {
|
|
auto &vi = visited[cn];
|
|
if((vi&3) == 0) {
|
|
vi = 4 * (steps+1);
|
|
vi |= (1<<i);
|
|
new_v.push_back(cn);
|
|
}
|
|
else if((vi&3) == 2-i) {
|
|
vector<pair<cell*, int>> ca1, ca2;
|
|
int b1 = 4*steps-4;
|
|
int b2 = ((vi>>2)<<2) - 4;
|
|
for(auto p: visited) {
|
|
if(cdd) println(hlog, p);
|
|
int ps = p.second & 3;
|
|
if(ps == 1+i && p.second >= b1)
|
|
ca1.emplace_back(p.first, p.second/4);
|
|
if(ps == 2-i && p.second >= b2 && p.second <= b2+8)
|
|
ca2.emplace_back(p.first, p.second/4);
|
|
}
|
|
int bound = 1<<16;
|
|
for(auto p1: ca1) for(auto p2: ca2) {
|
|
hyperpoint h = tC0(relative_matrix(p1.first->master, p2.first->master));
|
|
int b = bucketer(h);
|
|
if(close_distances.count(b)) {
|
|
int d = close_distances[b] + p1.second + p2.second;
|
|
if(cdd) println(hlog, "candidate: close=", close_distances[b], p1, p2, "; h = ", h);
|
|
if(d < bound) bound = d;
|
|
}
|
|
else if(cdd) println(hlog, "bucket missing");
|
|
}
|
|
return memo[make_pair(c1, c2)] = bound;
|
|
return bound;
|
|
}
|
|
}
|
|
v[i] = std::move(new_v);
|
|
}
|
|
steps++;
|
|
}
|
|
}
|
|
|
|
cellwalker target;
|
|
int tsteps;
|
|
|
|
int dist_alt(cell *c) {
|
|
if(!target.at) {
|
|
target = cellwalker(currentmap->gamestart(), 0);
|
|
tsteps = 0;
|
|
for(int i=0; i<30; i++) target += wstep, target += rev, tsteps++;
|
|
}
|
|
if(specialland == laCamelot) return reg3::celldistance(c, target.at);
|
|
else {
|
|
int d = reg3::celldistance(c, target.at) - tsteps;
|
|
if(d < 10) target += wstep, target += rev, tsteps++;
|
|
return d;
|
|
}
|
|
}
|
|
#endif
|
|
|
|
}
|
|
}
|
|
|