ref: 4338bb921e84cfb5186fe60950cf5704f997d2c2
dir: /unfinished/separate.c/
/* * separate.c: Implementation of `Block Puzzle', a Japanese-only * Nikoli puzzle seen at * http://www.nikoli.co.jp/ja/puzzles/block_puzzle/ * * It's difficult to be absolutely sure of the rules since online * Japanese translators are so bad, but looking at the sample * puzzle it seems fairly clear that the rules of this one are * very simple. You have an mxn grid in which every square * contains a letter, there are k distinct letters with k dividing * mn, and every letter occurs the same number of times; your aim * is to find a partition of the grid into disjoint k-ominoes such * that each k-omino contains exactly one of each letter. * * (It may be that Nikoli always have m,n,k equal to one another. * However, I don't see that that's critical to the puzzle; k|mn * is the only really important constraint, and even that could * probably be dispensed with if some squares were marked as * unused.) */ /* * Current status: only the solver/generator is yet written, and * although working in principle it's _very_ slow. It generates * 5x5n5 or 6x6n4 readily enough, 6x6n6 with a bit of effort, and * 7x7n7 only with a serious strain. I haven't dared try it higher * than that yet. * * One idea to speed it up is to implement more of the solver. * Ideas I've so far had include: * * - Generalise the deduction currently expressed as `an * undersized chain with only one direction to extend must take * it'. More generally, the deduction should say `if all the * possible k-ominoes containing a given chain also contain * square x, then mark square x as part of that k-omino'. * + For example, consider this case: * * a ? b This represents the top left of a board; the letters * ? ? ? a,b,c do not represent the letters used in the puzzle, * c ? ? but indicate that those three squares are known to be * of different ominoes. Now if k >= 4, we can immediately * deduce that the square midway between b and c belongs to the * same omino as a, because there is no way we can make a 4-or- * more-omino containing a which does not also contain that square. * (Most easily seen by imagining cutting that square out of the * grid; then, clearly, the omino containing a has only two * squares to expand into, and needs at least three.) * * The key difficulty with this mode of reasoning is * identifying such squares. I can't immediately think of a * simple algorithm for finding them on a wholesale basis. * * - Bfs out from a chain looking for the letters it lacks. For * example, in this situation (top three rows of a 7x7n7 grid): * * +-----------+-+ * |E-A-F-B-C D|D| * +------- || * |E-C-G-D G|G E| * +-+--- | * |E|E G A B F A| * * In this situation we can be sure that the top left chain * E-A-F-B-C does extend rightwards to the D, because there is * no other D within reach of that chain. Note also that the * bfs can skip squares which are known to belong to other * ominoes than this one. * * (This deduction, I fear, should only be used in an * emergency, because it relies on _all_ squares within range * of the bfs having particular values and so using it during * incremental generation rather nails down a lot of the grid.) * * It's conceivable that another thing we could do would be to * increase the flexibility in the grid generator: instead of * nailing down the _value_ of any square depended on, merely nail * down its equivalence to other squares. Unfortunately this turns * the letter-selection phase of generation into a general graph * colouring problem (we must draw a graph with equivalence * classes of squares as the vertices, and an edge between any two * vertices representing equivalence classes which contain squares * that share an omino, and then k-colour the result) and hence * requires recursion, which bodes ill for something we're doing * that many times per generation. * * I suppose a simple thing I could try would be tuning the retry * count, just in case it's set too high or too low for efficient * generation. */ #include <stdio.h> #include <stdlib.h> #include <string.h> #include <assert.h> #include <ctype.h> #ifdef NO_TGMATH_H # include <math.h> #else # include <tgmath.h> #endif #include "puzzles.h" enum { COL_BACKGROUND, NCOLOURS }; struct game_params { int w, h, k; }; struct game_state { int FIXME; }; static game_params *default_params(void) { game_params *ret = snew(game_params); ret->w = ret->h = ret->k = 5; /* FIXME: a bit bigger? */ return ret; } static bool game_fetch_preset(int i, char **name, game_params **params) { return false; } static void free_params(game_params *params) { sfree(params); } static game_params *dup_params(const game_params *params) { game_params *ret = snew(game_params); *ret = *params; /* structure copy */ return ret; } static void decode_params(game_params *params, char const *string) { params->w = params->h = params->k = atoi(string); while (*string && isdigit((unsigned char)*string)) string++; if (*string == 'x') { string++; params->h = atoi(string); while (*string && isdigit((unsigned char)*string)) string++; } if (*string == 'n') { string++; params->k = atoi(string); while (*string && isdigit((unsigned char)*string)) string++; } } static char *encode_params(const game_params *params, bool full) { char buf[256]; sprintf(buf, "%dx%dn%d", params->w, params->h, params->k); return dupstr(buf); } static config_item *game_configure(const game_params *params) { return NULL; } static game_params *custom_params(const config_item *cfg) { return NULL; } static const char *validate_params(const game_params *params, bool full) { return NULL; } /* ---------------------------------------------------------------------- * Solver and generator. */ struct solver_scratch { int w, h, k; /* * Tracks connectedness between squares. */ DSF *dsf; /* * size[dsf_canonify(dsf, yx)] tracks the size of the * connected component containing yx. */ int *size; /* * contents[dsf_canonify(dsf, yx)*k+i] tracks whether or not * the connected component containing yx includes letter i. If * the value is -1, it doesn't; otherwise its value is the * index in the main grid of the square which contributes that * letter to the component. */ int *contents; /* * disconnect[dsf_canonify(dsf, yx1)*w*h + dsf_canonify(dsf, yx2)] * tracks whether or not the connected components containing * yx1 and yx2 are known to be distinct. */ bool *disconnect; /* * Temporary space used only inside particular solver loops. */ int *tmp; }; static struct solver_scratch *solver_scratch_new(int w, int h, int k) { int wh = w*h; struct solver_scratch *sc = snew(struct solver_scratch); sc->w = w; sc->h = h; sc->k = k; sc->dsf = dsf_new(wh); sc->size = snewn(wh, int); sc->contents = snewn(wh * k, int); sc->disconnect = snewn(wh*wh, bool); sc->tmp = snewn(wh, int); return sc; } static void solver_scratch_free(struct solver_scratch *sc) { dsf_free(sc->dsf); sfree(sc->size); sfree(sc->contents); sfree(sc->disconnect); sfree(sc->tmp); sfree(sc); } static void solver_connect(struct solver_scratch *sc, int yx1, int yx2) { int w = sc->w, h = sc->h, k = sc->k; int wh = w*h; int i, yxnew; yx1 = dsf_canonify(sc->dsf, yx1); yx2 = dsf_canonify(sc->dsf, yx2); assert(yx1 != yx2); /* * To connect two components together into a bigger one, we * start by merging them in the dsf itself. */ dsf_merge(sc->dsf, yx1, yx2); yxnew = dsf_canonify(sc->dsf, yx2); /* * The size of the new component is the sum of the sizes of the * old ones. */ sc->size[yxnew] = sc->size[yx1] + sc->size[yx2]; /* * The contents bitmap of the new component is the union of the * contents of the old ones. * * Given two numbers at most one of which is not -1, we can * find the other one by adding the two and adding 1; this * will yield -1 if both were -1 to begin with, otherwise the * other. * * (A neater approach would be to take their bitwise AND, but * this is unfortunately not well-defined standard C when done * to signed integers.) */ for (i = 0; i < k; i++) { assert(sc->contents[yx1*k+i] < 0 || sc->contents[yx2*k+i] < 0); sc->contents[yxnew*k+i] = (sc->contents[yx1*k+i] + sc->contents[yx2*k+i] + 1); } /* * We must combine the rows _and_ the columns in the disconnect * matrix. */ for (i = 0; i < wh; i++) sc->disconnect[yxnew*wh+i] = (sc->disconnect[yx1*wh+i] || sc->disconnect[yx2*wh+i]); for (i = 0; i < wh; i++) sc->disconnect[i*wh+yxnew] = (sc->disconnect[i*wh+yx1] || sc->disconnect[i*wh+yx2]); } static void solver_disconnect(struct solver_scratch *sc, int yx1, int yx2) { int w = sc->w, h = sc->h; int wh = w*h; yx1 = dsf_canonify(sc->dsf, yx1); yx2 = dsf_canonify(sc->dsf, yx2); assert(yx1 != yx2); assert(!sc->disconnect[yx1*wh+yx2]); assert(!sc->disconnect[yx2*wh+yx1]); /* * Mark the components as disconnected from each other in the * disconnect matrix. */ sc->disconnect[yx1*wh+yx2] = true; sc->disconnect[yx2*wh+yx1] = true; } static void solver_init(struct solver_scratch *sc) { int w = sc->w, h = sc->h; int wh = w*h; int i; /* * Set up most of the scratch space. We don't set up the * contents array, however, because this will change if we * adjust the letter arrangement and re-run the solver. */ dsf_reinit(sc->dsf); for (i = 0; i < wh; i++) sc->size[i] = 1; memset(sc->disconnect, 0, wh*wh * sizeof(bool)); } static int solver_attempt(struct solver_scratch *sc, const unsigned char *grid, bool *gen_lock) { int w = sc->w, h = sc->h, k = sc->k; int wh = w*h; int i, x, y; bool done_something_overall = false; /* * Set up the contents array from the grid. */ for (i = 0; i < wh*k; i++) sc->contents[i] = -1; for (i = 0; i < wh; i++) sc->contents[dsf_canonify(sc->dsf, i)*k+grid[i]] = i; while (1) { bool done_something = false; /* * Go over the grid looking for reasons to add to the * disconnect matrix. We're after pairs of squares which: * * - are adjacent in the grid * - belong to distinct dsf components * - their components are not already marked as * disconnected * - their components share a letter in common. */ for (y = 0; y < h; y++) { for (x = 0; x < w; x++) { int dir; for (dir = 0; dir < 2; dir++) { int x2 = x + dir, y2 = y + 1 - dir; int yx = y*w+x, yx2 = y2*w+x2; if (x2 >= w || y2 >= h) continue; /* one square is outside the grid */ yx = dsf_canonify(sc->dsf, yx); yx2 = dsf_canonify(sc->dsf, yx2); if (yx == yx2) continue; /* same dsf component */ if (sc->disconnect[yx*wh+yx2]) continue; /* already known disconnected */ for (i = 0; i < k; i++) if (sc->contents[yx*k+i] >= 0 && sc->contents[yx2*k+i] >= 0) break; if (i == k) continue; /* no letter in common */ /* * We've found one. Mark yx and yx2 as * disconnected from each other. */ #ifdef SOLVER_DIAGNOSTICS printf("Disconnecting %d and %d (%c)\n", yx, yx2, 'A'+i); #endif solver_disconnect(sc, yx, yx2); done_something = done_something_overall = true; /* * We have just made a deduction which hinges * on two particular grid squares being the * same. If we are feeding back to a generator * loop, we must therefore mark those squares * as fixed in the generator, so that future * rearrangement of the grid will not break * the information on which we have already * based deductions. */ if (gen_lock) { gen_lock[sc->contents[yx*k+i]] = true; gen_lock[sc->contents[yx2*k+i]] = true; } } } } /* * Now go over the grid looking for dsf components which * are below maximum size and only have one way to extend, * and extending them. */ for (i = 0; i < wh; i++) sc->tmp[i] = -1; for (y = 0; y < h; y++) { for (x = 0; x < w; x++) { int yx = dsf_canonify(sc->dsf, y*w+x); int dir; if (sc->size[yx] == k) continue; for (dir = 0; dir < 4; dir++) { int x2 = x + (dir==0 ? -1 : dir==2 ? 1 : 0); int y2 = y + (dir==1 ? -1 : dir==3 ? 1 : 0); int yx2, yx2c; if (y2 < 0 || y2 >= h || x2 < 0 || x2 >= w) continue; yx2 = y2*w+x2; yx2c = dsf_canonify(sc->dsf, yx2); if (yx2c != yx && !sc->disconnect[yx2c*wh+yx]) { /* * Component yx can be extended into square * yx2. */ if (sc->tmp[yx] == -1) sc->tmp[yx] = yx2; else if (sc->tmp[yx] != yx2) sc->tmp[yx] = -2; /* multiple choices found */ } } } } for (i = 0; i < wh; i++) { if (sc->tmp[i] >= 0) { /* * Make sure we haven't connected the two already * during this loop (which could happen if for * _both_ components this was the only way to * extend them). */ if (dsf_canonify(sc->dsf, i) == dsf_canonify(sc->dsf, sc->tmp[i])) continue; #ifdef SOLVER_DIAGNOSTICS printf("Connecting %d and %d\n", i, sc->tmp[i]); #endif solver_connect(sc, i, sc->tmp[i]); done_something = done_something_overall = true; break; } } if (!done_something) break; } /* * Return 0 if we haven't made any progress; 1 if we've done * something but not solved it completely; 2 if we've solved * it completely. */ for (i = 0; i < wh; i++) if (sc->size[dsf_canonify(sc->dsf, i)] != k) break; if (i == wh) return 2; if (done_something_overall) return 1; return 0; } static unsigned char *generate(int w, int h, int k, random_state *rs) { int wh = w*h; int n = wh/k; struct solver_scratch *sc; unsigned char *grid; unsigned char *shuffled; int i, j, m, retries; int *permutation; bool *gen_lock; sc = solver_scratch_new(w, h, k); grid = snewn(wh, unsigned char); shuffled = snewn(k, unsigned char); permutation = snewn(wh, int); gen_lock = snewn(wh, bool); do { DSF *dsf = divvy_rectangle(w, h, k, rs); /* * Go through the dsf and find the indices of all the * squares involved in each omino, in a manner conducive * to per-omino indexing. We set permutation[i*k+j] to be * the index of the jth square (ordered arbitrarily) in * omino i. */ for (i = j = 0; i < wh; i++) if (dsf_canonify(dsf, i) == i) { sc->tmp[i] = j; /* * During this loop and the following one, we use * the last element of each row of permutation[] * as a counter of the number of indices so far * placed in it. When we place the final index of * an omino, that counter is overwritten, but that * doesn't matter because we'll never use it * again. Of course this depends critically on * divvy_rectangle() having returned correct * results, or else chaos would ensue. */ permutation[j*k+k-1] = 0; j++; } for (i = 0; i < wh; i++) { j = sc->tmp[dsf_canonify(dsf, i)]; m = permutation[j*k+k-1]++; permutation[j*k+m] = i; } /* * Track which squares' letters we have already depended * on for deductions. This is gradually updated by * solver_attempt(). */ memset(gen_lock, 0, wh * sizeof(bool)); /* * Now repeatedly fill the grid with letters, and attempt * to solve it. If the solver makes progress but does not * fail completely, then gen_lock will have been updated * and we try again. On a complete failure, though, we * have no option but to give up and abandon this set of * ominoes. */ solver_init(sc); retries = k*k; while (1) { /* * Fill the grid with letters. We can safely use * sc->tmp to hold the set of letters required at each * stage, since it's at least size k and is currently * unused. */ for (i = 0; i < n; i++) { /* * First, determine the set of letters already * placed in this omino by gen_lock. */ for (j = 0; j < k; j++) sc->tmp[j] = j; for (j = 0; j < k; j++) { int index = permutation[i*k+j]; int letter = grid[index]; if (gen_lock[index]) sc->tmp[letter] = -1; } /* * Now collect together all the remaining letters * and randomly shuffle them. */ for (j = m = 0; j < k; j++) if (sc->tmp[j] >= 0) sc->tmp[m++] = sc->tmp[j]; shuffle(sc->tmp, m, sizeof(*sc->tmp), rs); /* * Finally, write the shuffled letters into the * grid. */ for (j = 0; j < k; j++) { int index = permutation[i*k+j]; if (!gen_lock[index]) grid[index] = sc->tmp[--m]; } assert(m == 0); } /* * Now we have a candidate grid. Attempt to progress * the solution. */ m = solver_attempt(sc, grid, gen_lock); if (m == 2 || /* success */ (m == 0 && retries-- <= 0)) /* failure */ break; if (m == 1) retries = k*k; /* reset this counter, and continue */ } dsf_free(dsf); } while (m == 0); sfree(gen_lock); sfree(permutation); sfree(shuffled); solver_scratch_free(sc); return grid; } /* ---------------------------------------------------------------------- * End of solver/generator code. */ static char *new_game_desc(const game_params *params, random_state *rs, char **aux, bool interactive) { int w = params->w, h = params->h, wh = w*h, k = params->k; unsigned char *grid; char *desc; int i; grid = generate(w, h, k, rs); desc = snewn(wh+1, char); for (i = 0; i < wh; i++) desc[i] = 'A' + grid[i]; desc[wh] = '\0'; sfree(grid); return desc; } static const char *validate_desc(const game_params *params, const char *desc) { return NULL; } static game_state *new_game(midend *me, const game_params *params, const char *desc) { game_state *state = snew(game_state); state->FIXME = 0; return state; } static game_state *dup_game(const game_state *state) { game_state *ret = snew(game_state); ret->FIXME = state->FIXME; return ret; } static void free_game(game_state *state) { sfree(state); } static char *solve_game(const game_state *state, const game_state *currstate, const char *aux, const char **error) { return NULL; } static bool game_can_format_as_text_now(const game_params *params) { return true; } static char *game_text_format(const game_state *state) { return NULL; } static game_ui *new_ui(const game_state *state) { return NULL; } static void free_ui(game_ui *ui) { } static void game_changed_state(game_ui *ui, const game_state *oldstate, const game_state *newstate) { } struct game_drawstate { int tilesize; int FIXME; }; static char *interpret_move(const game_state *state, game_ui *ui, const game_drawstate *ds, int x, int y, int button) { return NULL; } static game_state *execute_move(const game_state *state, const char *move) { return NULL; } /* ---------------------------------------------------------------------- * Drawing routines. */ static void game_compute_size(const game_params *params, int tilesize, const game_ui *ui, int *x, int *y) { *x = *y = 10 * tilesize; /* FIXME */ } static void game_set_size(drawing *dr, game_drawstate *ds, const game_params *params, int tilesize) { ds->tilesize = tilesize; } static float *game_colours(frontend *fe, int *ncolours) { float *ret = snewn(3 * NCOLOURS, float); frontend_default_colour(fe, &ret[COL_BACKGROUND * 3]); *ncolours = NCOLOURS; return ret; } static game_drawstate *game_new_drawstate(drawing *dr, const game_state *state) { struct game_drawstate *ds = snew(struct game_drawstate); ds->tilesize = 0; ds->FIXME = 0; return ds; } static void game_free_drawstate(drawing *dr, game_drawstate *ds) { sfree(ds); } static void game_redraw(drawing *dr, game_drawstate *ds, const game_state *oldstate, const game_state *state, int dir, const game_ui *ui, float animtime, float flashtime) { } static float game_anim_length(const game_state *oldstate, const game_state *newstate, int dir, game_ui *ui) { return 0.0F; } static float game_flash_length(const game_state *oldstate, const game_state *newstate, int dir, game_ui *ui) { return 0.0F; } static void game_get_cursor_location(const game_ui *ui, const game_drawstate *ds, const game_state *state, const game_params *params, int *x, int *y, int *w, int *h) { } static int game_status(const game_state *state) { return 0; } static bool game_timing_state(const game_state *state, game_ui *ui) { return true; } static void game_print_size(const game_params *params, const game_ui *ui, float *x, float *y) { } static void game_print(drawing *dr, const game_state *state, const game_ui *ui, int tilesize) { } #ifdef COMBINED #define thegame separate #endif const struct game thegame = { "Separate", NULL, NULL, default_params, game_fetch_preset, NULL, decode_params, encode_params, free_params, dup_params, false, game_configure, custom_params, validate_params, new_game_desc, validate_desc, new_game, dup_game, free_game, false, solve_game, false, game_can_format_as_text_now, game_text_format, NULL, NULL, /* get_prefs, set_prefs */ new_ui, free_ui, NULL, /* encode_ui */ NULL, /* decode_ui */ NULL, /* game_request_keys */ game_changed_state, NULL, /* current_key_label */ interpret_move, execute_move, 20 /* FIXME */, game_compute_size, game_set_size, game_colours, game_new_drawstate, game_free_drawstate, game_redraw, game_anim_length, game_flash_length, game_get_cursor_location, game_status, false, false, game_print_size, game_print, false, /* wants_statusbar */ false, game_timing_state, 0, /* flags */ };