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Eigenmath-fx
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divisors.cpp

divisors.cpp 4.2 KB
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  1. #include "stdafx.h"
    2. 

  2. 

  3. //-----------------------------------------------------------------------------
    4. 

  4. //
    5. 

  5. //	Generate all divisors of a term
    6. 

  6. //
    7. 

  7. //	Input:		Term on stack (factor * factor * ...)
    8. 

  8. //
    9. 

  9. //	Output:		Divisors on stack
    10. 

  10. //
    11. 

  11. //-----------------------------------------------------------------------------
    12. 

  12. 

  13. #include "defs.h"
    14. 

  14. 

  15. static void gen(int, int);
    16. 

  16. static void __factor_add(void);
    17. 

  17. static int __cmp(const void *, const void *);
    18. 

  18. 

  19. void
    20. 

  20. divisors(void)
    21. 

  21. {
    22. 

  22. 	int i, h, n;
    23. 

  23. 	save();
    24. 

  24. 	h = tos - 1;
    25. 

  25. 	divisors_onstack();
    26. 

  26. 	n = tos - h;
    27. 

  27. 	qsort(stack + h, n, sizeof (U *), __cmp);
    28. 

  28. 	p1 = alloc_tensor(n);
    29. 

  29. 	p1->u.tensor->ndim = 1;
    30. 

  30. 	p1->u.tensor->dim[0] = n;
    31. 

  31. 	for (i = 0; i < n; i++)
    32. 

  32. 		p1->u.tensor->elem[i] = stack[h + i];
    33. 

  33. 	tos = h;
    34. 

  34. 	push(p1);
    35. 

  35. 	restore();
    36. 

  36. }
    37. 

  37. 

  38. void
    39. 

  39. divisors_onstack(void)
    40. 

  40. {
    41. 

  41. 	int h, i, k, n;
    42. 

  42. 

  43. 	save();
    44. 

  44. 

  45. 	p1 = pop();
    46. 

  46. 

  47. 	h = tos;
    48. 

  48. 

  49. 	// push all of the term's factors
    50. 

  50. 

  51. 	if (isnum(p1)) {
    52. 

  52. 		push(p1);
    53. 

  53. 		factor_small_number();
    54. 

  54. 	} else if (car(p1) == symbol(ADD)) {
    55. 

  55. 		push(p1);
    56. 

  56. 		__factor_add();
    57. 

  57. //printf(">>>");
    58. 

  58. //for (i = h; i < tos; i++)
    59. 

  59. //print(stdout, stack[i]);
    60. 

  60. //printf("<<<");
    61. 

  61. 	} else if (car(p1) == symbol(MULTIPLY)) {
    62. 

  62. 		p1 = cdr(p1);
    63. 

  63. 		if (isnum(car(p1))) {
    64. 

  64. 			push(car(p1));
    65. 

  65. 			factor_small_number();
    66. 

  66. 			p1 = cdr(p1);
    67. 

  67. 		}
    68. 

  68. 		while (iscons(p1)) {
    69. 

  69. 			p2 = car(p1);
    70. 

  70. 			if (car(p2) == symbol(POWER)) {
    71. 

  71. 				push(cadr(p2));
    72. 

  72. 				push(caddr(p2));
    73. 

  73. 			} else {
    74. 

  74. 				push(p2);
    75. 

  75. 				push(one);
    76. 

  76. 			}
    77. 

  77. 			p1 = cdr(p1);
    78. 

  78. 		}
    79. 

  79. 	} else if (car(p1) == symbol(POWER)) {
    80. 

  80. 		push(cadr(p1));
    81. 

  81. 		push(caddr(p1));
    82. 

  82. 	} else {
    83. 

  83. 		push(p1);
    84. 

  84. 		push(one);
    85. 

  85. 	}
    86. 

  86. 

  87. 	k = tos;
    88. 

  88. 

  89. 	// contruct divisors by recursive descent
    90. 

  90. 

  91. 	push(one);
    92. 

  92. 

  93. 	gen(h, k);
    94. 

  94. 

  95. 	// move
    96. 

  96. 

  97. 	n = tos - k;
    98. 

  98. 

  99. 	for (i = 0; i < n; i++)
    100. 

  100. 		stack[h + i] = stack[k + i];
    101. 

  101. 

  102. 	tos = h + n;
    103. 

  103. 

  104. 	restore();
    105. 

  105. }
    106. 

  106. 

  107. //-----------------------------------------------------------------------------
    108. 

  108. //
    109. 

  109. //	Generate divisors
    110. 

  110. //
    111. 

  111. //	Input:		Base-exponent pairs on stack
    112. 

  112. //
    113. 

  113. //			h	first pair
    114. 

  114. //
    115. 

  115. //			k	just past last pair
    116. 

  116. //
    117. 

  117. //	Output:		Divisors on stack
    118. 

  118. //
    119. 

  119. //	For example, factor list 2 2 3 1 results in 6 divisors,
    120. 

  120. //
    121. 

  121. //		1
    122. 

  122. //		3
    123. 

  123. //		2
    124. 

  124. //		6
    125. 

  125. //		4
    126. 

  126. //		12
    127. 

  127. //
    128. 

  128. //-----------------------------------------------------------------------------
    129. 

  129. 

  130. #define ACCUM p1
    131. 

  131. #define BASE p2
    132. 

  132. #define EXPO p3
    133. 

  133. 

  134. static void
    135. 

  135. gen(int h, int k)
    136. 

  136. {
    137. 

  137. 	int expo, i;
    138. 

  138. 

  139. 	save();
    140. 

  140. 

  141. 	ACCUM = pop();
    142. 

  142. 

  143. 	if (h == k) {
    144. 

  144. 		push(ACCUM);
    145. 

  145. 		restore();
    146. 

  146. 		return;
    147. 

  147. 	}
    148. 

  148. 

  149. 	BASE = stack[h + 0];
    150. 

  150. 	EXPO = stack[h + 1];
    151. 

  151. 

  152. 	push(EXPO);
    153. 

  153. 	expo = pop_integer();
    154. 

  154. 

  155. 	for (i = 0; i <= abs(expo); i++) {
    156. 

  156. 		push(ACCUM);
    157. 

  157. 		push(BASE);
    158. 

  158. 		push_integer(sign(expo) * i);
    159. 

  159. 		power();
    160. 

  160. 		multiply();
    161. 

  161. 		gen(h + 2, k);
    162. 

  162. 	}
    163. 

  163. 

  164. 	restore();
    165. 

  165. }
    166. 

  166. 

  167. //-----------------------------------------------------------------------------
    168. 

  168. //
    169. 

  169. //	Factor ADD expression
    170. 

  170. //
    171. 

  171. //	Input:		Expression on stack
    172. 

  172. //
    173. 

  173. //	Output:		Factors on stack
    174. 

  174. //
    175. 

  175. //	Each factor consists of two expressions, the factor itself followed
    176. 

  176. //	by the exponent.
    177. 

  177. //
    178. 

  178. //-----------------------------------------------------------------------------
    179. 

  179. 

  180. static void
    181. 

  181. __factor_add(void)
    182. 

  182. {
    183. 

  183. 	save();
    184. 

  184. 

  185. 	p1 = pop();
    186. 

  186. 

  187. 	// get gcd of all terms
    188. 

  188. 

  189. 	p3 = cdr(p1);
    190. 

  190. 	push(car(p3));
    191. 

  191. 	p3 = cdr(p3);
    192. 

  192. 	while (iscons(p3)) {
    193. 

  193. 		push(car(p3));
    194. 

  194. 		gcd();
    195. 

  195. 		p3 = cdr(p3);
    196. 

  196. 	}
    197. 

  197. 

  198. 	// check gcd
    199. 

  199. 

  200. 	p2 = pop();
    201. 

  201. 	if (isplusone(p2)) {
    202. 

  202. 		push(p1);
    203. 

  203. 		push(one);
    204. 

  204. 		restore();
    205. 

  205. 		return;
    206. 

  206. 	}
    207. 

  207. 

  208. 	// push factored gcd
    209. 

  209. 

  210. 	if (isnum(p2)) {
    211. 

  211. 		push(p2);
    212. 

  212. 		factor_small_number();
    213. 

  213. 	} else if (car(p2) == symbol(MULTIPLY)) {
    214. 

  214. 		p3 = cdr(p2);
    215. 

  215. 		if (isnum(car(p3))) {
    216. 

  216. 			push(car(p3));
    217. 

  217. 			factor_small_number();
    218. 

  218. 		} else {
    219. 

  219. 			push(car(p3));
    220. 

  220. 			push(one);
    221. 

  221. 		}
    222. 

  222. 		p3 = cdr(p3);
    223. 

  223. 		while (iscons(p3)) {
    224. 

  224. 			push(car(p3));
    225. 

  225. 			push(one);
    226. 

  226. 			p3 = cdr(p3);
    227. 

  227. 		}
    228. 

  228. 	} else {
    229. 

  229. 		push(p2);
    230. 

  230. 		push(one);
    231. 

  231. 	}
    232. 

  232. 

  233. 	// divide each term by gcd
    234. 

  234. 

  235. 	push(p2);
    236. 

  236. 	inverse();
    237. 

  237. 	p2 = pop();
    238. 

  238. 

  239. 	push(zero);
    240. 

  240. 	p3 = cdr(p1);
    241. 

  241. 	while (iscons(p3)) {
    242. 

  242. 		push(p2);
    243. 

  243. 		push(car(p3));
    244. 

  244. 		multiply();
    245. 

  245. 		add();
    246. 

  246. 		p3 = cdr(p3);
    247. 

  247. 	}
    248. 

  248. 

  249. 	push(one);
    250. 

  250. 

  251. 	restore();
    252. 

  252. }
    253. 

  253. 

  254. static int
    255. 

  255. __cmp(const void *p1, const void *p2)
    256. 

  256. {
    257. 

  257. 	return cmp_expr(*((U **) p1), *((U **) p2));
    258. 

  258. }
    259. 

  259. 

  260. #if SELFTEST
    261. 

  261. 

  262. static char *s[] = {
    263. 

  263. 

  264. 	"divisors(12)",
    265. 

  265. 	"(1,2,3,4,6,12)",
    266. 

  266. 

  267. 	"divisors(-12)",
    268. 

  268. 	"(1,2,3,4,6,12)",
    269. 

  269. 

  270. 	"divisors(a)",
    271. 

  271. 	"(1,a)",
    272. 

  272. 

  273. 	"divisors(-a)",
    274. 

  274. 	"(1,a)",
    275. 

  275. 

  276. 	"divisors(+3*x+3)",
    277. 

  277. 	"(1,3,1+x,3+3*x)",
    278. 

  278. 

  279. 	"divisors(+3*x-3)",
    280. 

  280. 	"(1,3,-3+3*x,-1+x)",
    281. 

  281. 

  282. 	"divisors(-3*x+3)",
    283. 

  283. 	"(1,3,1-x,3-3*x)",
    284. 

  284. 

  285. 	"divisors(-3*x-3)",
    286. 

  286. 	"(1,3,1+x,3+3*x)",
    287. 

  287. };
    288. 

  288. 

  289. void
    290. 

  290. test_divisors(void)
    291. 

  291. {
    292. 

  292. 	test(__FILE__, s, sizeof s / sizeof (char *));
    293. 

  293. }
    294. 

  294. 

  295. #endif
    296. 

  296.