Add translation for plog (using TRANSLATE-WITH-FLONUM-OP)
[maxima.git] / src / lesfac.lisp
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1 ;;; -*- Mode: Lisp; Package: Maxima; Syntax: Common-Lisp; Base: 10 -*- ;;;;
2 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
3 ;;; The data in this file contains enhancements. ;;;;;
4 ;;; ;;;;;
5 ;;; Copyright (c) 1984,1987 by William Schelter,University of Texas ;;;;;
6 ;;; All rights reserved ;;;;;
7 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
8 ;;; (c) Copyright 1981 Massachusetts Institute of Technology ;;;
9 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
11 (in-package :maxima)
13 (macsyma-module lesfac)
15 (load-macsyma-macros rzmac ratmac)
17 (defun getunhack (gen)
18 (or (get gen 'unhacked) (pget gen)))
20 (defun frpoly? (r)
21 (equal 1 (cdr r)))
23 (defmacro setcall (fn a b &rest args)
24 `(prog1
25 (first (setq ,a (,fn ,a ,b ,@args)))
26 (setq ,b (third ,a)
27 ,a (second ,a))))
29 (defun pquocof (p q)
30 (let ((qq (testdivide p q)))
31 (if qq
32 (values q qq 1)
33 (values 1 p q))))
35 (defun polyst (a)
36 (if (pcoefp a)
37 (list a)
38 (cons (cons (car a) (cadr a)) (polyst (caddr a)))))
40 (defun cdinf (a b both)
41 (cond ((or (pcoefp a) (pcoefp b))
42 (values 1 a b))
44 (setq a (ncons (copy-tree a))
45 b (ncons (if both (copy-tree b) b)))
46 (values (cd1 a b both) (car a) (car b)))))
48 (defun cd1 (a b both)
49 (cond ((or (pcoefp (car a)) (pcoefp (car b))) 1)
50 ((eq (caar a) (caar b))
51 (ptimes (pexpt (pget (caar a)) ;CHECK FOR ALG. TRUNC.
52 (prog1 (cond (both (+ (cadar a) (cadar b))) (t (cadar a)))
53 (rplaca a (caddar a))
54 (cond (both (rplaca b (caddar b)))
55 (t (setq b (cddar b))))))
56 (cd1 a b both)))
57 ((pointergp (caar a) (caar b)) (cd1 (cddar a) b both))
58 (t (cd1 a (cddar b) both))))
60 (defun lmake (p l)
61 (cond ((pcoefp p)
62 (cons p l))
63 ((get (car p) 'unhacked)
64 (lmake (caddr p) (cons (cons (car p) (cadr p)) l)))
66 (setq l (lmake (caddr p) l))
67 (rplaca l (list (car p) (cadr p) (car l))))))
69 (defun lmake2 (p l)
70 (setq l (lmake p l))
71 (mapc #'(lambda (x) (rplaca x (getunhack (car x)))) (cdr l))
72 (if (equal (car l) 1)
73 (cdr l)
74 (rplaca l (cons (car l) 1))))
76 (defun pmake (l)
77 (cond ((null l)
79 ((zerop (cdar l))
80 (pmake (cdr l)))
81 ((numberp (caar l)) ;CLAUSE SHOULD BE ELIMINATED ASAP
82 (ptimes (cexpt (caar l) (cdar l)) (pmake (cdr l))))
84 (ptimes (list (caar l) (cdar l) 1) (pmake (cdr l))))))
86 (defun fpgcdco (p q)
87 (let (($ratfac nil)
88 (gcdl nil)) ;FACTORED PGCDCOFACTS
89 (if (or (pcoefp p) (pcoefp q))
90 (values-list (pgcdcofacts p q))
91 (values (ptimeschk (setcall pgcdcofacts p q)
92 (car (setq p (lmake p nil)
93 q (lmake q nil)
94 gcdl (mapcar #'pmake (lgcd1 (cdr p) (cdr q))))))
95 (ptimeschk (car p) (cadr gcdl))
96 (ptimeschk (car q) (caddr gcdl))))))
98 (defun facmgcd (pl) ;GCD OF POLY LIST FOR EZGCD WITH RATFAC
99 (do ((l (cdr pl) (cdr l))
100 (ans nil)
101 (gcd (car pl)))
102 ((null l) (cons gcd (nreverse ans)))
103 (multiple-value-bind (g x y) (fpgcdco gcd (car l))
104 (cond ((equal g 1)
105 (return (cons 1 pl)))
106 ((null ans)
107 (setq ans (list x)))
108 ((not (equal x 1))
109 (do ((l2 ans (cdr l2)))
110 ((null l2))
111 (rplaca l2 (ptimes x (car l2))))))
112 (push y ans)
113 (setq gcd g))))
115 ;;; NOTE: ITEMS ON VARLIST ARE POS. NORMAL
116 ;;; INTEGER COEF GCD=1 AND LEADCOEF. IS POS.
118 (defun lgcd1 (a b)
119 (prog (ptlist g bj c t1 d1 d2 dummy)
120 (setq ptlist (mapcar #'(lambda (ig) (declare (ignore ig)) b) a))
121 (do ((a a (cdr a))
122 (ptlist ptlist (cdr ptlist)))
123 ((null a))
124 (do ((ai (getunhack (caar a)))
125 (b (car ptlist) (cdr b)))
126 ((null b))
127 (and (zerop (cdar b)) (go nextb))
128 (setq d1 1 d2 1)
129 (setq bj (getunhack (caar b)))
130 (setq c (cond ((pirredp (caar a))
131 (if (pirredp (caar b))
133 (multiple-value-setq (dummy bj ai) (pquocof bj ai))))
134 ((pirredp (caar b))
135 (multiple-value-setq (dummy ai bj) (pquocof ai bj)))
137 (setcall pgcdcofacts ai bj))))
138 (cond ((equal c 1) (go nextb))
139 ((equal ai 1) (go bloop)))
140 aloop
141 (when (setq t1 (testdivide ai c))
142 (setq ai t1)
143 (incf d1)
144 (go aloop))
145 bloop
146 (and (= d1 1)
147 (not (equal bj 1))
148 (do ((t1
149 (testdivide bj c)
150 (testdivide bj c)))
151 ((null t1))
152 (setq bj t1 d2 (1+ d2))))
153 (setq g (cons (cons (makprodg c t)
154 (min (setq d1 (* d1 (cdar a)))
155 (setq d2 (* d2 (cdar b)))))
157 (cond ((> d1 (cdar g))
158 (rplacd (last a)
159 (ncons (cons (caar g) (- d1 (cdar g)))))
160 (rplacd (last ptlist) (ncons (cdr b)))))
161 (cond ((> d2 (cdar g))
162 (rplacd (last b)
163 (ncons (cons (caar g) (- d2 (cdar g)))))))
164 (rplaca (car a) (makprodg ai t))
165 (rplaca (car b) (makprodg bj t))
166 (and (equal bj 1) (rplacd (car b) 0))
167 (and (equal ai 1) (rplacd (car a) 0) (return nil))
168 nextb))
169 (return (list g a b))))
171 (defun makprodg (p sw)
172 (if (pcoefp p)
174 (car (makprod p sw))))
176 (defun dopgcdcofacts (x y)
177 (let (($gcd $gcd)
178 ($ratfac nil))
179 (unless (member $gcd *gcdl* :test #'eq)
180 (setq $gcd '$ez))
181 (values-list (pgcdcofacts x y))))
183 (defun facrplus (x y)
184 (let ((a (car x))
185 (b (cdr x))
186 (c (car y))
187 (d (cdr y))
188 dummy)
189 (multiple-value-setq (x a c) (dopgcdcofacts a c))
190 (multiple-value-setq (y b d) (fpgcdco b d))
191 (setq a (makprod (pplus (pflatten (ptimeschk a d))
192 (pflatten (ptimeschk b c))) nil))
193 (setq b (ptimeschk b d))
194 (cond ($algebraic
195 (setq y (ptimeschk y b))
196 (multiple-value-setq (dummy y a) (fpgcdco y a)) ;for unexpected gcd
197 (cons (ptimes x a) y))
199 (multiple-value-setq (c y b) (cdinf y b nil))
200 (multiple-value-setq (dummy y a) (fpgcdco y a))
201 (cons (ptimes x a) (ptimeschk y (ptimeschk c b)))))))
203 (defun mfacpplus (l)
204 (let (($gcd (or $gcd '$ez))
205 ($ratfac nil)
206 (g nil))
207 (setq g (oldcontent2 (sort (copy-list l) 'contodr) 0))
208 (cond ((pzerop g) g)
209 ((do ((a (pflatten (pquotient (car l) g))
210 (pplus a (pflatten (pquotient (car ll) g))))
211 (ll (cdr l) (cdr ll)))
212 ((null ll) (ptimes g (makprod a nil))))))))
214 (defun facrtimes (x y gcdsw)
215 (if (not gcdsw)
216 (cons (ptimes (car x) (car y)) (ptimeschk (cdr x) (cdr y)))
217 ;; gcdsw = true
218 (multiple-value-bind (g1 g2 g3) (cdinf (car x) (car y) t)
219 (multiple-value-bind (h1 h2 h3) (cdinf (cdr x) (cdr y) t)
220 (multiple-value-bind (x1 x2 x3) (fpgcdco g2 h3)
221 (declare (ignore x1))
222 (multiple-value-bind (y1 y2 y3) (fpgcdco g3 h2)
223 (declare (ignore y1))
224 (cons (ptimes g1 (ptimes x2 y2))
225 (ptimeschk h1 (ptimeschk x3 y3)))))))))
227 (defun pfacprod (poly) ;FOR RAT3D
228 (if (pcoefp poly)
229 (cfactor poly)
230 (nconc (pfacprod (caddr poly)) (list (pget (car poly)) (cadr poly)))))
232 (defun fpcontent (poly)
233 (let (($ratfac nil)) ;algebraic uses
234 (setq poly (oldcontent poly)) ;rattimes?
235 (let ((a (lowdeg (cdadr poly)))) ;main var. content
236 (when (plusp a)
237 (setq a (list (caadr poly) a 1))
238 (setq poly (list (ptimes (car poly) a)
239 (pquotient (cadr poly) a)))))
240 (if (pminusp (cadr poly))
241 (list (pminus (car poly)) (pminus (cadr poly)))
242 poly)))
244 ;; LOWDEG written to compute the lowest degree of a polynomial. - RZ
246 (defun lowdeg (p)
247 (do ((l p (cddr l)))
248 ((null (cddr l)) (car l))))
250 (defun makprod (poly contswitch)
251 (cond ((pureprod poly) poly)
252 ((null (cdddr poly))
253 (ptimes (list (car poly) (cadr poly) 1)
254 (makprod (caddr poly) contswitch)))
255 (contswitch
256 (makprod1 poly))
257 (t (setq poly (fpcontent poly))
258 (ptimes (makprod (car poly) contswitch) (makprod1 (cadr poly))))))
260 (defun makprod1 (poly)
261 (do ((v varlist (cdr v))
262 (g genvar (cdr g))
263 (p (pdis poly)))
264 ((null v) (maksymp poly))
265 (and (alike1 p (car v)) (return (pget (car g))))))
267 (defun maksym (p)
268 (let ((g (gensym))
269 (e (pdis p)))
270 (putprop g e 'disrep)
271 (valput g (1- (valget (car genvar))))
272 (push g genvar)
273 (push e varlist)
274 (putprop g p 'unhacked)
277 (defun maksymp (p)
278 (if (atom p)
280 (pget (maksym p))))
282 (defun pflatten (h)
283 (do ((m (listovars h) (cdr m)))
284 ((null m) (return-from pflatten h))
285 (unless (let ((p (getunhack (car m))))
286 (or (null p) (eq (car m) (car p))))
287 (return-from pflatten (let (($ratfac nil)) (pflat1 h))))))
289 (defun pflat1 (p)
290 (cond ((pcoefp p) p)
291 ((null (cdddr p))
292 (ptimes (pexpt (getunhack (car p)) (cadr p)) (pflat1 (caddr p))))
293 (t (do ((val (getunhack (car p)))
294 (ld (cadr p) (car a))
295 (a (cdddr p) (cddr a))
296 (ans (pflat1 (caddr p))))
297 ((null a) (ptimes ans (pexpt val ld)))
298 (setq ans (pplus (ptimes ans (pexpt val (- ld (car a))))
299 (pflat1 (cadr a))))))))
301 (defun pirredp (x)
302 (and (setq x (get x 'disrep))
303 (or (atom x) (member 'irreducible (cdar x) :test #'eq))))