[1201] | 1 | ;;; -*- Mode: Lisp -*-
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[77] | 2 | ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
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| 3 | ;;;
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| 4 | ;;; Copyright (C) 1999, 2002, 2009, 2015 Marek Rychlik <rychlik@u.arizona.edu>
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| 5 | ;;;
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| 6 | ;;; This program is free software; you can redistribute it and/or modify
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| 7 | ;;; it under the terms of the GNU General Public License as published by
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| 8 | ;;; the Free Software Foundation; either version 2 of the License, or
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| 9 | ;;; (at your option) any later version.
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| 10 | ;;;
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| 11 | ;;; This program is distributed in the hope that it will be useful,
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| 12 | ;;; but WITHOUT ANY WARRANTY; without even the implied warranty of
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| 13 | ;;; MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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| 14 | ;;; GNU General Public License for more details.
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| 15 | ;;;
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| 16 | ;;; You should have received a copy of the GNU General Public License
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| 17 | ;;; along with this program; if not, write to the Free Software
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| 18 | ;;; Foundation, Inc., 59 Temple Place - Suite 330, Boston, MA 02111-1307, USA.
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| 19 | ;;;
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| 20 | ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
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| 21 |
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[431] | 22 | (defpackage "POLYNOMIAL"
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[3129] | 23 | (:use :cl :utils :ring :monom :order :term)
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[2596] | 24 | (:export "POLY"
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| 25 | "POLY-TERMLIST"
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[3016] | 26 | "POLY-TERM-ORDER"
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[3071] | 27 | "CHANGE-TERM-ORDER"
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[3099] | 28 | "STANDARD-EXTENSION"
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[3101] | 29 | "STANDARD-EXTENSION-1"
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[3109] | 30 | "STANDARD-SUM"
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[3094] | 31 | "SATURATION-EXTENSION"
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| 32 | "ALIST->POLY")
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[3129] | 33 | (:documentation "Implements polynomials."))
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[143] | 34 |
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[431] | 35 | (in-package :polynomial)
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| 36 |
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[1927] | 37 | (proclaim '(optimize (speed 3) (space 0) (safety 0) (debug 0)))
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[52] | 38 |
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[2442] | 39 | (defclass poly ()
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[3253] | 40 | ((dimension :initform nil
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[3250] | 41 | :initarg :dimension
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| 42 | :accessor poly-dimension
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[3242] | 43 | :documentation "Shared dimension of all terms, the number of variables")
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[3250] | 44 | (termlist :initform nil :initarg :termlist :accessor poly-termlist
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[2697] | 45 | :documentation "List of terms.")
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[3250] | 46 | (order :initform #'lex> :initarg :order :accessor poly-term-order
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[2697] | 47 | :documentation "Monomial/term order."))
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[3262] | 48 | (:default-initargs :dimension nil :termlist nil :order #'lex>)
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[2695] | 49 | (:documentation "A polynomial with a list of terms TERMLIST, ordered
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[2696] | 50 | according to term order ORDER, which defaults to LEX>."))
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[2442] | 51 |
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[2471] | 52 | (defmethod print-object ((self poly) stream)
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[3241] | 53 | (print-unreadable-object (self stream :type t :identity t)
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[3243] | 54 | (with-accessors ((dimension poly-dimension)
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| 55 | (termlist poly-termlist)
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| 56 | (order poly-term-order))
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[3237] | 57 | self
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[3244] | 58 | (format stream "DIMENSION=~A TERMLIST=~A ORDER=~A"
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| 59 | dimension termlist order))))
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[2469] | 60 |
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[3015] | 61 | (defgeneric change-term-order (self other)
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[3012] | 62 | (:documentation "Change term order of SELF to the term order of OTHER.")
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[3010] | 63 | (:method ((self poly) (other poly))
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| 64 | (unless (eq (poly-term-order self) (poly-term-order other))
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| 65 | (setf (poly-termlist self) (sort (poly-termlist self) (poly-term-order other))
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| 66 | (poly-term-order self) (poly-term-order other)))
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[3012] | 67 | self))
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[3010] | 68 |
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[3095] | 69 | (defun alist->poly (alist &aux (poly (make-instance 'poly)))
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[3126] | 70 | "It reads polynomial from an alist formatted as ( ... (exponents . coeff) ...).
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| 71 | It can be used to enter simple polynomials by hand, e.g the polynomial
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| 72 | in two variables, X and Y, given in standard notation as:
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| 73 |
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| 74 | 3*X^2*Y^3+2*Y+7
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| 75 |
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| 76 | can be entered as
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| 77 | (ALIST->POLY '(((2 3) . 3) ((0 1) . 2) ((0 0) . 7))).
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| 78 |
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| 79 | NOTE: The primary use is for low-level debugging of the package."
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[3099] | 80 | (dolist (x alist poly)
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[3095] | 81 | (insert-item poly (make-instance 'term :exponents (car x) :coeff (cdr x)))))
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[3092] | 82 |
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| 83 |
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[2650] | 84 | (defmethod r-equalp ((self poly) (other poly))
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[2680] | 85 | "POLY instances are R-EQUALP if they have the same
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| 86 | order and if all terms are R-EQUALP."
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[2651] | 87 | (and (every #'r-equalp (poly-termlist self) (poly-termlist other))
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| 88 | (eq (poly-term-order self) (poly-term-order other))))
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[2650] | 89 |
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[2513] | 90 | (defmethod insert-item ((self poly) (item term))
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[3254] | 91 | (cond ((null (poly-dimension self))
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[3261] | 92 | (setf (poly-dimension self) (monom-dimension item)))
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[3258] | 93 | (t (assert (= (poly-dimension self) (monom-dimension item)))))
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[2513] | 94 | (push item (poly-termlist self))
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[2514] | 95 | self)
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[2464] | 96 |
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[2513] | 97 | (defmethod append-item ((self poly) (item term))
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[3254] | 98 | (cond ((null (poly-dimension self))
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[3261] | 99 | (setf (poly-dimension self) (monom-dimension item)))
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[3258] | 100 | (t (assert (= (poly-dimension self) (monom-dimension item)))))
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[2513] | 101 | (setf (cdr (last (poly-termlist self))) (list item))
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| 102 | self)
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[2466] | 103 |
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[52] | 104 | ;; Leading term
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[2442] | 105 | (defgeneric leading-term (object)
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| 106 | (:method ((self poly))
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[2525] | 107 | (car (poly-termlist self)))
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| 108 | (:documentation "The leading term of a polynomial, or NIL for zero polynomial."))
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[52] | 109 |
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| 110 | ;; Second term
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[2442] | 111 | (defgeneric second-leading-term (object)
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| 112 | (:method ((self poly))
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[2525] | 113 | (cadar (poly-termlist self)))
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| 114 | (:documentation "The second leading term of a polynomial, or NIL for a polynomial with at most one term."))
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[52] | 115 |
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| 116 | ;; Leading coefficient
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[2442] | 117 | (defgeneric leading-coefficient (object)
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| 118 | (:method ((self poly))
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[3221] | 119 | (scalar-coeff (leading-term self)))
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[2545] | 120 | (:documentation "The leading coefficient of a polynomial. It signals error for a zero polynomial."))
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[52] | 121 |
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| 122 | ;; Second coefficient
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[2442] | 123 | (defgeneric second-leading-coefficient (object)
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| 124 | (:method ((self poly))
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[3221] | 125 | (scalar-coeff (second-leading-term self)))
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[2906] | 126 | (:documentation "The second leading coefficient of a polynomial. It
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| 127 | signals error for a polynomial with at most one term."))
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[52] | 128 |
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| 129 | ;; Testing for a zero polynomial
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[2445] | 130 | (defmethod r-zerop ((self poly))
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| 131 | (null (poly-termlist self)))
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[52] | 132 |
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| 133 | ;; The number of terms
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[2445] | 134 | (defmethod r-length ((self poly))
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| 135 | (length (poly-termlist self)))
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[52] | 136 |
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[2483] | 137 | (defmethod multiply-by ((self poly) (other monom))
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[2501] | 138 | (mapc #'(lambda (term) (multiply-by term other))
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| 139 | (poly-termlist self))
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[2483] | 140 | self)
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[2469] | 141 |
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[3120] | 142 | (defmethod multiply-by ((self poly) (other term))
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| 143 | (mapc #'(lambda (term) (multiply-by term other))
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| 144 | (poly-termlist self))
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| 145 | self)
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| 146 |
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[2501] | 147 | (defmethod multiply-by ((self poly) (other scalar))
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[2502] | 148 | (mapc #'(lambda (term) (multiply-by term other))
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[2501] | 149 | (poly-termlist self))
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[2487] | 150 | self)
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| 151 |
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[2607] | 152 |
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[2761] | 153 | (defmacro fast-add/subtract (p q order-fn add/subtract-fn uminus-fn)
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[2755] | 154 | "Return an expression which will efficiently adds/subtracts two
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| 155 | polynomials, P and Q. The addition/subtraction of coefficients is
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| 156 | performed by calling ADD/SUBTRACT-METHOD-NAME. If UMINUS-METHOD-NAME
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| 157 | is supplied, it is used to negate the coefficients of Q which do not
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[2756] | 158 | have a corresponding coefficient in P. The code implements an
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| 159 | efficient algorithm to add two polynomials represented as sorted lists
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| 160 | of terms. The code destroys both arguments, reusing the terms to build
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| 161 | the result."
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[3221] | 162 | `(macrolet ((lc (x) `(scalar-coeff (car ,x))))
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[2742] | 163 | (do ((p ,p)
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| 164 | (q ,q)
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| 165 | r)
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| 166 | ((or (endp p) (endp q))
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| 167 | ;; NOTE: R contains the result in reverse order. Can it
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| 168 | ;; be more efficient to produce the terms in correct order?
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[2774] | 169 | (unless (endp q)
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[2776] | 170 | ;; Upon subtraction, we must change the sign of
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| 171 | ;; all coefficients in q
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[2774] | 172 | ,@(when uminus-fn
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[2775] | 173 | `((mapc #'(lambda (x) (setf x (funcall ,uminus-fn x))) q)))
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[2774] | 174 | (setf r (nreconc r q)))
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[2742] | 175 | r)
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| 176 | (multiple-value-bind
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| 177 | (greater-p equal-p)
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[2766] | 178 | (funcall ,order-fn (car p) (car q))
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[2742] | 179 | (cond
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| 180 | (greater-p
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| 181 | (rotatef (cdr p) r p)
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| 182 | )
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| 183 | (equal-p
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[2766] | 184 | (let ((s (funcall ,add/subtract-fn (lc p) (lc q))))
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[2742] | 185 | (cond
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| 186 | ((r-zerop s)
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| 187 | (setf p (cdr p))
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| 188 | )
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| 189 | (t
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| 190 | (setf (lc p) s)
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| 191 | (rotatef (cdr p) r p))))
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| 192 | (setf q (cdr q))
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| 193 | )
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| 194 | (t
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[2743] | 195 | ;;Negate the term of Q if UMINUS provided, signallig
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| 196 | ;;that we are doing subtraction
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[2908] | 197 | ,(when uminus-fn
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| 198 | `(setf (lc q) (funcall ,uminus-fn (lc q))))
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[2743] | 199 | (rotatef (cdr q) r q)))))))
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[2585] | 200 |
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[2655] | 201 |
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[2763] | 202 | (defmacro def-add/subtract-method (add/subtract-method-name
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[2752] | 203 | uminus-method-name
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| 204 | &optional
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[2913] | 205 | (doc-string nil doc-string-supplied-p))
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[2615] | 206 | "This macro avoids code duplication for two similar operations: ADD-TO and SUBTRACT-FROM."
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[2749] | 207 | `(defmethod ,add/subtract-method-name ((self poly) (other poly))
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[2615] | 208 | ,@(when doc-string-supplied-p `(,doc-string))
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[2769] | 209 | ;; Ensure orders are compatible
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[3015] | 210 | (change-term-order other self)
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[2772] | 211 | (setf (poly-termlist self) (fast-add/subtract
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| 212 | (poly-termlist self) (poly-termlist other)
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| 213 | (poly-term-order self)
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| 214 | #',add/subtract-method-name
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| 215 | ,(when uminus-method-name `(function ,uminus-method-name))))
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[2609] | 216 | self))
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[2487] | 217 |
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[2916] | 218 | (eval-when (:compile-toplevel :load-toplevel :execute)
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[2777] | 219 |
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| 220 | (def-add/subtract-method add-to nil
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| 221 | "Adds to polynomial SELF another polynomial OTHER.
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[2610] | 222 | This operation destructively modifies both polynomials.
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| 223 | The result is stored in SELF. This implementation does
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[2752] | 224 | no consing, entirely reusing the sells of SELF and OTHER.")
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[2609] | 225 |
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[2777] | 226 | (def-add/subtract-method subtract-from unary-minus
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[2753] | 227 | "Subtracts from polynomial SELF another polynomial OTHER.
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[2610] | 228 | This operation destructively modifies both polynomials.
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| 229 | The result is stored in SELF. This implementation does
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[2752] | 230 | no consing, entirely reusing the sells of SELF and OTHER.")
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[2916] | 231 | )
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[2777] | 232 |
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[2691] | 233 | (defmethod unary-minus ((self poly))
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[2694] | 234 | "Destructively modifies the coefficients of the polynomial SELF,
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| 235 | by changing their sign."
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[2692] | 236 | (mapc #'unary-minus (poly-termlist self))
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[2683] | 237 | self)
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[52] | 238 |
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[2795] | 239 | (defun add-termlists (p q order-fn)
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[2794] | 240 | "Destructively adds two termlists P and Q ordered according to ORDER-FN."
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[2917] | 241 | (fast-add/subtract p q order-fn #'add-to nil))
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[2794] | 242 |
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[2800] | 243 | (defmacro multiply-term-by-termlist-dropping-zeros (term termlist
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[2927] | 244 | &optional (reverse-arg-order-P nil))
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[2799] | 245 | "Multiplies term TERM by a list of term, TERMLIST.
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[2792] | 246 | Takes into accound divisors of zero in the ring, by
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[2927] | 247 | deleting zero terms. Optionally, if REVERSE-ARG-ORDER-P
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[2928] | 248 | is T, change the order of arguments; this may be important
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[2927] | 249 | if we extend the package to non-commutative rings."
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[2800] | 250 | `(mapcan #'(lambda (other-term)
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[2907] | 251 | (let ((prod (r*
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[2923] | 252 | ,@(cond
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[2930] | 253 | (reverse-arg-order-p
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[2925] | 254 | `(other-term ,term))
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| 255 | (t
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| 256 | `(,term other-term))))))
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[2800] | 257 | (cond
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| 258 | ((r-zerop prod) nil)
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| 259 | (t (list prod)))))
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| 260 | ,termlist))
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[2790] | 261 |
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[2796] | 262 | (defun multiply-termlists (p q order-fn)
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[3127] | 263 | "A version of polynomial multiplication, operating
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| 264 | directly on termlists."
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[2787] | 265 | (cond
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[2917] | 266 | ((or (endp p) (endp q))
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| 267 | ;;p or q is 0 (represented by NIL)
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| 268 | nil)
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[2789] | 269 | ;; If p= p0+p1 and q=q0+q1 then p*q=p0*q0+p0*q1+p1*q
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[2787] | 270 | ((endp (cdr p))
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[2918] | 271 | (multiply-term-by-termlist-dropping-zeros (car p) q))
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| 272 | ((endp (cdr q))
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[2919] | 273 | (multiply-term-by-termlist-dropping-zeros (car q) p t))
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| 274 | (t
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[2948] | 275 | (cons (r* (car p) (car q))
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[2949] | 276 | (add-termlists
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| 277 | (multiply-term-by-termlist-dropping-zeros (car p) (cdr q))
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| 278 | (multiply-termlists (cdr p) q order-fn)
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| 279 | order-fn)))))
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[2793] | 280 |
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[2803] | 281 | (defmethod multiply-by ((self poly) (other poly))
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[3014] | 282 | (change-term-order other self)
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[2803] | 283 | (setf (poly-termlist self) (multiply-termlists (poly-termlist self)
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| 284 | (poly-termlist other)
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| 285 | (poly-term-order self)))
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| 286 | self)
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| 287 |
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[2939] | 288 | (defmethod r* ((poly1 poly) (poly2 poly))
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| 289 | "Non-destructively multiply POLY1 by POLY2."
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| 290 | (multiply-by (copy-instance POLY1) (copy-instance POLY2)))
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[2916] | 291 |
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[3044] | 292 | (defmethod left-tensor-product-by ((self poly) (other term))
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| 293 | (setf (poly-termlist self)
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| 294 | (mapcan #'(lambda (term)
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[3047] | 295 | (let ((prod (left-tensor-product-by term other)))
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[3044] | 296 | (cond
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| 297 | ((r-zerop prod) nil)
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| 298 | (t (list prod)))))
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[3048] | 299 | (poly-termlist self)))
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[3044] | 300 | self)
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| 301 |
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| 302 | (defmethod right-tensor-product-by ((self poly) (other term))
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[3045] | 303 | (setf (poly-termlist self)
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| 304 | (mapcan #'(lambda (term)
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[3046] | 305 | (let ((prod (right-tensor-product-by term other)))
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[3045] | 306 | (cond
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| 307 | ((r-zerop prod) nil)
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| 308 | (t (list prod)))))
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[3048] | 309 | (poly-termlist self)))
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[3045] | 310 | self)
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[3044] | 311 |
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[3062] | 312 | (defmethod left-tensor-product-by ((self poly) (other monom))
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| 313 | (setf (poly-termlist self)
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| 314 | (mapcan #'(lambda (term)
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| 315 | (let ((prod (left-tensor-product-by term other)))
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| 316 | (cond
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| 317 | ((r-zerop prod) nil)
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| 318 | (t (list prod)))))
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| 319 | (poly-termlist self)))
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[3249] | 320 | (incf (poly-dimension self) (monom-dimension other))
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[3062] | 321 | self)
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[3044] | 322 |
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[3062] | 323 | (defmethod right-tensor-product-by ((self poly) (other monom))
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| 324 | (setf (poly-termlist self)
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| 325 | (mapcan #'(lambda (term)
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| 326 | (let ((prod (right-tensor-product-by term other)))
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| 327 | (cond
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| 328 | ((r-zerop prod) nil)
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| 329 | (t (list prod)))))
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| 330 | (poly-termlist self)))
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[3249] | 331 | (incf (poly-dimension self) (monom-dimension other))
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[3062] | 332 | self)
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| 333 |
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| 334 |
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[3084] | 335 | (defun standard-extension (plist &aux (k (length plist)) (i 0))
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[2716] | 336 | "Calculate [U1*P1,U2*P2,...,UK*PK], where PLIST=[P1,P2,...,PK]
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[3060] | 337 | is a list of polynomials. Destructively modifies PLIST elements."
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[3061] | 338 | (mapc #'(lambda (poly)
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[3085] | 339 | (left-tensor-product-by
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| 340 | poly
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| 341 | (prog1
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| 342 | (make-monom-variable k i)
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| 343 | (incf i))))
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[3061] | 344 | plist))
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[52] | 345 |
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[3087] | 346 | (defun standard-extension-1 (plist
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| 347 | &aux
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[3096] | 348 | (plist (standard-extension plist))
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[3087] | 349 | (nvars (poly-dimension (car plist))))
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[3081] | 350 | "Calculate [U1*P1-1,U2*P2-1,...,UK*PK-1], where PLIST=[P1,P2,...,PK].
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[3087] | 351 | Firstly, new K variables U1, U2, ..., UK, are inserted into each
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| 352 | polynomial. Subsequently, P1, P2, ..., PK are destructively modified
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[3105] | 353 | tantamount to replacing PI with UI*PI-1. It assumes that all
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[3106] | 354 | polynomials have the same dimension, and only the first polynomial
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| 355 | is examined to determine this dimension."
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[3089] | 356 | ;; Implementation note: we use STANDARD-EXTENSION and then subtract
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| 357 | ;; 1 from each polynomial; since UI*PI has no constant term,
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| 358 | ;; we just need to append the constant term at the end
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| 359 | ;; of each termlist.
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[3064] | 360 | (flet ((subtract-1 (p)
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[3104] | 361 | (append-item p (make-instance 'term :coeff -1 :dimension nvars))))
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[3083] | 362 | (setf plist (mapc #'subtract-1 plist)))
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[3077] | 363 | plist)
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[52] | 364 |
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| 365 |
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[3107] | 366 | (defun standard-sum (plist
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| 367 | &aux
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| 368 | (plist (standard-extension plist))
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| 369 | (nvars (poly-dimension (car plist))))
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[3087] | 370 | "Calculate the polynomial U1*P1+U2*P2+...+UK*PK-1, where PLIST=[P1,P2,...,PK].
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| 371 | Firstly, new K variables, U1, U2, ..., UK, are inserted into each
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| 372 | polynomial. Subsequently, P1, P2, ..., PK are destructively modified
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| 373 | tantamount to replacing PI with UI*PI, and the resulting polynomials
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[3117] | 374 | are added. Finally, 1 is subtracted. It should be noted that the term
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| 375 | order is not modified, which is equivalent to using a lexicographic
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| 376 | order on the first K variables."
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[3107] | 377 | (flet ((subtract-1 (p)
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| 378 | (append-item p (make-instance 'term :coeff -1 :dimension nvars))))
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[3108] | 379 | (subtract-1
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| 380 | (make-instance
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| 381 | 'poly
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[3115] | 382 | :termlist (apply #'nconc (mapcar #'poly-termlist plist))))))
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[52] | 383 |
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[3122] | 384 | #|
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| 385 |
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[1477] | 386 | (defun saturation-extension-1 (ring f p)
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[1497] | 387 | "Calculate [F, U*P-1]. It destructively modifies F."
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[1908] | 388 | (declare (type ring ring))
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[1477] | 389 | (polysaturation-extension ring f (list p)))
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[53] | 390 |
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[3122] | 391 |
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[53] | 392 |
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| 393 |
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[1189] | 394 | (defun spoly (ring-and-order f g
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| 395 | &aux
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| 396 | (ring (ro-ring ring-and-order)))
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[55] | 397 | "It yields the S-polynomial of polynomials F and G."
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[1911] | 398 | (declare (type ring-and-order ring-and-order) (type poly f g))
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[55] | 399 | (let* ((lcm (monom-lcm (poly-lm f) (poly-lm g)))
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[2913] | 400 | (mf (monom-div lcm (poly-lm f)))
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| 401 | (mg (monom-div lcm (poly-lm g))))
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[55] | 402 | (declare (type monom mf mg))
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| 403 | (multiple-value-bind (c cf cg)
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| 404 | (funcall (ring-ezgcd ring) (poly-lc f) (poly-lc g))
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| 405 | (declare (ignore c))
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| 406 | (poly-sub
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[1189] | 407 | ring-and-order
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[55] | 408 | (scalar-times-poly ring cg (monom-times-poly mf f))
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| 409 | (scalar-times-poly ring cf (monom-times-poly mg g))))))
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[53] | 410 |
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| 411 |
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[55] | 412 | (defun poly-primitive-part (ring p)
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| 413 | "Divide polynomial P with integer coefficients by gcd of its
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| 414 | coefficients and return the result."
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[1912] | 415 | (declare (type ring ring) (type poly p))
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[55] | 416 | (if (poly-zerop p)
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| 417 | (values p 1)
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[2913] | 418 | (let ((c (poly-content ring p)))
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| 419 | (values (make-poly-from-termlist
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| 420 | (mapcar
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| 421 | #'(lambda (x)
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| 422 | (make-term :monom (term-monom x)
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| 423 | :coeff (funcall (ring-div ring) (term-coeff x) c)))
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| 424 | (poly-termlist p))
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| 425 | (poly-sugar p))
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| 426 | c))))
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[55] | 427 |
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| 428 | (defun poly-content (ring p)
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| 429 | "Greatest common divisor of the coefficients of the polynomial P. Use the RING structure
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| 430 | to compute the greatest common divisor."
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[1913] | 431 | (declare (type ring ring) (type poly p))
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[55] | 432 | (reduce (ring-gcd ring) (mapcar #'term-coeff (rest (poly-termlist p))) :initial-value (poly-lc p)))
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[1066] | 433 |
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[2456] | 434 | |#
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