cpython/Modules/_decimal/libmpdec/literature/umodarith.lisp

693 lines
24 KiB
Common Lisp

;
; Copyright (c) 2008-2012 Stefan Krah. All rights reserved.
;
; Redistribution and use in source and binary forms, with or without
; modification, are permitted provided that the following conditions
; are met:
;
; 1. Redistributions of source code must retain the above copyright
; notice, this list of conditions and the following disclaimer.
;
; 2. Redistributions in binary form must reproduce the above copyright
; notice, this list of conditions and the following disclaimer in the
; documentation and/or other materials provided with the distribution.
;
; THIS SOFTWARE IS PROVIDED BY THE AUTHOR AND CONTRIBUTORS "AS IS" AND
; ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE
; IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE
; ARE DISCLAIMED. IN NO EVENT SHALL THE AUTHOR OR CONTRIBUTORS BE LIABLE
; FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL
; DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS
; OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION)
; HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT
; LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY
; OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF
; SUCH DAMAGE.
;
(in-package "ACL2")
(include-book "arithmetic/top-with-meta" :dir :system)
(include-book "arithmetic-2/floor-mod/floor-mod" :dir :system)
;; =====================================================================
;; Proofs for several functions in umodarith.h
;; =====================================================================
;; =====================================================================
;; Helper theorems
;; =====================================================================
(defthm elim-mod-m<x<2*m
(implies (and (<= m x)
(< x (* 2 m))
(rationalp x) (rationalp m))
(equal (mod x m)
(+ x (- m)))))
(defthm modaux-1a
(implies (and (< x m) (< 0 x) (< 0 m)
(rationalp x) (rationalp m))
(equal (mod (- x) m)
(+ (- x) m))))
(defthm modaux-1b
(implies (and (< (- x) m) (< x 0) (< 0 m)
(rationalp x) (rationalp m))
(equal (mod x m)
(+ x m)))
:hints (("Goal" :use ((:instance modaux-1a
(x (- x)))))))
(defthm modaux-1c
(implies (and (< x m) (< 0 x) (< 0 m)
(rationalp x) (rationalp m))
(equal (mod x m)
x)))
(defthm modaux-2a
(implies (and (< 0 b) (< b m)
(natp x) (natp b) (natp m)
(< (mod (+ b x) m) b))
(equal (mod (+ (- m) b x) m)
(+ (- m) b (mod x m)))))
(defthm modaux-2b
(implies (and (< 0 b) (< b m)
(natp x) (natp b) (natp m)
(< (mod (+ b x) m) b))
(equal (mod (+ b x) m)
(+ (- m) b (mod x m))))
:hints (("Goal" :use (modaux-2a))))
(defthm linear-mod-1
(implies (and (< x m) (< b m)
(natp x) (natp b)
(rationalp m))
(equal (< x (mod (+ (- b) x) m))
(< x b)))
:hints (("Goal" :use ((:instance modaux-1a
(x (+ b (- x))))))))
(defthm linear-mod-2
(implies (and (< 0 b) (< b m)
(natp x) (natp b)
(natp m))
(equal (< (mod x m)
(mod (+ (- b) x) m))
(< (mod x m) b))))
(defthm linear-mod-3
(implies (and (< x m) (< b m)
(natp x) (natp b)
(rationalp m))
(equal (<= b (mod (+ b x) m))
(< (+ b x) m)))
:hints (("Goal" :use ((:instance elim-mod-m<x<2*m
(x (+ b x)))))))
(defthm modaux-2c
(implies (and (< 0 b) (< b m)
(natp x) (natp b) (natp m)
(<= b (mod (+ b x) m)))
(equal (mod (+ b x) m)
(+ b (mod x m))))
:hints (("Subgoal *1/8''" :use (linear-mod-3))))
(defthmd modaux-2d
(implies (and (< x m) (< 0 x) (< 0 m)
(< (- m) b) (< b 0) (rationalp m)
(<= x (mod (+ b x) m))
(rationalp x) (rationalp b))
(equal (+ (- m) (mod (+ b x) m))
(+ b x)))
:hints (("Goal" :cases ((<= 0 (+ b x))))
("Subgoal 2'" :use ((:instance modaux-1b
(x (+ b x)))))))
(defthm mod-m-b
(implies (and (< 0 x) (< 0 b) (< 0 m)
(< x b) (< b m)
(natp x) (natp b) (natp m))
(equal (mod (+ (mod (- x) m) b) m)
(mod (- x) b))))
;; =====================================================================
;; addmod, submod
;; =====================================================================
(defun addmod (a b m base)
(let* ((s (mod (+ a b) base))
(s (if (< s a) (mod (- s m) base) s))
(s (if (>= s m) (mod (- s m) base) s)))
s))
(defthmd addmod-correct
(implies (and (< 0 m) (< m base)
(< a m) (<= b m)
(natp m) (natp base)
(natp a) (natp b))
(equal (addmod a b m base)
(mod (+ a b) m)))
:hints (("Goal" :cases ((<= base (+ a b))))
("Subgoal 2.1'" :use ((:instance elim-mod-m<x<2*m
(x (+ a b)))))))
(defun submod (a b m base)
(let* ((d (mod (- a b) base))
(d (if (< a d) (mod (+ d m) base) d)))
d))
(defthmd submod-aux1
(implies (and (< a (mod (+ a (- b)) base))
(< 0 base) (< a base) (<= b base)
(natp base) (natp a) (natp b))
(< a b))
:rule-classes :forward-chaining)
(defthmd submod-aux2
(implies (and (<= (mod (+ a (- b)) base) a)
(< 0 base) (< a base) (< b base)
(natp base) (natp a) (natp b))
(<= b a))
:rule-classes :forward-chaining)
(defthmd submod-correct
(implies (and (< 0 m) (< m base)
(< a m) (<= b m)
(natp m) (natp base)
(natp a) (natp b))
(equal (submod a b m base)
(mod (- a b) m)))
:hints (("Goal" :cases ((<= base (+ a b))))
("Subgoal 2.2" :use ((:instance submod-aux1)))
("Subgoal 2.2'''" :cases ((and (< 0 (+ a (- b) m))
(< (+ a (- b) m) m))))
("Subgoal 2.1" :use ((:instance submod-aux2)))
("Subgoal 1.2" :use ((:instance submod-aux1)))
("Subgoal 1.1" :use ((:instance submod-aux2)))))
(defun submod-2 (a b m base)
(let* ((d (mod (- a b) base))
(d (if (< a b) (mod (+ d m) base) d)))
d))
(defthm submod-2-correct
(implies (and (< 0 m) (< m base)
(< a m) (<= b m)
(natp m) (natp base)
(natp a) (natp b))
(equal (submod-2 a b m base)
(mod (- a b) m)))
:hints (("Subgoal 2'" :cases ((and (< 0 (+ a (- b) m))
(< (+ a (- b) m) m))))))
;; =========================================================================
;; ext-submod is correct
;; =========================================================================
; a < 2*m, b < 2*m
(defun ext-submod (a b m base)
(let* ((a (if (>= a m) (- a m) a))
(b (if (>= b m) (- b m) b))
(d (mod (- a b) base))
(d (if (< a b) (mod (+ d m) base) d)))
d))
; a < 2*m, b < 2*m
(defun ext-submod-2 (a b m base)
(let* ((a (mod a m))
(b (mod b m))
(d (mod (- a b) base))
(d (if (< a b) (mod (+ d m) base) d)))
d))
(defthmd ext-submod-ext-submod-2-equal
(implies (and (< 0 m) (< m base)
(< a (* 2 m)) (< b (* 2 m))
(natp m) (natp base)
(natp a) (natp b))
(equal (ext-submod a b m base)
(ext-submod-2 a b m base))))
(defthmd ext-submod-2-correct
(implies (and (< 0 m) (< m base)
(< a (* 2 m)) (< b (* 2 m))
(natp m) (natp base)
(natp a) (natp b))
(equal (ext-submod-2 a b m base)
(mod (- a b) m))))
;; =========================================================================
;; dw-reduce is correct
;; =========================================================================
(defun dw-reduce (hi lo m base)
(let* ((r1 (mod hi m))
(r2 (mod (+ (* r1 base) lo) m)))
r2))
(defthmd dw-reduce-correct
(implies (and (< 0 m) (< m base)
(< hi base) (< lo base)
(natp m) (natp base)
(natp hi) (natp lo))
(equal (dw-reduce hi lo m base)
(mod (+ (* hi base) lo) m))))
(defthmd <=-multiply-both-sides-by-z
(implies (and (rationalp x) (rationalp y)
(< 0 z) (rationalp z))
(equal (<= x y)
(<= (* z x) (* z y)))))
(defthmd dw-reduce-aux1
(implies (and (< 0 m) (< m base)
(natp m) (natp base)
(< lo base) (natp lo)
(< x m) (natp x))
(< (+ lo (* base x)) (* base m)))
:hints (("Goal" :cases ((<= (+ x 1) m)))
("Subgoal 1''" :cases ((<= (* base (+ x 1)) (* base m))))
("subgoal 1.2" :use ((:instance <=-multiply-both-sides-by-z
(x (+ 1 x))
(y m)
(z base))))))
(defthm dw-reduce-aux2
(implies (and (< x (* base m))
(< 0 m) (< m base)
(natp m) (natp base) (natp x))
(< (floor x m) base)))
;; This is the necessary condition for using _mpd_div_words().
(defthmd dw-reduce-second-quotient-fits-in-single-word
(implies (and (< 0 m) (< m base)
(< hi base) (< lo base)
(natp m) (natp base)
(natp hi) (natp lo)
(equal r1 (mod hi m)))
(< (floor (+ (* r1 base) lo) m)
base))
:hints (("Goal" :cases ((< r1 m)))
("Subgoal 1''" :cases ((< (+ lo (* base (mod hi m))) (* base m))))
("Subgoal 1.2" :use ((:instance dw-reduce-aux1
(x (mod hi m)))))))
;; =========================================================================
;; dw-submod is correct
;; =========================================================================
(defun dw-submod (a hi lo m base)
(let* ((r (dw-reduce hi lo m base))
(d (mod (- a r) base))
(d (if (< a r) (mod (+ d m) base) d)))
d))
(defthmd dw-submod-aux1
(implies (and (natp a) (< 0 m) (natp m)
(natp x) (equal r (mod x m)))
(equal (mod (- a x) m)
(mod (- a r) m))))
(defthmd dw-submod-correct
(implies (and (< 0 m) (< m base)
(natp a) (< a m)
(< hi base) (< lo base)
(natp m) (natp base)
(natp hi) (natp lo))
(equal (dw-submod a hi lo m base)
(mod (- a (+ (* base hi) lo)) m)))
:hints (("Goal" :in-theory (disable dw-reduce)
:use ((:instance dw-submod-aux1
(x (+ lo (* base hi)))
(r (dw-reduce hi lo m base)))
(:instance dw-reduce-correct)))))
;; =========================================================================
;; ANSI C arithmetic for uint64_t
;; =========================================================================
(defun add (a b)
(mod (+ a b)
(expt 2 64)))
(defun sub (a b)
(mod (- a b)
(expt 2 64)))
(defun << (w n)
(mod (* w (expt 2 n))
(expt 2 64)))
(defun >> (w n)
(floor w (expt 2 n)))
;; join upper and lower half of a double word, yielding a 128 bit number
(defun join (hi lo)
(+ (* (expt 2 64) hi) lo))
;; =============================================================================
;; Fast modular reduction
;; =============================================================================
;; These are the three primes used in the Number Theoretic Transform.
;; A fast modular reduction scheme exists for all of them.
(defmacro p1 ()
(+ (expt 2 64) (- (expt 2 32)) 1))
(defmacro p2 ()
(+ (expt 2 64) (- (expt 2 34)) 1))
(defmacro p3 ()
(+ (expt 2 64) (- (expt 2 40)) 1))
;; reduce the double word number hi*2**64 + lo (mod p1)
(defun simple-mod-reduce-p1 (hi lo)
(+ (* (expt 2 32) hi) (- hi) lo))
;; reduce the double word number hi*2**64 + lo (mod p2)
(defun simple-mod-reduce-p2 (hi lo)
(+ (* (expt 2 34) hi) (- hi) lo))
;; reduce the double word number hi*2**64 + lo (mod p3)
(defun simple-mod-reduce-p3 (hi lo)
(+ (* (expt 2 40) hi) (- hi) lo))
; ----------------------------------------------------------
; The modular reductions given above are correct
; ----------------------------------------------------------
(defthmd congruence-p1-aux
(equal (* (expt 2 64) hi)
(+ (* (p1) hi)
(* (expt 2 32) hi)
(- hi))))
(defthmd congruence-p2-aux
(equal (* (expt 2 64) hi)
(+ (* (p2) hi)
(* (expt 2 34) hi)
(- hi))))
(defthmd congruence-p3-aux
(equal (* (expt 2 64) hi)
(+ (* (p3) hi)
(* (expt 2 40) hi)
(- hi))))
(defthmd mod-augment
(implies (and (rationalp x)
(rationalp y)
(rationalp m))
(equal (mod (+ x y) m)
(mod (+ x (mod y m)) m))))
(defthmd simple-mod-reduce-p1-congruent
(implies (and (integerp hi)
(integerp lo))
(equal (mod (simple-mod-reduce-p1 hi lo) (p1))
(mod (join hi lo) (p1))))
:hints (("Goal''" :use ((:instance congruence-p1-aux)
(:instance mod-augment
(m (p1))
(x (+ (- hi) lo (* (expt 2 32) hi)))
(y (* (p1) hi)))))))
(defthmd simple-mod-reduce-p2-congruent
(implies (and (integerp hi)
(integerp lo))
(equal (mod (simple-mod-reduce-p2 hi lo) (p2))
(mod (join hi lo) (p2))))
:hints (("Goal''" :use ((:instance congruence-p2-aux)
(:instance mod-augment
(m (p2))
(x (+ (- hi) lo (* (expt 2 34) hi)))
(y (* (p2) hi)))))))
(defthmd simple-mod-reduce-p3-congruent
(implies (and (integerp hi)
(integerp lo))
(equal (mod (simple-mod-reduce-p3 hi lo) (p3))
(mod (join hi lo) (p3))))
:hints (("Goal''" :use ((:instance congruence-p3-aux)
(:instance mod-augment
(m (p3))
(x (+ (- hi) lo (* (expt 2 40) hi)))
(y (* (p3) hi)))))))
; ---------------------------------------------------------------------
; We need a number less than 2*p, so that we can use the trick from
; elim-mod-m<x<2*m for the final reduction.
; For p1, two modular reductions are sufficient, for p2 and p3 three.
; ---------------------------------------------------------------------
;; p1: the first reduction is less than 2**96
(defthmd simple-mod-reduce-p1-<-2**96
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(natp hi) (natp lo))
(< (simple-mod-reduce-p1 hi lo)
(expt 2 96))))
;; p1: the second reduction is less than 2*p1
(defthmd simple-mod-reduce-p1-<-2*p1
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(< (join hi lo) (expt 2 96))
(natp hi) (natp lo))
(< (simple-mod-reduce-p1 hi lo)
(* 2 (p1)))))
;; p2: the first reduction is less than 2**98
(defthmd simple-mod-reduce-p2-<-2**98
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(natp hi) (natp lo))
(< (simple-mod-reduce-p2 hi lo)
(expt 2 98))))
;; p2: the second reduction is less than 2**69
(defthmd simple-mod-reduce-p2-<-2*69
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(< (join hi lo) (expt 2 98))
(natp hi) (natp lo))
(< (simple-mod-reduce-p2 hi lo)
(expt 2 69))))
;; p3: the third reduction is less than 2*p2
(defthmd simple-mod-reduce-p2-<-2*p2
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(< (join hi lo) (expt 2 69))
(natp hi) (natp lo))
(< (simple-mod-reduce-p2 hi lo)
(* 2 (p2)))))
;; p3: the first reduction is less than 2**104
(defthmd simple-mod-reduce-p3-<-2**104
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(natp hi) (natp lo))
(< (simple-mod-reduce-p3 hi lo)
(expt 2 104))))
;; p3: the second reduction is less than 2**81
(defthmd simple-mod-reduce-p3-<-2**81
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(< (join hi lo) (expt 2 104))
(natp hi) (natp lo))
(< (simple-mod-reduce-p3 hi lo)
(expt 2 81))))
;; p3: the third reduction is less than 2*p3
(defthmd simple-mod-reduce-p3-<-2*p3
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(< (join hi lo) (expt 2 81))
(natp hi) (natp lo))
(< (simple-mod-reduce-p3 hi lo)
(* 2 (p3)))))
; -------------------------------------------------------------------------
; The simple modular reductions, adapted for compiler friendly C
; -------------------------------------------------------------------------
(defun mod-reduce-p1 (hi lo)
(let* ((y hi)
(x y)
(hi (>> hi 32))
(x (sub lo x))
(hi (if (> x lo) (+ hi -1) hi))
(y (<< y 32))
(lo (add y x))
(hi (if (< lo y) (+ hi 1) hi)))
(+ (* hi (expt 2 64)) lo)))
(defun mod-reduce-p2 (hi lo)
(let* ((y hi)
(x y)
(hi (>> hi 30))
(x (sub lo x))
(hi (if (> x lo) (+ hi -1) hi))
(y (<< y 34))
(lo (add y x))
(hi (if (< lo y) (+ hi 1) hi)))
(+ (* hi (expt 2 64)) lo)))
(defun mod-reduce-p3 (hi lo)
(let* ((y hi)
(x y)
(hi (>> hi 24))
(x (sub lo x))
(hi (if (> x lo) (+ hi -1) hi))
(y (<< y 40))
(lo (add y x))
(hi (if (< lo y) (+ hi 1) hi)))
(+ (* hi (expt 2 64)) lo)))
; -------------------------------------------------------------------------
; The compiler friendly versions are equal to the simple versions
; -------------------------------------------------------------------------
(defthm mod-reduce-aux1
(implies (and (<= 0 a) (natp a) (natp m)
(< (- m) b) (<= b 0)
(integerp b)
(< (mod (+ b a) m)
(mod a m)))
(equal (mod (+ b a) m)
(+ b (mod a m))))
:hints (("Subgoal 2" :use ((:instance modaux-1b
(x (+ a b)))))))
(defthm mod-reduce-aux2
(implies (and (<= 0 a) (natp a) (natp m)
(< b m) (natp b)
(< (mod (+ b a) m)
(mod a m)))
(equal (+ m (mod (+ b a) m))
(+ b (mod a m)))))
(defthm mod-reduce-aux3
(implies (and (< 0 a) (natp a) (natp m)
(< (- m) b) (< b 0)
(integerp b)
(<= (mod a m)
(mod (+ b a) m)))
(equal (+ (- m) (mod (+ b a) m))
(+ b (mod a m))))
:hints (("Subgoal 1.2'" :use ((:instance modaux-1b
(x b))))
("Subgoal 1''" :use ((:instance modaux-2d
(x I))))))
(defthm mod-reduce-aux4
(implies (and (< 0 a) (natp a) (natp m)
(< b m) (natp b)
(<= (mod a m)
(mod (+ b a) m)))
(equal (mod (+ b a) m)
(+ b (mod a m)))))
(defthm mod-reduce-p1==simple-mod-reduce-p1
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(natp hi) (natp lo))
(equal (mod-reduce-p1 hi lo)
(simple-mod-reduce-p1 hi lo)))
:hints (("Goal" :in-theory (disable expt)
:cases ((< 0 hi)))
("Subgoal 1.2.2'" :use ((:instance mod-reduce-aux1
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 32) hi)))))
("Subgoal 1.2.1'" :use ((:instance mod-reduce-aux3
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 32) hi)))))
("Subgoal 1.1.2'" :use ((:instance mod-reduce-aux2
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 32) hi)))))
("Subgoal 1.1.1'" :use ((:instance mod-reduce-aux4
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 32) hi)))))))
(defthm mod-reduce-p2==simple-mod-reduce-p2
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(natp hi) (natp lo))
(equal (mod-reduce-p2 hi lo)
(simple-mod-reduce-p2 hi lo)))
:hints (("Goal" :cases ((< 0 hi)))
("Subgoal 1.2.2'" :use ((:instance mod-reduce-aux1
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 34) hi)))))
("Subgoal 1.2.1'" :use ((:instance mod-reduce-aux3
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 34) hi)))))
("Subgoal 1.1.2'" :use ((:instance mod-reduce-aux2
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 34) hi)))))
("Subgoal 1.1.1'" :use ((:instance mod-reduce-aux4
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 34) hi)))))))
(defthm mod-reduce-p3==simple-mod-reduce-p3
(implies (and (< hi (expt 2 64))
(< lo (expt 2 64))
(natp hi) (natp lo))
(equal (mod-reduce-p3 hi lo)
(simple-mod-reduce-p3 hi lo)))
:hints (("Goal" :cases ((< 0 hi)))
("Subgoal 1.2.2'" :use ((:instance mod-reduce-aux1
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 40) hi)))))
("Subgoal 1.2.1'" :use ((:instance mod-reduce-aux3
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 40) hi)))))
("Subgoal 1.1.2'" :use ((:instance mod-reduce-aux2
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 40) hi)))))
("Subgoal 1.1.1'" :use ((:instance mod-reduce-aux4
(m (expt 2 64))
(b (+ (- HI) LO))
(a (* (expt 2 40) hi)))))))