| Quellcodebibliothek Statistik Leitseite products/sources/formale Sprachen/Isabelle/HOL/ex/ (Beweissystem Isabelle Version 2025-1©) Datei vom 16.11.2025 mit Größe 14 kB |
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Quelle BinEx.thy Sprache: Isabelle |
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(* Title: HOL/ex/BinEx.thy Author: Lawrence C Paulson, Cambridge University Computer Laboratory Copyright 1998 University of Cambridge *) section ‹Binary arithmetic examples› theory BinEx imports Complex_Main begin subsection ‹Regression Testing for Cancellation Simprocs› lemma "l + 2 + 2 + 2 + (l + 2) + (oo + 2) = (uu::int)" apply simp oops lemma "2*u = (u::int)" apply simp oops lemma "(i + j + 12 + (k::int)) - 15 = y" apply simp oops lemma "(i + j + 12 + (k::int)) - 5 = y" apply simp oops lemma "y - b < (b::int)" apply simp oops lemma "y - (3*b + c) < (b::int) - 2*c" apply simp oops lemma "(2*x - (u*v) + y) - v*3*u = (w::int)" apply simp oops lemma "(2*x*u*v + (u*v)*4 + y) - v*u*4 = (w::int)" apply simp oops lemma "(2*x*u*v + (u*v)*4 + y) - v*u = (w::int)" apply simp oops lemma "u*v - (x*u*v + (u*v)*4 + y) = (w::int)" apply simp oops lemma "(i + j + 12 + (k::int)) = u + 15 + y" apply simp oops lemma "(i + j*2 + 12 + (k::int)) = j + 5 + y" apply simp oops lemma "2*y + 3*z + 6*w + 2*y + 3*z + 2*u = 2*y' + 3*z' + 6*w' + 2*y' + 3*z' + u + apply simp oops lemma "a + -(b+c) + b = (d::int)" apply simp oops lemma "a + -(b+c) - b = (d::int)" apply simp oops (*negative numerals*) lemma "(i + j + -2 + (k::int)) - (u + 5 + y) = zz" apply simp oops lemma "(i + j + -3 + (k::int)) < u + 5 + y" apply simp oops lemma "(i + j + 3 + (k::int)) < u + -6 + y" apply simp oops lemma "(i + j + -12 + (k::int)) - 15 = y" apply simp oops lemma "(i + j + 12 + (k::int)) - -15 = y" apply simp oops lemma "(i + j + -12 + (k::int)) - -15 = y" apply simp oops lemma "- (2*i) + 3 + (2*i + 4) = (0::int)" apply simp oops (*Tobias's example dated 2015-03-02*) lemma "(pi * (real u * 2) = pi * (real (xa v) * - 2))" apply simp oops subsection ‹Arithmetic Method Tests› lemma "!!a::int. [| a <= b; c <= d; x+y by arith lemma "!!a::int. [| a < b; c < d |] ==> a-d+ 2 <= b+(-c)" by arith lemma "!!a::int. [| a < b; c < d |] ==> a+c+ 1 < b+d" by arith lemma "!!a::int. [| a <= b; b+b <= c |] ==> a+a <= c" by arith lemma "!!a::int. [| a+b <= i+j; a<=b; i<=j |] ==> a+a <= j+j" by arith lemma "!!a::int. [| a+b < i+j; a by arith lemma "!!a::int. a+b+c <= i+j+k & a<=b & b<=c & i<=j & j<=k --> a+a+a <= k+k+k" by arith lemma "!!a::int. [| a+b+c+d <= i+j+k+l; a<=b; b<=c; c<=d; i<=j; j<=k; k<=l |] ==> a <= l" by arith lemma "!!a::int. [| a+b+c+d <= i+j+k+l; a<=b; b<=c; c<=d; i<=j; j<=k; k<=l |] ==> a+a+a+a <= l+l+l+l" by arith lemma "!!a::int. [| a+b+c+d <= i+j+k+l; a<=b; b<=c; c<=d; i<=j; j<=k; k<=l |] ==> a+a+a+a+a <= l+l+l+l+i" by arith lemma "!!a::int. [| a+b+c+d <= i+j+k+l; a<=b; b<=c; c<=d; i<=j; j<=k; k<=l |] ==> a+a+a+a+a+a <= l+l+l+l+i+l" by arith lemma "!!a::int. [| a+b+c+d <= i+j+k+l; a<=b; b<=c; c<=d; i<=j; j<=k; k<=l |] ==> 6*a <= 5*l+i" by arith subsection ‹The Integers› text ‹Addition› lemma "(13::int) + 19 = 32" by simp lemma "(1234::int) + 5678 = 6912" by simp lemma "(1359::int) + -2468 = -1109" by simp lemma "(93746::int) + -46375 = 47371" by simp text ‹\medskip Negation› lemma "- (65745::int) = -65745" by simp lemma "- (-54321::int) = 54321" by simp text ‹\medskip Multiplication› lemma "(13::int) * 19 = 247" by simp lemma "(-84::int) * 51 = -4284" by simp lemma "(255::int) * 255 = 65025" by simp lemma "(1359::int) * -2468 = -3354012" by simp lemma "(89::int) * 10 \ by simp lemma "(13::int) < 18 - 4" by simp lemma "(-345::int) < -242 + -100" by simp lemma "(13557456::int) < 18678654" by simp lemma "(999999::int) \ by simp lemma "(1234567::int) \ by simp text‹No integer overflow!› lemma "1234567 * (1234567::int) < 1234567*1234567*1234567" by simp text ‹\medskip Quotient and Remainder› lemma "(10::int) div 3 = 3" by simp lemma "(10::int) mod 3 = 1" by simp text ‹A negative divisor› lemma "(10::int) div -3 = -4" by simp lemma "(10::int) mod -3 = -2" by simp text ‹ A negative dividend\footnote{The definition agrees with mathematical convention and with ML, but not with the hardware of most computers} › lemma "(-10::int) div 3 = -4" by simp lemma "(-10::int) mod 3 = 2" by simp text ‹A negative dividend \emph{and} divisor› lemma "(-10::int) div -3 = 3" by simp lemma "(-10::int) mod -3 = -1" by simp text ‹A few bigger examples› lemma "(8452::int) mod 3 = 1" by simp lemma "(59485::int) div 434 = 137" by simp lemma "(1000006::int) mod 10 = 6" by simp text ‹\medskip Division by shifting› lemma "10000000 div 2 = (5000000::int)" by simp lemma "10000001 mod 2 = (1::int)" by simp lemma "10000055 div 32 = (312501::int)" by simp lemma "10000055 mod 32 = (23::int)" by simp lemma "100094 div 144 = (695::int)" by simp lemma "100094 mod 144 = (14::int)" by simp text ‹\medskip Powers› lemma "2 ^ 10 = (1024::int)" by simp lemma "(- 3) ^ 7 = (-2187::int)" by simp lemma "13 ^ 7 = (62748517::int)" by simp lemma "3 ^ 15 = (14348907::int)" by simp lemma "(- 5) ^ 11 = (-48828125::int)" by simp subsection ‹The Natural Numbers› text ‹Successor› lemma "Suc 99999 = 100000" by simp text ‹\medskip Addition› lemma "(13::nat) + 19 = 32" by simp lemma "(1234::nat) + 5678 = 6912" by simp lemma "(973646::nat) + 6475 = 980121" by simp text ‹\medskip Subtraction› lemma "(32::nat) - 14 = 18" by simp lemma "(14::nat) - 15 = 0" by simp lemma "(14::nat) - 1576644 = 0" by simp lemma "(48273776::nat) - 3873737 = 44400039" by simp text ‹\medskip Multiplication› lemma "(12::nat) * 11 = 132" by simp lemma "(647::nat) * 3643 = 2357021" by simp text ‹\medskip Quotient and Remainder› lemma "(10::nat) div 3 = 3" by simp lemma "(10::nat) mod 3 = 1" by simp lemma "(10000::nat) div 9 = 1111" by simp lemma "(10000::nat) mod 9 = 1" by simp lemma "(10000::nat) div 16 = 625" by simp lemma "(10000::nat) mod 16 = 0" by simp text ‹\medskip Powers› lemma "2 ^ 12 = (4096::nat)" by simp lemma "3 ^ 10 = (59049::nat)" by simp lemma "12 ^ 7 = (35831808::nat)" by simp lemma "3 ^ 14 = (4782969::nat)" by simp lemma "5 ^ 11 = (48828125::nat)" by simp text ‹\medskip Testing the cancellation of complementary terms› lemma "y + (x + -x) = (0::int) + y" by simp lemma "y + (-x + (- y + x)) = (0::int)" by simp lemma "-x + (y + (- y + x)) = (0::int)" by simp lemma "x + (x + (- x + (- x + (- y + - z)))) = (0::int) - y - z" by simp lemma "x + x - x - x - y - z = (0::int) - y - z" by simp lemma "x + y + z - (x + z) = y - (0::int)" by simp lemma "x + (y + (y + (y + (-x + -x)))) = (0::int) + y - x + y + y" by simp lemma "x + (y + (y + (y + (-y + -x)))) = y + (0::int) + y" by simp lemma "x + y - x + z - x - y - z + x < (1::int)" by simp subsection‹Real Arithmetic› subsubsection ‹Addition› lemma "(1359::real) + -2468 = -1109" by simp lemma "(93746::real) + -46375 = 47371" by simp subsubsection ‹Negation› lemma "- (65745::real) = -65745" by simp lemma "- (-54321::real) = 54321" by simp subsubsection ‹Multiplication› lemma "(-84::real) * 51 = -4284" by simp lemma "(255::real) * 255 = 65025" by simp lemma "(1359::real) * -2468 = -3354012" by simp subsubsection ‹Inequalities› lemma "(89::real) * 10 \ by simp lemma "(13::real) < 18 - 4" by simp lemma "(-345::real) < -242 + -100" by simp lemma "(13557456::real) < 18678654" by simp lemma "(999999::real) \ by simp lemma "(1234567::real) \ by simp subsubsection ‹Powers› lemma "2 ^ 15 = (32768::real)" by simp lemma "(- 3) ^ 7 = (-2187::real)" by simp lemma "13 ^ 7 = (62748517::real)" by simp lemma "3 ^ 15 = (14348907::real)" by simp lemma "(- 5) ^ 11 = (-48828125::real)" by simp subsubsection ‹Tests› lemma "(x + y = x) = (y = (0::real))" by arith lemma "(x + y = y) = (x = (0::real))" by arith lemma "(x + y = (0::real)) = (x = -y)" by arith lemma "(x + y = (0::real)) = (y = -x)" by arith lemma "((x + y) < (x + z)) = (y < (z::real))" by arith lemma "((x + z) < (y + z)) = (x < (y::real))" by arith lemma "(\ by arith lemma "\ by arith lemma "(x::real) < y ==> \ by arith lemma "((x::real) \ by arith lemma "(\ by arith lemma "x \ by arith lemma "x \ by arith lemma "x < y \ by arith lemma "x \ by arith lemma "((x::real) \ by arith lemma "((x::real) \ by arith lemma "\ by arith lemma "\ by arith lemma "(-x < (0::real)) = (0 < x)" by arith lemma "((0::real) < -x) = (x < 0)" by arith lemma "(-x \ by arith lemma "((0::real) \ by arith lemma "(x::real) = y \ by arith lemma "(x::real) = 0 \ by arith lemma "(0::real) \ by arith lemma "((x::real) + y \ by arith lemma "((x::real) + z \ by arith lemma "(w::real) < x \ by arith lemma "(w::real) \ by arith lemma "(0::real) \ by arith lemma "(0::real) < x \ by arith lemma "(-x < y) = (0 < x + (y::real))" by arith lemma "(x < -y) = (x + y < (0::real))" by arith lemma "(y < x + -z) = (y + z < (x::real))" by arith lemma "(x + -y < z) = (x < z + (y::real))" by arith lemma "x \ by arith lemma "(x - y) + y = (x::real)" by arith lemma "y + (x - y) = (x::real)" by arith lemma "x - x = (0::real)" by arith lemma "(x - y = 0) = (x = (y::real))" by arith lemma "((0::real) \ by arith lemma "(-x \ by arith lemma "(x \ by arith lemma "(-x = (0::real)) = (x = 0)" by arith lemma "-(x - y) = y - (x::real)" by arith lemma "((0::real) < x - y) = (y < x)" by arith lemma "((0::real) \ by arith lemma "(x + y) - x = (y::real)" by arith lemma "(-x = y) = (x = (-y::real))" by arith lemma "x < (y::real) ==> \ by arith lemma "(x \ by arith lemma "(y \ by arith lemma "(x < x + y) = ((0::real) < y)" by arith lemma "(y < x + y) = ((0::real) < x)" by arith lemma "(x - y) - x = (-y::real)" by arith lemma "(x + y < z) = (x < z - (y::real))" by arith lemma "(x - y < z) = (x < z + (y::real))" by arith lemma "(x < y - z) = (x + z < (y::real))" by arith lemma "(x \ by arith lemma "(x - y \ by arith lemma "(-x < -y) = (y < (x::real))" by arith lemma "(-x \ by arith lemma "(a + b) - (c + d) = (a - c) + (b - (d::real))" by arith lemma "(0::real) - x = -x" by arith lemma "x - (0::real) = x" by arith lemma "w \ by arith lemma "w < x \ by arith lemma "(0::real) \ by arith lemma "(0::real) < x \ by arith lemma "-x - y = -(x + (y::real))" by arith lemma "x - (-y) = x + (y::real)" by arith lemma "-x - -y = y - (x::real)" by arith lemma "(a - b) + (b - c) = a - (c::real)" by arith lemma "(x = y - z) = (x + z = (y::real))" by arith lemma "(x - y = z) = (x = z + (y::real))" by arith lemma "x - (x - y) = (y::real)" by arith lemma "x - (x + y) = -(y::real)" by arith lemma "x = y ==> x \ by arith lemma "(0::real) < x ==> \ by arith lemma "(x + y) * (x - y) = (x * x) - (y * y)" oops lemma "(-x = -y) = (x = (y::real))" by arith lemma "(-x < -y) = (y < (x::real))" by arith lemma "!!a::real. a \ by linarith lemma "!!a::real. a < b ==> c < d ==> a - d \ by linarith lemma "!!a::real. a \ by linarith lemma "!!a::real. a + b \ by linarith lemma "!!a::real. a + b < i + j ==> a < b ==> i < j ==> a + a < j + j" by linarith lemma "!!a::real. a + b + c \ by arith lemma "!!a::real. a + b + c + d \ ==> c ≤ d ==> i ≤ j ==> j ≤ k ==> k ≤ l ==> a ≤ l" by linarith lemma "!!a::real. a + b + c + d \ ==> c ≤ d ==> i ≤ j ==> j ≤ k ==> k ≤ l ==> a + a + a + a ≤ l + l + l + l" by linarith lemma "!!a::real. a + b + c + d \ ==> c ≤ d ==> i ≤ j ==> j ≤ k ==> k ≤ l ==> a + a + a + a + a ≤ l + l + l + l + i" by linarith lemma "!!a::real. a + b + c + d \ ==> c ≤ d ==> i ≤ j ==> j ≤ k ==> k ≤ l ==> a + a + a + a + a + a ≤ l + l + l + l + i + l" by linarith subsection‹Complex Arithmetic› lemma "(1359 + 93746*\) - (2468 + 46375*\) = -1109 + 47371*\" by simp lemma "- (65745 + -47371*\) = -65745 + 47371*\" by simp text‹Multiplication requires distributive laws. Perhaps versions instantiated to literal constants should be added to the simpset.› lemma "(1 + \) * (1 - \) = 2" by (simp add: ring_distribs) lemma "(1 + 2*\) * (1 + 3*\) = -5 + 5*\" by (simp add: ring_distribs) lemma "(-84 + 255*\) + (51 * 255*\) = -84 + 13260 * \" by (simp add: ring_distribs) text‹No inequalities or linear arithmetic: the complex numbers are unordered!› text‹No powers (not supported yet)› end
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2026-04-02