| author | wenzelm |
| Sat, 01 Jul 2000 19:55:22 +0200 | |
| changeset 9230 | 17ae63f82ad8 |
| parent 3837 | d7f033c74b38 |
| child 9249 | c71db8c28727 |
| permissions | -rw-r--r-- |
| 1459 | 1 |
(* Title: CTT/arith |
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ID: $Id$ |
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Author: Lawrence C Paulson, Cambridge University Computer Laboratory |
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Copyright 1991 University of Cambridge |
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Theorems for arith.thy (Arithmetic operators) |
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Proofs about elementary arithmetic: addition, multiplication, etc. |
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Tests definitions and simplifier. |
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*) |
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open Arith; |
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val arith_defs = [add_def, diff_def, absdiff_def, mult_def, mod_def, div_def]; |
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(** Addition *) |
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(*typing of add: short and long versions*) |
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qed_goalw "add_typing" Arith.thy arith_defs |
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"[| a:N; b:N |] ==> a #+ b : N" |
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(fn prems=> [ (typechk_tac prems) ]); |
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qed_goalw "add_typingL" Arith.thy arith_defs |
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"[| a=c:N; b=d:N |] ==> a #+ b = c #+ d : N" |
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(fn prems=> [ (equal_tac prems) ]); |
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(*computation for add: 0 and successor cases*) |
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qed_goalw "addC0" Arith.thy arith_defs |
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"b:N ==> 0 #+ b = b : N" |
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(fn prems=> [ (rew_tac prems) ]); |
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qed_goalw "addC_succ" Arith.thy arith_defs |
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"[| a:N; b:N |] ==> succ(a) #+ b = succ(a #+ b) : N" |
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(fn prems=> [ (rew_tac prems) ]); |
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(** Multiplication *) |
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(*typing of mult: short and long versions*) |
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qed_goalw "mult_typing" Arith.thy arith_defs |
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"[| a:N; b:N |] ==> a #* b : N" |
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(fn prems=> |
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[ (typechk_tac([add_typing]@prems)) ]); |
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qed_goalw "mult_typingL" Arith.thy arith_defs |
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"[| a=c:N; b=d:N |] ==> a #* b = c #* d : N" |
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(fn prems=> |
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[ (equal_tac (prems@[add_typingL])) ]); |
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(*computation for mult: 0 and successor cases*) |
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qed_goalw "multC0" Arith.thy arith_defs |
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"b:N ==> 0 #* b = 0 : N" |
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(fn prems=> [ (rew_tac prems) ]); |
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qed_goalw "multC_succ" Arith.thy arith_defs |
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"[| a:N; b:N |] ==> succ(a) #* b = b #+ (a #* b) : N" |
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(fn prems=> [ (rew_tac prems) ]); |
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(** Difference *) |
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(*typing of difference*) |
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qed_goalw "diff_typing" Arith.thy arith_defs |
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"[| a:N; b:N |] ==> a - b : N" |
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(fn prems=> [ (typechk_tac prems) ]); |
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qed_goalw "diff_typingL" Arith.thy arith_defs |
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"[| a=c:N; b=d:N |] ==> a - b = c - d : N" |
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(fn prems=> [ (equal_tac prems) ]); |
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(*computation for difference: 0 and successor cases*) |
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qed_goalw "diffC0" Arith.thy arith_defs |
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"a:N ==> a - 0 = a : N" |
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(fn prems=> [ (rew_tac prems) ]); |
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(*Note: rec(a, 0, %z w.z) is pred(a). *) |
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qed_goalw "diff_0_eq_0" Arith.thy arith_defs |
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"b:N ==> 0 - b = 0 : N" |
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(fn prems=> |
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[ (NE_tac "b" 1), |
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(hyp_rew_tac prems) ]); |
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(*Essential to simplify FIRST!! (Else we get a critical pair) |
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succ(a) - succ(b) rewrites to pred(succ(a) - b) *) |
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qed_goalw "diff_succ_succ" Arith.thy arith_defs |
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"[| a:N; b:N |] ==> succ(a) - succ(b) = a - b : N" |
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(fn prems=> |
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[ (hyp_rew_tac prems), |
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(NE_tac "b" 1), |
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(hyp_rew_tac prems) ]); |
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(*** Simplification *) |
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val arith_typing_rls = |
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[add_typing, mult_typing, diff_typing]; |
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val arith_congr_rls = |
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[add_typingL, mult_typingL, diff_typingL]; |
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val congr_rls = arith_congr_rls@standard_congr_rls; |
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val arithC_rls = |
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[addC0, addC_succ, |
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multC0, multC_succ, |
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diffC0, diff_0_eq_0, diff_succ_succ]; |
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structure Arith_simp_data: TSIMP_DATA = |
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struct |
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val refl = refl_elem |
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val sym = sym_elem |
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val trans = trans_elem |
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val refl_red = refl_red |
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val trans_red = trans_red |
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val red_if_equal = red_if_equal |
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val default_rls = arithC_rls @ comp_rls |
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val routine_tac = routine_tac (arith_typing_rls @ routine_rls) |
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end; |
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structure Arith_simp = TSimpFun (Arith_simp_data); |
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fun arith_rew_tac prems = make_rew_tac |
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(Arith_simp.norm_tac(congr_rls, prems)); |
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fun hyp_arith_rew_tac prems = make_rew_tac |
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(Arith_simp.cond_norm_tac(prove_cond_tac, congr_rls, prems)); |
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(********** |
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Addition |
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**********) |
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(*Associative law for addition*) |
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qed_goal "add_assoc" Arith.thy |
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"[| a:N; b:N; c:N |] ==> (a #+ b) #+ c = a #+ (b #+ c) : N" |
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(fn prems=> |
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[ (NE_tac "a" 1), |
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(hyp_arith_rew_tac prems) ]); |
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(*Commutative law for addition. Can be proved using three inductions. |
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Must simplify after first induction! Orientation of rewrites is delicate*) |
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qed_goal "add_commute" Arith.thy |
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"[| a:N; b:N |] ==> a #+ b = b #+ a : N" |
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(fn prems=> |
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[ (NE_tac "a" 1), |
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(hyp_arith_rew_tac prems), |
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(NE_tac "b" 2), |
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(rtac sym_elem 1), |
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(NE_tac "b" 1), |
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(hyp_arith_rew_tac prems) ]); |
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(**************** |
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Multiplication |
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****************) |
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(*Commutative law for multiplication |
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qed_goal "mult_commute" Arith.thy |
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"[| a:N; b:N |] ==> a #* b = b #* a : N" |
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(fn prems=> |
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[ (NE_tac "a" 1), |
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(hyp_arith_rew_tac prems), |
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(NE_tac "b" 2), |
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(rtac sym_elem 1), |
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(NE_tac "b" 1), |
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(hyp_arith_rew_tac prems) ]); NEEDS COMMUTATIVE MATCHING |
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***************) |
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(*right annihilation in product*) |
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qed_goal "mult_0_right" Arith.thy |
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"a:N ==> a #* 0 = 0 : N" |
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(fn prems=> |
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[ (NE_tac "a" 1), |
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(hyp_arith_rew_tac prems) ]); |
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(*right successor law for multiplication*) |
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qed_goal "mult_succ_right" Arith.thy |
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"[| a:N; b:N |] ==> a #* succ(b) = a #+ (a #* b) : N" |
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(fn prems=> |
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[ (NE_tac "a" 1), |
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(*swap round the associative law of addition*) |
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(hyp_arith_rew_tac (prems @ [add_assoc RS sym_elem])), |
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(*leaves a goal involving a commutative law*) |
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(REPEAT (assume_tac 1 ORELSE |
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resolve_tac |
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(prems@[add_commute,mult_typingL,add_typingL]@ |
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intrL_rls@[refl_elem]) 1)) ]); |
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(*Commutative law for multiplication*) |
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qed_goal "mult_commute" Arith.thy |
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"[| a:N; b:N |] ==> a #* b = b #* a : N" |
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(fn prems=> |
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[ (NE_tac "a" 1), |
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(hyp_arith_rew_tac (prems @ [mult_0_right, mult_succ_right])) ]); |
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(*addition distributes over multiplication*) |
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qed_goal "add_mult_distrib" Arith.thy |
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"[| a:N; b:N; c:N |] ==> (a #+ b) #* c = (a #* c) #+ (b #* c) : N" |
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(fn prems=> |
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[ (NE_tac "a" 1), |
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(*swap round the associative law of addition*) |
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(hyp_arith_rew_tac (prems @ [add_assoc RS sym_elem])) ]); |
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(*Associative law for multiplication*) |
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qed_goal "mult_assoc" Arith.thy |
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"[| a:N; b:N; c:N |] ==> (a #* b) #* c = a #* (b #* c) : N" |
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(fn prems=> |
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[ (NE_tac "a" 1), |
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(hyp_arith_rew_tac (prems @ [add_mult_distrib])) ]); |
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(************ |
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Difference |
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************ |
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Difference on natural numbers, without negative numbers |
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a - b = 0 iff a<=b a - b = succ(c) iff a>b *) |
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qed_goal "diff_self_eq_0" Arith.thy |
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"a:N ==> a - a = 0 : N" |
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(fn prems=> |
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[ (NE_tac "a" 1), |
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(hyp_arith_rew_tac prems) ]); |
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(* [| c : N; 0 : N; c : N |] ==> c #+ 0 = c : N *) |
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val add_0_right = addC0 RSN (3, add_commute RS trans_elem); |
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(*Addition is the inverse of subtraction: if b<=x then b#+(x-b) = x. |
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An example of induction over a quantified formula (a product). |
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Uses rewriting with a quantified, implicative inductive hypothesis.*) |
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val prems = |
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goal Arith.thy |
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"b:N ==> ?a : PROD x:N. Eq(N, b-x, 0) --> Eq(N, b #+ (x-b), x)"; |
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by (NE_tac "b" 1); |
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(*strip one "universal quantifier" but not the "implication"*) |
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by (resolve_tac intr_rls 3); |
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(*case analysis on x in |
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(succ(u) <= x) --> (succ(u)#+(x-succ(u)) = x) *) |
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by (NE_tac "x" 4 THEN assume_tac 4); |
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(*Prepare for simplification of types -- the antecedent succ(u)<=x *) |
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by (rtac replace_type 5); |
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by (rtac replace_type 4); |
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by (arith_rew_tac prems); |
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(*Solves first 0 goal, simplifies others. Two sugbgoals remain. |
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Both follow by rewriting, (2) using quantified induction hyp*) |
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by (intr_tac[]); (*strips remaining PRODs*) |
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by (hyp_arith_rew_tac (prems@[add_0_right])); |
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by (assume_tac 1); |
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qed "add_diff_inverse_lemma"; |
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(*Version of above with premise b-a=0 i.e. a >= b. |
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Using ProdE does not work -- for ?B(?a) is ambiguous. |
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Instead, add_diff_inverse_lemma states the desired induction scheme; |
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the use of RS below instantiates Vars in ProdE automatically. *) |
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val prems = |
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goal Arith.thy "[| a:N; b:N; b-a = 0 : N |] ==> b #+ (a-b) = a : N"; |
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by (rtac EqE 1); |
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by (resolve_tac [ add_diff_inverse_lemma RS ProdE RS ProdE ] 1); |
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by (REPEAT (resolve_tac (prems@[EqI]) 1)); |
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qed "add_diff_inverse"; |
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(******************** |
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Absolute difference |
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********************) |
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(*typing of absolute difference: short and long versions*) |
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qed_goalw "absdiff_typing" Arith.thy arith_defs |
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"[| a:N; b:N |] ==> a |-| b : N" |
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(fn prems=> [ (typechk_tac prems) ]); |
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qed_goalw "absdiff_typingL" Arith.thy arith_defs |
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"[| a=c:N; b=d:N |] ==> a |-| b = c |-| d : N" |
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(fn prems=> [ (equal_tac prems) ]); |
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qed_goalw "absdiff_self_eq_0" Arith.thy [absdiff_def] |
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"a:N ==> a |-| a = 0 : N" |
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(fn prems=> |
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[ (arith_rew_tac (prems@[diff_self_eq_0])) ]); |
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qed_goalw "absdiffC0" Arith.thy [absdiff_def] |
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"a:N ==> 0 |-| a = a : N" |
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(fn prems=> |
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[ (hyp_arith_rew_tac prems) ]); |
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qed_goalw "absdiff_succ_succ" Arith.thy [absdiff_def] |
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"[| a:N; b:N |] ==> succ(a) |-| succ(b) = a |-| b : N" |
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(fn prems=> |
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[ (hyp_arith_rew_tac prems) ]); |
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(*Note how easy using commutative laws can be? ...not always... *) |
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val prems = goalw Arith.thy [absdiff_def] |
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"[| a:N; b:N |] ==> a |-| b = b |-| a : N"; |
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by (rtac add_commute 1); |
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by (typechk_tac ([diff_typing]@prems)); |
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qed "absdiff_commute"; |
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(*If a+b=0 then a=0. Surprisingly tedious*) |
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val prems = |
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goal Arith.thy "[| a:N; b:N |] ==> ?c : PROD u: Eq(N,a#+b,0) . Eq(N,a,0)"; |
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by (NE_tac "a" 1); |
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by (rtac replace_type 3); |
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by (arith_rew_tac prems); |
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by (intr_tac[]); (*strips remaining PRODs*) |
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by (resolve_tac [ zero_ne_succ RS FE ] 2); |
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by (etac (EqE RS sym_elem) 3); |
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by (typechk_tac ([add_typing] @prems)); |
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qed "add_eq0_lemma"; |
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(*Version of above with the premise a+b=0. |
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Again, resolution instantiates variables in ProdE *) |
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val prems = |
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goal Arith.thy "[| a:N; b:N; a #+ b = 0 : N |] ==> a = 0 : N"; |
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by (rtac EqE 1); |
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by (resolve_tac [add_eq0_lemma RS ProdE] 1); |
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by (rtac EqI 3); |
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by (ALLGOALS (resolve_tac prems)); |
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qed "add_eq0"; |
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(*Here is a lemma to infer a-b=0 and b-a=0 from a|-|b=0, below. *) |
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340 |
val prems = goalw Arith.thy [absdiff_def] |
| 0 | 341 |
"[| a:N; b:N; a |-| b = 0 : N |] ==> \ |
342 |
\ ?a : SUM v: Eq(N, a-b, 0) . Eq(N, b-a, 0)"; |
|
343 |
by (intr_tac[]); |
|
344 |
by eqintr_tac; |
|
| 1459 | 345 |
by (rtac add_eq0 2); |
346 |
by (rtac add_eq0 1); |
|
| 0 | 347 |
by (resolve_tac [add_commute RS trans_elem] 6); |
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348 |
by (typechk_tac (diff_typing::prems)); |
| 1294 | 349 |
qed "absdiff_eq0_lem"; |
| 0 | 350 |
|
351 |
(*if a |-| b = 0 then a = b |
|
352 |
proof: a-b=0 and b-a=0, so b = a+(b-a) = a+0 = a*) |
|
353 |
val prems = |
|
354 |
goal Arith.thy "[| a |-| b = 0 : N; a:N; b:N |] ==> a = b : N"; |
|
| 1459 | 355 |
by (rtac EqE 1); |
| 0 | 356 |
by (resolve_tac [absdiff_eq0_lem RS SumE] 1); |
357 |
by (TRYALL (resolve_tac prems)); |
|
358 |
by eqintr_tac; |
|
359 |
by (resolve_tac [add_diff_inverse RS sym_elem RS trans_elem] 1); |
|
| 1459 | 360 |
by (rtac EqE 3 THEN assume_tac 3); |
| 0 | 361 |
by (hyp_arith_rew_tac (prems@[add_0_right])); |
| 1294 | 362 |
qed "absdiff_eq0"; |
| 0 | 363 |
|
364 |
(*********************** |
|
365 |
Remainder and Quotient |
|
366 |
***********************) |
|
367 |
||
368 |
(*typing of remainder: short and long versions*) |
|
369 |
||
| 1294 | 370 |
qed_goalw "mod_typing" Arith.thy [mod_def] |
| 0 | 371 |
"[| a:N; b:N |] ==> a mod b : N" |
372 |
(fn prems=> |
|
|
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373 |
[ (typechk_tac (absdiff_typing::prems)) ]); |
| 0 | 374 |
|
| 1294 | 375 |
qed_goalw "mod_typingL" Arith.thy [mod_def] |
| 0 | 376 |
"[| a=c:N; b=d:N |] ==> a mod b = c mod d : N" |
377 |
(fn prems=> |
|
|
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378 |
[ (equal_tac (prems@[absdiff_typingL])) ]); |
| 0 | 379 |
|
380 |
||
381 |
(*computation for mod : 0 and successor cases*) |
|
382 |
||
| 1294 | 383 |
qed_goalw "modC0" Arith.thy [mod_def] "b:N ==> 0 mod b = 0 : N" |
| 0 | 384 |
(fn prems=> |
|
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385 |
[ (rew_tac(absdiff_typing::prems)) ]); |
| 0 | 386 |
|
| 1294 | 387 |
qed_goalw "modC_succ" Arith.thy [mod_def] |
| 3837 | 388 |
"[| a:N; b:N |] ==> succ(a) mod b = rec(succ(a mod b) |-| b, 0, %x y. succ(a mod b)) : N" |
| 0 | 389 |
(fn prems=> |
|
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|
390 |
[ (rew_tac(absdiff_typing::prems)) ]); |
| 0 | 391 |
|
392 |
||
393 |
(*typing of quotient: short and long versions*) |
|
394 |
||
| 1294 | 395 |
qed_goalw "div_typing" Arith.thy [div_def] "[| a:N; b:N |] ==> a div b : N" |
| 0 | 396 |
(fn prems=> |
|
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|
397 |
[ (typechk_tac ([absdiff_typing,mod_typing]@prems)) ]); |
| 0 | 398 |
|
| 1294 | 399 |
qed_goalw "div_typingL" Arith.thy [div_def] |
| 0 | 400 |
"[| a=c:N; b=d:N |] ==> a div b = c div d : N" |
401 |
(fn prems=> |
|
|
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|
402 |
[ (equal_tac (prems @ [absdiff_typingL, mod_typingL])) ]); |
| 0 | 403 |
|
404 |
val div_typing_rls = [mod_typing, div_typing, absdiff_typing]; |
|
405 |
||
406 |
||
407 |
(*computation for quotient: 0 and successor cases*) |
|
408 |
||
| 1294 | 409 |
qed_goalw "divC0" Arith.thy [div_def] "b:N ==> 0 div b = 0 : N" |
| 0 | 410 |
(fn prems=> |
|
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411 |
[ (rew_tac([mod_typing, absdiff_typing] @ prems)) ]); |
| 0 | 412 |
|
413 |
val divC_succ = |
|
|
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414 |
prove_goalw Arith.thy [div_def] "[| a:N; b:N |] ==> succ(a) div b = \ |
| 0 | 415 |
\ rec(succ(a) mod b, succ(a div b), %x y. a div b) : N" |
416 |
(fn prems=> |
|
|
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|
417 |
[ (rew_tac([mod_typing]@prems)) ]); |
| 0 | 418 |
|
419 |
||
420 |
(*Version of above with same condition as the mod one*) |
|
| 1294 | 421 |
qed_goal "divC_succ2" Arith.thy |
| 0 | 422 |
"[| a:N; b:N |] ==> \ |
423 |
\ succ(a) div b =rec(succ(a mod b) |-| b, succ(a div b), %x y. a div b) : N" |
|
424 |
(fn prems=> |
|
425 |
[ (resolve_tac [ divC_succ RS trans_elem ] 1), |
|
426 |
(rew_tac(div_typing_rls @ prems @ [modC_succ])), |
|
427 |
(NE_tac "succ(a mod b)|-|b" 1), |
|
428 |
(rew_tac ([mod_typing, div_typing, absdiff_typing] @prems)) ]); |
|
429 |
||
430 |
(*for case analysis on whether a number is 0 or a successor*) |
|
| 1294 | 431 |
qed_goal "iszero_decidable" Arith.thy |
| 3837 | 432 |
"a:N ==> rec(a, inl(eq), %ka kb. inr(<ka, eq>)) : \ |
| 1459 | 433 |
\ Eq(N,a,0) + (SUM x:N. Eq(N,a, succ(x)))" |
| 0 | 434 |
(fn prems=> |
435 |
[ (NE_tac "a" 1), |
|
| 1459 | 436 |
(rtac PlusI_inr 3), |
437 |
(rtac PlusI_inl 2), |
|
| 0 | 438 |
eqintr_tac, |
439 |
(equal_tac prems) ]); |
|
440 |
||
441 |
(*Main Result. Holds when b is 0 since a mod 0 = a and a div 0 = 0 *) |
|
442 |
val prems = |
|
443 |
goal Arith.thy "[| a:N; b:N |] ==> a mod b #+ (a div b) #* b = a : N"; |
|
444 |
by (NE_tac "a" 1); |
|
445 |
by (arith_rew_tac (div_typing_rls@prems@[modC0,modC_succ,divC0,divC_succ2])); |
|
| 1459 | 446 |
by (rtac EqE 1); |
| 0 | 447 |
(*case analysis on succ(u mod b)|-|b *) |
448 |
by (res_inst_tac [("a1", "succ(u mod b) |-| b")]
|
|
449 |
(iszero_decidable RS PlusE) 1); |
|
450 |
by (etac SumE 3); |
|
451 |
by (hyp_arith_rew_tac (prems @ div_typing_rls @ |
|
| 1459 | 452 |
[modC0,modC_succ, divC0, divC_succ2])); |
| 0 | 453 |
(*Replace one occurence of b by succ(u mod b). Clumsy!*) |
454 |
by (resolve_tac [ add_typingL RS trans_elem ] 1); |
|
455 |
by (eresolve_tac [EqE RS absdiff_eq0 RS sym_elem] 1); |
|
| 1459 | 456 |
by (rtac refl_elem 3); |
| 0 | 457 |
by (hyp_arith_rew_tac (prems @ div_typing_rls)); |
| 1294 | 458 |
qed "mod_div_equality"; |
| 0 | 459 |
|
460 |
writeln"Reached end of file."; |