author  wenzelm 
Fri, 17 Nov 2006 02:20:03 +0100  
changeset 21404  eb85850d3eb7 
parent 21210  c17fd2df4e9e 
child 27208  5fe899199f85 
permissions  rwrr 
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(* Title: CTT/Arith.thy 
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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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*) 

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header {* Elementary arithmetic *} 
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theory Arith 

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imports Bool 

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begin 

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subsection {* Arithmetic operators and their definitions *} 
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definition 
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add :: "[i,i]=>i" (infixr "#+" 65) where 
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"a#+b == rec(a, b, %u v. succ(v))" 
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definition 
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diff :: "[i,i]=>i" (infixr "" 65) where 
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"ab == rec(b, a, %u v. rec(v, 0, %x y. x))" 
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definition 
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absdiff :: "[i,i]=>i" (infixr "" 65) where 
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"ab == (ab) #+ (ba)" 
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definition 
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mult :: "[i,i]=>i" (infixr "#*" 70) where 
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"a#*b == rec(a, 0, %u v. b #+ v)" 
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xsymbol support for Pi, Sigma, >, : (membership)
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more robust syntax for definition/abbreviation/notation;
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definition 
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more robust syntax for definition/abbreviation/notation;
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mod :: "[i,i]=>i" (infixr "mod" 70) where 
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"a mod b == rec(a, 0, %u v. rec(succ(v)  b, 0, %x y. succ(v)))" 
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definition 
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more robust syntax for definition/abbreviation/notation;
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div :: "[i,i]=>i" (infixr "div" 70) where 
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"a div b == rec(a, 0, %u v. rec(succ(u) mod b, succ(v), %x y. v))" 
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notation (xsymbols) 
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mult (infixr "#\<times>" 70) 
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notation (HTML output) 
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mult (infixr "#\<times>" 70) 
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lemmas arith_defs = add_def diff_def absdiff_def mult_def mod_def div_def 
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subsection {* Proofs about elementary arithmetic: addition, multiplication, etc. *} 

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(** Addition *) 

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(*typing of add: short and long versions*) 

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lemma add_typing: "[ a:N; b:N ] ==> a #+ b : N" 

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apply (unfold arith_defs) 

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apply (tactic "typechk_tac []") 

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done 

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lemma add_typingL: "[ a=c:N; b=d:N ] ==> a #+ b = c #+ d : N" 

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apply (unfold arith_defs) 

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apply (tactic "equal_tac []") 

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done 

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(*computation for add: 0 and successor cases*) 

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lemma addC0: "b:N ==> 0 #+ b = b : N" 

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apply (unfold arith_defs) 

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apply (tactic "rew_tac []") 

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done 

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lemma addC_succ: "[ a:N; b:N ] ==> succ(a) #+ b = succ(a #+ b) : N" 

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apply (unfold arith_defs) 

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apply (tactic "rew_tac []") 

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done 

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(** Multiplication *) 

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(*typing of mult: short and long versions*) 

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lemma mult_typing: "[ a:N; b:N ] ==> a #* b : N" 

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apply (unfold arith_defs) 

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apply (tactic {* typechk_tac [thm "add_typing"] *}) 

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done 

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lemma mult_typingL: "[ a=c:N; b=d:N ] ==> a #* b = c #* d : N" 

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apply (unfold arith_defs) 

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apply (tactic {* equal_tac [thm "add_typingL"] *}) 

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done 

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(*computation for mult: 0 and successor cases*) 

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lemma multC0: "b:N ==> 0 #* b = 0 : N" 

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apply (unfold arith_defs) 

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apply (tactic "rew_tac []") 

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done 

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lemma multC_succ: "[ a:N; b:N ] ==> succ(a) #* b = b #+ (a #* b) : N" 

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apply (unfold arith_defs) 

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apply (tactic "rew_tac []") 

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done 

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(** Difference *) 

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(*typing of difference*) 

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lemma diff_typing: "[ a:N; b:N ] ==> a  b : N" 

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apply (unfold arith_defs) 

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apply (tactic "typechk_tac []") 

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done 

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lemma diff_typingL: "[ a=c:N; b=d:N ] ==> a  b = c  d : N" 

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apply (unfold arith_defs) 

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apply (tactic "equal_tac []") 

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done 

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(*computation for difference: 0 and successor cases*) 

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lemma diffC0: "a:N ==> a  0 = a : N" 

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apply (unfold arith_defs) 

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apply (tactic "rew_tac []") 

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done 

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(*Note: rec(a, 0, %z w.z) is pred(a). *) 

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lemma diff_0_eq_0: "b:N ==> 0  b = 0 : N" 

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apply (unfold arith_defs) 

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apply (tactic {* NE_tac "b" 1 *}) 

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apply (tactic "hyp_rew_tac []") 

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done 

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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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lemma diff_succ_succ: "[ a:N; b:N ] ==> succ(a)  succ(b) = a  b : N" 

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apply (unfold arith_defs) 

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apply (tactic "hyp_rew_tac []") 

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apply (tactic {* NE_tac "b" 1 *}) 

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apply (tactic "hyp_rew_tac []") 

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done 

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subsection {* Simplification *} 

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lemmas arith_typing_rls = add_typing mult_typing diff_typing 

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and arith_congr_rls = add_typingL mult_typingL diff_typingL 

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lemmas congr_rls = arith_congr_rls intrL2_rls elimL_rls 

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lemmas 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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ML {* 

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structure Arith_simp_data: TSIMP_DATA = 

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struct 

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val refl = thm "refl_elem" 

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val sym = thm "sym_elem" 

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val trans = thm "trans_elem" 

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val refl_red = thm "refl_red" 

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val trans_red = thm "trans_red" 

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val red_if_equal = thm "red_if_equal" 

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val default_rls = thms "arithC_rls" @ thms "comp_rls" 

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val routine_tac = routine_tac (thms "arith_typing_rls" @ thms "routine_rls") 

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end 

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structure Arith_simp = TSimpFun (Arith_simp_data) 

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local val congr_rls = thms "congr_rls" in 

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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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end 
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*} 
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subsection {* Addition *} 

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(*Associative law for addition*) 

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lemma add_assoc: "[ a:N; b:N; c:N ] ==> (a #+ b) #+ c = a #+ (b #+ c) : N" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (tactic "hyp_arith_rew_tac []") 

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done 

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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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lemma add_commute: "[ a:N; b:N ] ==> a #+ b = b #+ a : N" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (tactic "hyp_arith_rew_tac []") 

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apply (tactic {* NE_tac "b" 2 *}) 

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apply (rule sym_elem) 

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apply (tactic {* NE_tac "b" 1 *}) 

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apply (tactic "hyp_arith_rew_tac []") 

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done 

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subsection {* Multiplication *} 

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(*right annihilation in product*) 

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lemma mult_0_right: "a:N ==> a #* 0 = 0 : N" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (tactic "hyp_arith_rew_tac []") 

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done 

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(*right successor law for multiplication*) 

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lemma mult_succ_right: "[ a:N; b:N ] ==> a #* succ(b) = a #+ (a #* b) : N" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (tactic {* hyp_arith_rew_tac [thm "add_assoc" RS thm "sym_elem"] *}) 

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apply (assumption  rule add_commute mult_typingL add_typingL intrL_rls refl_elem)+ 

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done 

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(*Commutative law for multiplication*) 

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lemma mult_commute: "[ a:N; b:N ] ==> a #* b = b #* a : N" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (tactic {* hyp_arith_rew_tac [thm "mult_0_right", thm "mult_succ_right"] *}) 

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done 

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(*addition distributes over multiplication*) 

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lemma add_mult_distrib: "[ a:N; b:N; c:N ] ==> (a #+ b) #* c = (a #* c) #+ (b #* c) : N" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (tactic {* hyp_arith_rew_tac [thm "add_assoc" RS thm "sym_elem"] *}) 

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done 

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(*Associative law for multiplication*) 

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lemma mult_assoc: "[ a:N; b:N; c:N ] ==> (a #* b) #* c = a #* (b #* c) : N" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (tactic {* hyp_arith_rew_tac [thm "add_mult_distrib"] *}) 

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done 

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subsection {* Difference *} 

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text {* 

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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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lemma diff_self_eq_0: "a:N ==> a  a = 0 : N" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (tactic "hyp_arith_rew_tac []") 

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done 

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lemma add_0_right: "[ c : N; 0 : N; c : N ] ==> c #+ 0 = c : N" 

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by (rule addC0 [THEN [3] add_commute [THEN trans_elem]]) 

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(*Addition is the inverse of subtraction: if b<=x then b#+(xb) = 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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lemma add_diff_inverse_lemma: "b:N ==> ?a : PROD x:N. Eq(N, bx, 0) > Eq(N, b #+ (xb), x)" 

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apply (tactic {* NE_tac "b" 1 *}) 

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(*strip one "universal quantifier" but not the "implication"*) 

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apply (rule_tac [3] intr_rls) 

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(*case analysis on x in 

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(succ(u) <= x) > (succ(u)#+(xsucc(u)) = x) *) 

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apply (tactic {* NE_tac "x" 4 *}, tactic "assume_tac 4") 

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(*Prepare for simplification of types  the antecedent succ(u)<=x *) 

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apply (rule_tac [5] replace_type) 

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apply (rule_tac [4] replace_type) 

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apply (tactic "arith_rew_tac []") 

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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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apply (tactic "intr_tac []") (*strips remaining PRODs*) 

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apply (tactic {* hyp_arith_rew_tac [thm "add_0_right"] *}) 

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apply assumption 

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done 

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(*Version of above with premise ba=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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lemma add_diff_inverse: "[ a:N; b:N; ba = 0 : N ] ==> b #+ (ab) = a : N" 

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apply (rule EqE) 

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apply (rule add_diff_inverse_lemma [THEN ProdE, THEN ProdE]) 

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apply (assumption  rule EqI)+ 

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done 

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subsection {* Absolute difference *} 

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(*typing of absolute difference: short and long versions*) 

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lemma absdiff_typing: "[ a:N; b:N ] ==> a  b : N" 

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apply (unfold arith_defs) 

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apply (tactic "typechk_tac []") 

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done 

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lemma absdiff_typingL: "[ a=c:N; b=d:N ] ==> a  b = c  d : N" 

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apply (unfold arith_defs) 

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apply (tactic "equal_tac []") 

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done 

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lemma absdiff_self_eq_0: "a:N ==> a  a = 0 : N" 

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apply (unfold absdiff_def) 

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apply (tactic {* arith_rew_tac [thm "diff_self_eq_0"] *}) 

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done 

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lemma absdiffC0: "a:N ==> 0  a = a : N" 

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apply (unfold absdiff_def) 

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apply (tactic "hyp_arith_rew_tac []") 

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done 

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lemma absdiff_succ_succ: "[ a:N; b:N ] ==> succ(a)  succ(b) = a  b : N" 

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apply (unfold absdiff_def) 

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apply (tactic "hyp_arith_rew_tac []") 

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done 

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(*Note how easy using commutative laws can be? ...not always... *) 

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lemma absdiff_commute: "[ a:N; b:N ] ==> a  b = b  a : N" 

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apply (unfold absdiff_def) 

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apply (rule add_commute) 

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apply (tactic {* typechk_tac [thm "diff_typing"] *}) 

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done 

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(*If a+b=0 then a=0. Surprisingly tedious*) 

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lemma add_eq0_lemma: "[ a:N; b:N ] ==> ?c : PROD u: Eq(N,a#+b,0) . Eq(N,a,0)" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (rule_tac [3] replace_type) 

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apply (tactic "arith_rew_tac []") 

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apply (tactic "intr_tac []") (*strips remaining PRODs*) 

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apply (rule_tac [2] zero_ne_succ [THEN FE]) 

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apply (erule_tac [3] EqE [THEN sym_elem]) 

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apply (tactic {* typechk_tac [thm "add_typing"] *}) 

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done 

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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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lemma add_eq0: "[ a:N; b:N; a #+ b = 0 : N ] ==> a = 0 : N" 

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apply (rule EqE) 

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apply (rule add_eq0_lemma [THEN ProdE]) 

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apply (rule_tac [3] EqI) 

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apply (tactic "typechk_tac []") 

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done 

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(*Here is a lemma to infer ab=0 and ba=0 from ab=0, below. *) 

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lemma absdiff_eq0_lem: 

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"[ a:N; b:N; a  b = 0 : N ] ==> 

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?a : SUM v: Eq(N, ab, 0) . Eq(N, ba, 0)" 

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apply (unfold absdiff_def) 

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apply (tactic "intr_tac []") 

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apply (tactic eqintr_tac) 

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apply (rule_tac [2] add_eq0) 

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apply (rule add_eq0) 

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apply (rule_tac [6] add_commute [THEN trans_elem]) 

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apply (tactic {* typechk_tac [thm "diff_typing"] *}) 

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done 

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(*if a  b = 0 then a = b 

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proof: ab=0 and ba=0, so b = a+(ba) = a+0 = a*) 

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lemma absdiff_eq0: "[ a  b = 0 : N; a:N; b:N ] ==> a = b : N" 

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apply (rule EqE) 

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apply (rule absdiff_eq0_lem [THEN SumE]) 

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apply (tactic "TRYALL assume_tac") 

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apply (tactic eqintr_tac) 

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apply (rule add_diff_inverse [THEN sym_elem, THEN trans_elem]) 

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apply (rule_tac [3] EqE, tactic "assume_tac 3") 

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apply (tactic {* hyp_arith_rew_tac [thm "add_0_right"] *}) 

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done 

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subsection {* Remainder and Quotient *} 

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(*typing of remainder: short and long versions*) 

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lemma mod_typing: "[ a:N; b:N ] ==> a mod b : N" 

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apply (unfold mod_def) 

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apply (tactic {* typechk_tac [thm "absdiff_typing"] *}) 

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done 

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lemma mod_typingL: "[ a=c:N; b=d:N ] ==> a mod b = c mod d : N" 

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apply (unfold mod_def) 

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apply (tactic {* equal_tac [thm "absdiff_typingL"] *}) 

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done 

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(*computation for mod : 0 and successor cases*) 

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lemma modC0: "b:N ==> 0 mod b = 0 : N" 

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apply (unfold mod_def) 

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apply (tactic {* rew_tac [thm "absdiff_typing"] *}) 

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done 

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lemma modC_succ: 

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"[ a:N; b:N ] ==> succ(a) mod b = rec(succ(a mod b)  b, 0, %x y. succ(a mod b)) : N" 

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apply (unfold mod_def) 

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apply (tactic {* rew_tac [thm "absdiff_typing"] *}) 

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done 

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(*typing of quotient: short and long versions*) 

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lemma div_typing: "[ a:N; b:N ] ==> a div b : N" 

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apply (unfold div_def) 

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apply (tactic {* typechk_tac [thm "absdiff_typing", thm "mod_typing"] *}) 

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done 

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lemma div_typingL: "[ a=c:N; b=d:N ] ==> a div b = c div d : N" 

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apply (unfold div_def) 

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apply (tactic {* equal_tac [thm "absdiff_typingL", thm "mod_typingL"] *}) 

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done 

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lemmas div_typing_rls = mod_typing div_typing absdiff_typing 

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(*computation for quotient: 0 and successor cases*) 

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lemma divC0: "b:N ==> 0 div b = 0 : N" 

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apply (unfold div_def) 

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apply (tactic {* rew_tac [thm "mod_typing", thm "absdiff_typing"] *}) 

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done 

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lemma divC_succ: 

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"[ a:N; b:N ] ==> succ(a) div b = 

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rec(succ(a) mod b, succ(a div b), %x y. a div b) : N" 

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apply (unfold div_def) 

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apply (tactic {* rew_tac [thm "mod_typing"] *}) 

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done 

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(*Version of above with same condition as the mod one*) 

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lemma divC_succ2: "[ a:N; b:N ] ==> 

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succ(a) div b =rec(succ(a mod b)  b, succ(a div b), %x y. a div b) : N" 

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apply (rule divC_succ [THEN trans_elem]) 

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apply (tactic {* rew_tac (thms "div_typing_rls" @ [thm "modC_succ"]) *}) 

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apply (tactic {* NE_tac "succ (a mod b) b" 1 *}) 

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apply (tactic {* rew_tac [thm "mod_typing", thm "div_typing", thm "absdiff_typing"] *}) 

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done 

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(*for case analysis on whether a number is 0 or a successor*) 

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lemma iszero_decidable: "a:N ==> rec(a, inl(eq), %ka kb. inr(<ka, eq>)) : 

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Eq(N,a,0) + (SUM x:N. Eq(N,a, succ(x)))" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (rule_tac [3] PlusI_inr) 

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apply (rule_tac [2] PlusI_inl) 

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apply (tactic eqintr_tac) 

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apply (tactic "equal_tac []") 

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done 

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(*Main Result. Holds when b is 0 since a mod 0 = a and a div 0 = 0 *) 

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lemma mod_div_equality: "[ a:N; b:N ] ==> a mod b #+ (a div b) #* b = a : N" 

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apply (tactic {* NE_tac "a" 1 *}) 

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apply (tactic {* arith_rew_tac (thms "div_typing_rls" @ 

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[thm "modC0", thm "modC_succ", thm "divC0", thm "divC_succ2"]) *}) 

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apply (rule EqE) 

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(*case analysis on succ(u mod b)b *) 

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apply (rule_tac a1 = "succ (u mod b)  b" in iszero_decidable [THEN PlusE]) 

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apply (erule_tac [3] SumE) 

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apply (tactic {* hyp_arith_rew_tac (thms "div_typing_rls" @ 

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[thm "modC0", thm "modC_succ", thm "divC0", thm "divC_succ2"]) *}) 

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(*Replace one occurence of b by succ(u mod b). Clumsy!*) 

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apply (rule add_typingL [THEN trans_elem]) 

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apply (erule EqE [THEN absdiff_eq0, THEN sym_elem]) 

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apply (rule_tac [3] refl_elem) 

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apply (tactic {* hyp_arith_rew_tac (thms "div_typing_rls") *}) 

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done 

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end 