| author | haftmann |
| Fri, 01 Jun 2007 10:44:26 +0200 | |
| changeset 23181 | f52b555f8141 |
| parent 23162 | b9853c187a1e |
| child 23684 | 8c508c4dc53b |
| permissions | -rw-r--r-- |
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(* Title: HOL/Divides.thy |
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ID: $Id$ |
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Author: Lawrence C Paulson, Cambridge University Computer Laboratory |
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Copyright 1999 University of Cambridge |
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*) |
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header {* The division operators div, mod and the divides relation "dvd" *}
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theory Divides |
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imports Datatype Power |
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uses "~~/src/Provers/Arith/cancel_div_mod.ML" |
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begin |
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(*We use the same class for div and mod; |
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moreover, dvd is defined whenever multiplication is*) |
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class div = type + |
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fixes div :: "'a \<Rightarrow> 'a \<Rightarrow> 'a" |
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fixes mod :: "'a \<Rightarrow> 'a \<Rightarrow> 'a" |
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begin |
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||
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notation |
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div (infixl "\<^loc>div" 70) |
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||
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notation |
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mod (infixl "\<^loc>mod" 70) |
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||
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end |
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notation |
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div (infixl "div" 70) |
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||
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notation |
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mod (infixl "mod" 70) |
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||
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instance nat :: Divides.div |
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div_def: "m div n == wfrec (pred_nat^+) |
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(%f j. if j<n | n=0 then 0 else Suc (f (j-n))) m" |
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mod_def: "m mod n == wfrec (pred_nat^+) |
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(%f j. if j<n | n=0 then j else f (j-n)) m" .. |
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definition |
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(*The definition of dvd is polymorphic!*) |
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dvd :: "'a::times \<Rightarrow> 'a \<Rightarrow> bool" (infixl "dvd" 50) where |
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dvd_def: "m dvd n \<longleftrightarrow> (\<exists>k. n = m*k)" |
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definition |
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quorem :: "(nat*nat) * (nat*nat) => bool" where |
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(*This definition helps prove the harder properties of div and mod. |
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It is copied from IntDiv.thy; should it be overloaded?*) |
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"quorem = (%((a,b), (q,r)). |
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a = b*q + r & |
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(if 0<b then 0\<le>r & r<b else b<r & r \<le>0))" |
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subsection{*Initial Lemmas*}
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lemmas wf_less_trans = |
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def_wfrec [THEN trans, OF eq_reflection wf_pred_nat [THEN wf_trancl], |
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standard] |
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lemma mod_eq: "(%m. m mod n) = |
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wfrec (pred_nat^+) (%f j. if j<n | n=0 then j else f (j-n))" |
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by (simp add: mod_def) |
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lemma div_eq: "(%m. m div n) = wfrec (pred_nat^+) |
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(%f j. if j<n | n=0 then 0 else Suc (f (j-n)))" |
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by (simp add: div_def) |
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(** Aribtrary definitions for division by zero. Useful to simplify |
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certain equations **) |
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lemma DIVISION_BY_ZERO_DIV [simp]: "a div 0 = (0::nat)" |
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by (rule div_eq [THEN wf_less_trans], simp) |
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lemma DIVISION_BY_ZERO_MOD [simp]: "a mod 0 = (a::nat)" |
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by (rule mod_eq [THEN wf_less_trans], simp) |
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subsection{*Remainder*}
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lemma mod_less [simp]: "m<n ==> m mod n = (m::nat)" |
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by (rule mod_eq [THEN wf_less_trans]) simp |
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lemma mod_geq: "~ m < (n::nat) ==> m mod n = (m-n) mod n" |
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apply (cases "n=0") |
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apply simp |
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apply (rule mod_eq [THEN wf_less_trans]) |
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apply (simp add: cut_apply less_eq) |
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done |
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(*Avoids the ugly ~m<n above*) |
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lemma le_mod_geq: "(n::nat) \<le> m ==> m mod n = (m-n) mod n" |
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by (simp add: mod_geq linorder_not_less) |
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lemma mod_if: "m mod (n::nat) = (if m<n then m else (m-n) mod n)" |
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by (simp add: mod_geq) |
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lemma mod_1 [simp]: "m mod Suc 0 = 0" |
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by (induct m) (simp_all add: mod_geq) |
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lemma mod_self [simp]: "n mod n = (0::nat)" |
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by (cases "n = 0") (simp_all add: mod_geq) |
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lemma mod_add_self2 [simp]: "(m+n) mod n = m mod (n::nat)" |
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apply (subgoal_tac "(n + m) mod n = (n+m-n) mod n") |
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apply (simp add: add_commute) |
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apply (subst mod_geq [symmetric], simp_all) |
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done |
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lemma mod_add_self1 [simp]: "(n+m) mod n = m mod (n::nat)" |
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by (simp add: add_commute mod_add_self2) |
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lemma mod_mult_self1 [simp]: "(m + k*n) mod n = m mod (n::nat)" |
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by (induct k) (simp_all add: add_left_commute [of _ n]) |
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lemma mod_mult_self2 [simp]: "(m + n*k) mod n = m mod (n::nat)" |
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by (simp add: mult_commute mod_mult_self1) |
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lemma mod_mult_distrib: "(m mod n) * (k::nat) = (m*k) mod (n*k)" |
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apply (cases "n = 0", simp) |
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apply (cases "k = 0", simp) |
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apply (induct m rule: nat_less_induct) |
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apply (subst mod_if, simp) |
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apply (simp add: mod_geq diff_mult_distrib) |
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done |
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lemma mod_mult_distrib2: "(k::nat) * (m mod n) = (k*m) mod (k*n)" |
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by (simp add: mult_commute [of k] mod_mult_distrib) |
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lemma mod_mult_self_is_0 [simp]: "(m*n) mod n = (0::nat)" |
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apply (cases "n = 0", simp) |
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apply (induct m, simp) |
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apply (rename_tac k) |
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apply (cut_tac m = "k * n" and n = n in mod_add_self2) |
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apply (simp add: add_commute) |
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done |
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lemma mod_mult_self1_is_0 [simp]: "(n*m) mod n = (0::nat)" |
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by (simp add: mult_commute mod_mult_self_is_0) |
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subsection{*Quotient*}
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lemma div_less [simp]: "m<n ==> m div n = (0::nat)" |
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by (rule div_eq [THEN wf_less_trans], simp) |
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lemma div_geq: "[| 0<n; ~m<n |] ==> m div n = Suc((m-n) div n)" |
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apply (rule div_eq [THEN wf_less_trans]) |
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apply (simp add: cut_apply less_eq) |
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done |
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(*Avoids the ugly ~m<n above*) |
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lemma le_div_geq: "[| 0<n; n\<le>m |] ==> m div n = Suc((m-n) div n)" |
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by (simp add: div_geq linorder_not_less) |
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lemma div_if: "0<n ==> m div n = (if m<n then 0 else Suc((m-n) div n))" |
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by (simp add: div_geq) |
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(*Main Result about quotient and remainder.*) |
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lemma mod_div_equality: "(m div n)*n + m mod n = (m::nat)" |
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apply (cases "n = 0", simp) |
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apply (induct m rule: nat_less_induct) |
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apply (subst mod_if) |
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apply (simp_all add: add_assoc div_geq add_diff_inverse) |
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done |
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lemma mod_div_equality2: "n * (m div n) + m mod n = (m::nat)" |
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apply (cut_tac m = m and n = n in mod_div_equality) |
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apply (simp add: mult_commute) |
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done |
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subsection{*Simproc for Cancelling Div and Mod*}
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lemma div_mod_equality: "((m div n)*n + m mod n) + k = (m::nat) + k" |
| 22718 | 178 |
by (simp add: mod_div_equality) |
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lemma div_mod_equality2: "(n*(m div n) + m mod n) + k = (m::nat) + k" |
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by (simp add: mod_div_equality2) |
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ML |
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{*
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structure CancelDivModData = |
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struct |
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val div_name = @{const_name Divides.div};
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val mod_name = @{const_name Divides.mod};
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val mk_binop = HOLogic.mk_binop; |
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val mk_sum = NatArithUtils.mk_sum; |
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val dest_sum = NatArithUtils.dest_sum; |
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(*logic*) |
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val div_mod_eqs = map mk_meta_eq [@{thm div_mod_equality}, @{thm div_mod_equality2}]
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val trans = trans |
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val prove_eq_sums = |
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let val simps = @{thm add_0} :: @{thm add_0_right} :: @{thms add_ac}
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in NatArithUtils.prove_conv all_tac (NatArithUtils.simp_all_tac simps) end; |
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end; |
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205 |
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structure CancelDivMod = CancelDivModFun(CancelDivModData); |
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val cancel_div_mod_proc = NatArithUtils.prep_simproc |
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("cancel_div_mod", ["(m::nat) + n"], K CancelDivMod.proc);
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Addsimprocs[cancel_div_mod_proc]; |
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*} |
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(* a simple rearrangement of mod_div_equality: *) |
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lemma mult_div_cancel: "(n::nat) * (m div n) = m - (m mod n)" |
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by (cut_tac m = m and n = n in mod_div_equality2, arith) |
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lemma mod_less_divisor [simp]: "0<n ==> m mod n < (n::nat)" |
| 22718 | 220 |
apply (induct m rule: nat_less_induct) |
221 |
apply (rename_tac m) |
|
222 |
apply (case_tac "m<n", simp) |
|
223 |
txt{*case @{term "n \<le> m"}*}
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|
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apply (simp add: mod_geq) |
|
225 |
done |
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| 15439 | 226 |
|
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lemma mod_le_divisor[simp]: "0 < n \<Longrightarrow> m mod n \<le> (n::nat)" |
|
| 22718 | 228 |
apply (drule mod_less_divisor [where m = m]) |
229 |
apply simp |
|
230 |
done |
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lemma div_mult_self_is_m [simp]: "0<n ==> (m*n) div n = (m::nat)" |
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by (cut_tac m = "m*n" and n = n in mod_div_equality, auto) |
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lemma div_mult_self1_is_m [simp]: "0<n ==> (n*m) div n = (m::nat)" |
| 22718 | 236 |
by (simp add: mult_commute div_mult_self_is_m) |
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(*mod_mult_distrib2 above is the counterpart for remainder*) |
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241 |
subsection{*Proving facts about Quotient and Remainder*}
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lemma unique_quotient_lemma: |
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"[| b*q' + r' \<le> b*q + r; x < b; r < b |] |
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==> q' \<le> (q::nat)" |
| 22718 | 246 |
apply (rule leI) |
247 |
apply (subst less_iff_Suc_add) |
|
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apply (auto simp add: add_mult_distrib2) |
|
249 |
done |
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lemma unique_quotient: |
| 22718 | 252 |
"[| quorem ((a,b), (q,r)); quorem ((a,b), (q',r')); 0 < b |] |
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==> q = q'" |
| 22718 | 254 |
apply (simp add: split_ifs quorem_def) |
255 |
apply (blast intro: order_antisym |
|
256 |
dest: order_eq_refl [THEN unique_quotient_lemma] sym) |
|
257 |
done |
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lemma unique_remainder: |
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"[| quorem ((a,b), (q,r)); quorem ((a,b), (q',r')); 0 < b |] |
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261 |
==> r = r'" |
| 22718 | 262 |
apply (subgoal_tac "q = q'") |
263 |
prefer 2 apply (blast intro: unique_quotient) |
|
264 |
apply (simp add: quorem_def) |
|
265 |
done |
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lemma quorem_div_mod: "0 < b ==> quorem ((a, b), (a div b, a mod b))" |
| 22718 | 268 |
unfolding quorem_def by simp |
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lemma quorem_div: "[| quorem((a,b),(q,r)); 0 < b |] ==> a div b = q" |
| 22718 | 271 |
by (simp add: quorem_div_mod [THEN unique_quotient]) |
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273 |
lemma quorem_mod: "[| quorem((a,b),(q,r)); 0 < b |] ==> a mod b = r" |
| 22718 | 274 |
by (simp add: quorem_div_mod [THEN unique_remainder]) |
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(** A dividend of zero **) |
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lemma div_0 [simp]: "0 div m = (0::nat)" |
| 22718 | 279 |
by (cases "m = 0") simp_all |
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281 |
lemma mod_0 [simp]: "0 mod m = (0::nat)" |
| 22718 | 282 |
by (cases "m = 0") simp_all |
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(** proving (a*b) div c = a * (b div c) + a * (b mod c) **) |
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285 |
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lemma quorem_mult1_eq: |
| 22718 | 287 |
"[| quorem((b,c),(q,r)); 0 < c |] |
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288 |
==> quorem ((a*b, c), (a*q + a*r div c, a*r mod c))" |
| 22718 | 289 |
by (auto simp add: split_ifs mult_ac quorem_def add_mult_distrib2) |
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291 |
lemma div_mult1_eq: "(a*b) div c = a*(b div c) + a*(b mod c) div (c::nat)" |
| 22718 | 292 |
apply (cases "c = 0", simp) |
293 |
apply (blast intro: quorem_div_mod [THEN quorem_mult1_eq, THEN quorem_div]) |
|
294 |
done |
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296 |
lemma mod_mult1_eq: "(a*b) mod c = a*(b mod c) mod (c::nat)" |
| 22718 | 297 |
apply (cases "c = 0", simp) |
298 |
apply (blast intro: quorem_div_mod [THEN quorem_mult1_eq, THEN quorem_mod]) |
|
299 |
done |
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300 |
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301 |
lemma mod_mult1_eq': "(a*b) mod (c::nat) = ((a mod c) * b) mod c" |
| 22718 | 302 |
apply (rule trans) |
303 |
apply (rule_tac s = "b*a mod c" in trans) |
|
304 |
apply (rule_tac [2] mod_mult1_eq) |
|
305 |
apply (simp_all add: mult_commute) |
|
306 |
done |
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307 |
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308 |
lemma mod_mult_distrib_mod: "(a*b) mod (c::nat) = ((a mod c) * (b mod c)) mod c" |
| 22718 | 309 |
apply (rule mod_mult1_eq' [THEN trans]) |
310 |
apply (rule mod_mult1_eq) |
|
311 |
done |
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312 |
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(** proving (a+b) div c = a div c + b div c + ((a mod c + b mod c) div c) **) |
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314 |
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315 |
lemma quorem_add1_eq: |
| 22718 | 316 |
"[| quorem((a,c),(aq,ar)); quorem((b,c),(bq,br)); 0 < c |] |
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317 |
==> quorem ((a+b, c), (aq + bq + (ar+br) div c, (ar+br) mod c))" |
| 22718 | 318 |
by (auto simp add: split_ifs mult_ac quorem_def add_mult_distrib2) |
|
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changeset
|
319 |
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
320 |
(*NOT suitable for rewriting: the RHS has an instance of the LHS*) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
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parents:
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diff
changeset
|
321 |
lemma div_add1_eq: |
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
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parents:
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diff
changeset
|
322 |
"(a+b) div (c::nat) = a div c + b div c + ((a mod c + b mod c) div c)" |
| 22718 | 323 |
apply (cases "c = 0", simp) |
324 |
apply (blast intro: quorem_add1_eq [THEN quorem_div] quorem_div_mod quorem_div_mod) |
|
325 |
done |
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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diff
changeset
|
326 |
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
327 |
lemma mod_add1_eq: "(a+b) mod (c::nat) = (a mod c + b mod c) mod c" |
| 22718 | 328 |
apply (cases "c = 0", simp) |
329 |
apply (blast intro: quorem_div_mod quorem_div_mod quorem_add1_eq [THEN quorem_mod]) |
|
330 |
done |
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
331 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
332 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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diff
changeset
|
333 |
subsection{*Proving @{term "a div (b*c) = (a div b) div c"}*}
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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changeset
|
334 |
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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changeset
|
335 |
(** first, a lemma to bound the remainder **) |
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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changeset
|
336 |
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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diff
changeset
|
337 |
lemma mod_lemma: "[| (0::nat) < c; r < b |] ==> b * (q mod c) + r < b * c" |
| 22718 | 338 |
apply (cut_tac m = q and n = c in mod_less_divisor) |
339 |
apply (drule_tac [2] m = "q mod c" in less_imp_Suc_add, auto) |
|
340 |
apply (erule_tac P = "%x. ?lhs < ?rhs x" in ssubst) |
|
341 |
apply (simp add: add_mult_distrib2) |
|
342 |
done |
|
|
10559
d3fd54fc659b
many new div and mod properties (borrowed from Integ/IntDiv)
paulson
parents:
10214
diff
changeset
|
343 |
|
| 22718 | 344 |
lemma quorem_mult2_eq: "[| quorem ((a,b), (q,r)); 0 < b; 0 < c |] |
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
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changeset
|
345 |
==> quorem ((a, b*c), (q div c, b*(q mod c) + r))" |
| 22718 | 346 |
by (auto simp add: mult_ac quorem_def add_mult_distrib2 [symmetric] mod_lemma) |
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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changeset
|
347 |
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
348 |
lemma div_mult2_eq: "a div (b*c) = (a div b) div (c::nat)" |
| 22718 | 349 |
apply (cases "b = 0", simp) |
350 |
apply (cases "c = 0", simp) |
|
351 |
apply (force simp add: quorem_div_mod [THEN quorem_mult2_eq, THEN quorem_div]) |
|
352 |
done |
|
|
14267
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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diff
changeset
|
353 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
354 |
lemma mod_mult2_eq: "a mod (b*c) = b*(a div b mod c) + a mod (b::nat)" |
| 22718 | 355 |
apply (cases "b = 0", simp) |
356 |
apply (cases "c = 0", simp) |
|
357 |
apply (auto simp add: mult_commute quorem_div_mod [THEN quorem_mult2_eq, THEN quorem_mod]) |
|
358 |
done |
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
359 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
360 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
361 |
subsection{*Cancellation of Common Factors in Division*}
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
362 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
363 |
lemma div_mult_mult_lemma: |
| 22718 | 364 |
"[| (0::nat) < b; 0 < c |] ==> (c*a) div (c*b) = a div b" |
365 |
by (auto simp add: div_mult2_eq) |
|
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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diff
changeset
|
366 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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diff
changeset
|
367 |
lemma div_mult_mult1 [simp]: "(0::nat) < c ==> (c*a) div (c*b) = a div b" |
| 22718 | 368 |
apply (cases "b = 0") |
369 |
apply (auto simp add: linorder_neq_iff [of b] div_mult_mult_lemma) |
|
370 |
done |
|
|
14267
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
371 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
372 |
lemma div_mult_mult2 [simp]: "(0::nat) < c ==> (a*c) div (b*c) = a div b" |
| 22718 | 373 |
apply (drule div_mult_mult1) |
374 |
apply (auto simp add: mult_commute) |
|
375 |
done |
|
|
14267
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
376 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
377 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
378 |
subsection{*Further Facts about Quotient and Remainder*}
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
379 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
380 |
lemma div_1 [simp]: "m div Suc 0 = m" |
| 22718 | 381 |
by (induct m) (simp_all add: div_geq) |
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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diff
changeset
|
382 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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diff
changeset
|
383 |
lemma div_self [simp]: "0<n ==> n div n = (1::nat)" |
| 22718 | 384 |
by (simp add: div_geq) |
|
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
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diff
changeset
|
385 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
386 |
lemma div_add_self2: "0<n ==> (m+n) div n = Suc (m div n)" |
| 22718 | 387 |
apply (subgoal_tac "(n + m) div n = Suc ((n+m-n) div n) ") |
388 |
apply (simp add: add_commute) |
|
389 |
apply (subst div_geq [symmetric], simp_all) |
|
390 |
done |
|
|
14267
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
391 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
392 |
lemma div_add_self1: "0<n ==> (n+m) div n = Suc (m div n)" |
| 22718 | 393 |
by (simp add: add_commute div_add_self2) |
|
14267
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
394 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
395 |
lemma div_mult_self1 [simp]: "!!n::nat. 0<n ==> (m + k*n) div n = k + m div n" |
| 22718 | 396 |
apply (subst div_add1_eq) |
397 |
apply (subst div_mult1_eq, simp) |
|
398 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
399 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
400 |
lemma div_mult_self2 [simp]: "0<n ==> (m + n*k) div n = k + m div (n::nat)" |
| 22718 | 401 |
by (simp add: mult_commute div_mult_self1) |
|
14267
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
402 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
403 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
404 |
(* Monotonicity of div in first argument *) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
405 |
lemma div_le_mono [rule_format (no_asm)]: |
| 22718 | 406 |
"\<forall>m::nat. m \<le> n --> (m div k) \<le> (n div k)" |
|
14267
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
407 |
apply (case_tac "k=0", simp) |
| 15251 | 408 |
apply (induct "n" rule: nat_less_induct, clarify) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
409 |
apply (case_tac "n<k") |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
410 |
(* 1 case n<k *) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
411 |
apply simp |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
412 |
(* 2 case n >= k *) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
413 |
apply (case_tac "m<k") |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
414 |
(* 2.1 case m<k *) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
415 |
apply simp |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
416 |
(* 2.2 case m>=k *) |
| 15439 | 417 |
apply (simp add: div_geq diff_le_mono) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
418 |
done |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
419 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
420 |
(* Antimonotonicity of div in second argument *) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
421 |
lemma div_le_mono2: "!!m::nat. [| 0<m; m\<le>n |] ==> (k div n) \<le> (k div m)" |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
422 |
apply (subgoal_tac "0<n") |
| 22718 | 423 |
prefer 2 apply simp |
| 15251 | 424 |
apply (induct_tac k rule: nat_less_induct) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
425 |
apply (rename_tac "k") |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
426 |
apply (case_tac "k<n", simp) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
427 |
apply (subgoal_tac "~ (k<m) ") |
| 22718 | 428 |
prefer 2 apply simp |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
429 |
apply (simp add: div_geq) |
| 15251 | 430 |
apply (subgoal_tac "(k-n) div n \<le> (k-m) div n") |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
431 |
prefer 2 |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
432 |
apply (blast intro: div_le_mono diff_le_mono2) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
433 |
apply (rule le_trans, simp) |
| 15439 | 434 |
apply (simp) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
435 |
done |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
436 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
437 |
lemma div_le_dividend [simp]: "m div n \<le> (m::nat)" |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
438 |
apply (case_tac "n=0", simp) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
439 |
apply (subgoal_tac "m div n \<le> m div 1", simp) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
440 |
apply (rule div_le_mono2) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
441 |
apply (simp_all (no_asm_simp)) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
442 |
done |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
443 |
|
| 22718 | 444 |
(* Similar for "less than" *) |
| 17085 | 445 |
lemma div_less_dividend [rule_format]: |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
446 |
"!!n::nat. 1<n ==> 0 < m --> m div n < m" |
| 15251 | 447 |
apply (induct_tac m rule: nat_less_induct) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
448 |
apply (rename_tac "m") |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
449 |
apply (case_tac "m<n", simp) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
450 |
apply (subgoal_tac "0<n") |
| 22718 | 451 |
prefer 2 apply simp |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
452 |
apply (simp add: div_geq) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
453 |
apply (case_tac "n<m") |
| 15251 | 454 |
apply (subgoal_tac "(m-n) div n < (m-n) ") |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
455 |
apply (rule impI less_trans_Suc)+ |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
456 |
apply assumption |
| 15439 | 457 |
apply (simp_all) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
458 |
done |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
459 |
|
| 17085 | 460 |
declare div_less_dividend [simp] |
461 |
||
|
14267
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More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
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14208
diff
changeset
|
462 |
text{*A fact for the mutilated chess board*}
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
463 |
lemma mod_Suc: "Suc(m) mod n = (if Suc(m mod n) = n then 0 else Suc(m mod n))" |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
464 |
apply (case_tac "n=0", simp) |
| 15251 | 465 |
apply (induct "m" rule: nat_less_induct) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
466 |
apply (case_tac "Suc (na) <n") |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
467 |
(* case Suc(na) < n *) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
468 |
apply (frule lessI [THEN less_trans], simp add: less_not_refl3) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
469 |
(* case n \<le> Suc(na) *) |
| 16796 | 470 |
apply (simp add: linorder_not_less le_Suc_eq mod_geq) |
| 15439 | 471 |
apply (auto simp add: Suc_diff_le le_mod_geq) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
472 |
done |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
473 |
|
| 14437 | 474 |
lemma nat_mod_div_trivial [simp]: "m mod n div n = (0 :: nat)" |
| 22718 | 475 |
by (cases "n = 0") auto |
| 14437 | 476 |
|
477 |
lemma nat_mod_mod_trivial [simp]: "m mod n mod n = (m mod n :: nat)" |
|
| 22718 | 478 |
by (cases "n = 0") auto |
| 14437 | 479 |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
480 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
481 |
subsection{*The Divides Relation*}
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
482 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
483 |
lemma dvdI [intro?]: "n = m * k ==> m dvd n" |
| 22718 | 484 |
unfolding dvd_def by blast |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
485 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
486 |
lemma dvdE [elim?]: "!!P. [|m dvd n; !!k. n = m*k ==> P|] ==> P" |
| 22718 | 487 |
unfolding dvd_def by blast |
| 13152 | 488 |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
489 |
lemma dvd_0_right [iff]: "m dvd (0::nat)" |
| 22718 | 490 |
unfolding dvd_def by (blast intro: mult_0_right [symmetric]) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
491 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
492 |
lemma dvd_0_left: "0 dvd m ==> m = (0::nat)" |
| 22718 | 493 |
by (force simp add: dvd_def) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
494 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
495 |
lemma dvd_0_left_iff [iff]: "(0 dvd (m::nat)) = (m = 0)" |
| 22718 | 496 |
by (blast intro: dvd_0_left) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
497 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
498 |
lemma dvd_1_left [iff]: "Suc 0 dvd k" |
| 22718 | 499 |
unfolding dvd_def by simp |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
500 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
501 |
lemma dvd_1_iff_1 [simp]: "(m dvd Suc 0) = (m = Suc 0)" |
| 22718 | 502 |
by (simp add: dvd_def) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
503 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
504 |
lemma dvd_refl [simp]: "m dvd (m::nat)" |
| 22718 | 505 |
unfolding dvd_def by (blast intro: mult_1_right [symmetric]) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
506 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
507 |
lemma dvd_trans [trans]: "[| m dvd n; n dvd p |] ==> m dvd (p::nat)" |
| 22718 | 508 |
unfolding dvd_def by (blast intro: mult_assoc) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
509 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
510 |
lemma dvd_anti_sym: "[| m dvd n; n dvd m |] ==> m = (n::nat)" |
| 22718 | 511 |
unfolding dvd_def |
512 |
by (force dest: mult_eq_self_implies_10 simp add: mult_assoc mult_eq_1_iff) |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
513 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
514 |
lemma dvd_add: "[| k dvd m; k dvd n |] ==> k dvd (m+n :: nat)" |
| 22718 | 515 |
unfolding dvd_def |
516 |
by (blast intro: add_mult_distrib2 [symmetric]) |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
517 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
518 |
lemma dvd_diff: "[| k dvd m; k dvd n |] ==> k dvd (m-n :: nat)" |
| 22718 | 519 |
unfolding dvd_def |
520 |
by (blast intro: diff_mult_distrib2 [symmetric]) |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
521 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
522 |
lemma dvd_diffD: "[| k dvd m-n; k dvd n; n\<le>m |] ==> k dvd (m::nat)" |
| 22718 | 523 |
apply (erule linorder_not_less [THEN iffD2, THEN add_diff_inverse, THEN subst]) |
524 |
apply (blast intro: dvd_add) |
|
525 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
526 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
527 |
lemma dvd_diffD1: "[| k dvd m-n; k dvd m; n\<le>m |] ==> k dvd (n::nat)" |
| 22718 | 528 |
by (drule_tac m = m in dvd_diff, auto) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
529 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
530 |
lemma dvd_mult: "k dvd n ==> k dvd (m*n :: nat)" |
| 22718 | 531 |
unfolding dvd_def by (blast intro: mult_left_commute) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
532 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
533 |
lemma dvd_mult2: "k dvd m ==> k dvd (m*n :: nat)" |
| 22718 | 534 |
apply (subst mult_commute) |
535 |
apply (erule dvd_mult) |
|
536 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
537 |
|
|
17084
fb0a80aef0be
classical rules must have names for ATP integration
paulson
parents:
16796
diff
changeset
|
538 |
lemma dvd_triv_right [iff]: "k dvd (m*k :: nat)" |
| 22718 | 539 |
by (rule dvd_refl [THEN dvd_mult]) |
|
17084
fb0a80aef0be
classical rules must have names for ATP integration
paulson
parents:
16796
diff
changeset
|
540 |
|
|
fb0a80aef0be
classical rules must have names for ATP integration
paulson
parents:
16796
diff
changeset
|
541 |
lemma dvd_triv_left [iff]: "k dvd (k*m :: nat)" |
| 22718 | 542 |
by (rule dvd_refl [THEN dvd_mult2]) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
543 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
544 |
lemma dvd_reduce: "(k dvd n + k) = (k dvd (n::nat))" |
| 22718 | 545 |
apply (rule iffI) |
546 |
apply (erule_tac [2] dvd_add) |
|
547 |
apply (rule_tac [2] dvd_refl) |
|
548 |
apply (subgoal_tac "n = (n+k) -k") |
|
549 |
prefer 2 apply simp |
|
550 |
apply (erule ssubst) |
|
551 |
apply (erule dvd_diff) |
|
552 |
apply (rule dvd_refl) |
|
553 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
554 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
555 |
lemma dvd_mod: "!!n::nat. [| f dvd m; f dvd n |] ==> f dvd m mod n" |
| 22718 | 556 |
unfolding dvd_def |
557 |
apply (case_tac "n = 0", auto) |
|
558 |
apply (blast intro: mod_mult_distrib2 [symmetric]) |
|
559 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
560 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
561 |
lemma dvd_mod_imp_dvd: "[| (k::nat) dvd m mod n; k dvd n |] ==> k dvd m" |
| 22718 | 562 |
apply (subgoal_tac "k dvd (m div n) *n + m mod n") |
563 |
apply (simp add: mod_div_equality) |
|
564 |
apply (simp only: dvd_add dvd_mult) |
|
565 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
566 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
567 |
lemma dvd_mod_iff: "k dvd n ==> ((k::nat) dvd m mod n) = (k dvd m)" |
| 22718 | 568 |
by (blast intro: dvd_mod_imp_dvd dvd_mod) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
569 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
570 |
lemma dvd_mult_cancel: "!!k::nat. [| k*m dvd k*n; 0<k |] ==> m dvd n" |
| 22718 | 571 |
unfolding dvd_def |
572 |
apply (erule exE) |
|
573 |
apply (simp add: mult_ac) |
|
574 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
575 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
576 |
lemma dvd_mult_cancel1: "0<m ==> (m*n dvd m) = (n = (1::nat))" |
| 22718 | 577 |
apply auto |
578 |
apply (subgoal_tac "m*n dvd m*1") |
|
579 |
apply (drule dvd_mult_cancel, auto) |
|
580 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
581 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
582 |
lemma dvd_mult_cancel2: "0<m ==> (n*m dvd m) = (n = (1::nat))" |
| 22718 | 583 |
apply (subst mult_commute) |
584 |
apply (erule dvd_mult_cancel1) |
|
585 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
586 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
587 |
lemma mult_dvd_mono: "[| i dvd m; j dvd n|] ==> i*j dvd (m*n :: nat)" |
| 22718 | 588 |
apply (unfold dvd_def, clarify) |
589 |
apply (rule_tac x = "k*ka" in exI) |
|
590 |
apply (simp add: mult_ac) |
|
591 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
592 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
593 |
lemma dvd_mult_left: "(i*j :: nat) dvd k ==> i dvd k" |
| 22718 | 594 |
by (simp add: dvd_def mult_assoc, blast) |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
595 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
596 |
lemma dvd_mult_right: "(i*j :: nat) dvd k ==> j dvd k" |
| 22718 | 597 |
apply (unfold dvd_def, clarify) |
598 |
apply (rule_tac x = "i*k" in exI) |
|
599 |
apply (simp add: mult_ac) |
|
600 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
601 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
602 |
lemma dvd_imp_le: "[| k dvd n; 0 < n |] ==> k \<le> (n::nat)" |
| 22718 | 603 |
apply (unfold dvd_def, clarify) |
604 |
apply (simp_all (no_asm_use) add: zero_less_mult_iff) |
|
605 |
apply (erule conjE) |
|
606 |
apply (rule le_trans) |
|
607 |
apply (rule_tac [2] le_refl [THEN mult_le_mono]) |
|
608 |
apply (erule_tac [2] Suc_leI, simp) |
|
609 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
610 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
611 |
lemma dvd_eq_mod_eq_0: "!!k::nat. (k dvd n) = (n mod k = 0)" |
| 22718 | 612 |
apply (unfold dvd_def) |
613 |
apply (case_tac "k=0", simp, safe) |
|
614 |
apply (simp add: mult_commute) |
|
615 |
apply (rule_tac t = n and n1 = k in mod_div_equality [THEN subst]) |
|
616 |
apply (subst mult_commute, simp) |
|
617 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
618 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
619 |
lemma dvd_mult_div_cancel: "n dvd m ==> n * (m div n) = (m::nat)" |
| 22718 | 620 |
apply (subgoal_tac "m mod n = 0") |
621 |
apply (simp add: mult_div_cancel) |
|
622 |
apply (simp only: dvd_eq_mod_eq_0) |
|
623 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
624 |
|
| 21408 | 625 |
lemma le_imp_power_dvd: "!!i::nat. m \<le> n ==> i^m dvd i^n" |
| 22718 | 626 |
apply (unfold dvd_def) |
627 |
apply (erule linorder_not_less [THEN iffD2, THEN add_diff_inverse, THEN subst]) |
|
628 |
apply (simp add: power_add) |
|
629 |
done |
|
| 21408 | 630 |
|
631 |
lemma nat_zero_less_power_iff [simp]: "(0 < x^n) = (x \<noteq> (0::nat) | n=0)" |
|
| 22718 | 632 |
by (induct n) auto |
| 21408 | 633 |
|
634 |
lemma power_le_dvd [rule_format]: "k^j dvd n --> i\<le>j --> k^i dvd (n::nat)" |
|
| 22718 | 635 |
apply (induct j) |
636 |
apply (simp_all add: le_Suc_eq) |
|
637 |
apply (blast dest!: dvd_mult_right) |
|
638 |
done |
|
| 21408 | 639 |
|
640 |
lemma power_dvd_imp_le: "[|i^m dvd i^n; (1::nat) < i|] ==> m \<le> n" |
|
| 22718 | 641 |
apply (rule power_le_imp_le_exp, assumption) |
642 |
apply (erule dvd_imp_le, simp) |
|
643 |
done |
|
| 21408 | 644 |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
645 |
lemma mod_eq_0_iff: "(m mod d = 0) = (\<exists>q::nat. m = d*q)" |
| 22718 | 646 |
by (auto simp add: dvd_eq_mod_eq_0 [symmetric] dvd_def) |
|
17084
fb0a80aef0be
classical rules must have names for ATP integration
paulson
parents:
16796
diff
changeset
|
647 |
|
| 22718 | 648 |
lemmas mod_eq_0D [dest!] = mod_eq_0_iff [THEN iffD1] |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
649 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
650 |
(*Loses information, namely we also have r<d provided d is nonzero*) |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
651 |
lemma mod_eqD: "(m mod d = r) ==> \<exists>q::nat. m = r + q*d" |
| 22718 | 652 |
apply (cut_tac m = m in mod_div_equality) |
653 |
apply (simp only: add_ac) |
|
654 |
apply (blast intro: sym) |
|
655 |
done |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
656 |
|
| 14131 | 657 |
|
| 13152 | 658 |
lemma split_div: |
|
13189
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
659 |
"P(n div k :: nat) = |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
660 |
((k = 0 \<longrightarrow> P 0) \<and> (k \<noteq> 0 \<longrightarrow> (!i. !j<k. n = k*i + j \<longrightarrow> P i)))" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
661 |
(is "?P = ?Q" is "_ = (_ \<and> (_ \<longrightarrow> ?R))") |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
662 |
proof |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
663 |
assume P: ?P |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
664 |
show ?Q |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
665 |
proof (cases) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
666 |
assume "k = 0" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
667 |
with P show ?Q by(simp add:DIVISION_BY_ZERO_DIV) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
668 |
next |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
669 |
assume not0: "k \<noteq> 0" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
670 |
thus ?Q |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
671 |
proof (simp, intro allI impI) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
672 |
fix i j |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
673 |
assume n: "n = k*i + j" and j: "j < k" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
674 |
show "P i" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
675 |
proof (cases) |
| 22718 | 676 |
assume "i = 0" |
677 |
with n j P show "P i" by simp |
|
|
13189
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
678 |
next |
| 22718 | 679 |
assume "i \<noteq> 0" |
680 |
with not0 n j P show "P i" by(simp add:add_ac) |
|
|
13189
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
681 |
qed |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
682 |
qed |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
683 |
qed |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
684 |
next |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
685 |
assume Q: ?Q |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
686 |
show ?P |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
687 |
proof (cases) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
688 |
assume "k = 0" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
689 |
with Q show ?P by(simp add:DIVISION_BY_ZERO_DIV) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
690 |
next |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
691 |
assume not0: "k \<noteq> 0" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
692 |
with Q have R: ?R by simp |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
693 |
from not0 R[THEN spec,of "n div k",THEN spec, of "n mod k"] |
| 13517 | 694 |
show ?P by simp |
|
13189
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
695 |
qed |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
696 |
qed |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
697 |
|
| 13882 | 698 |
lemma split_div_lemma: |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
699 |
"0 < n \<Longrightarrow> (n * q \<le> m \<and> m < n * (Suc q)) = (q = ((m::nat) div n))" |
| 13882 | 700 |
apply (rule iffI) |
701 |
apply (rule_tac a=m and r = "m - n * q" and r' = "m mod n" in unique_quotient) |
|
|
16733
236dfafbeb63
linear arithmetic now takes "&" in assumptions apart.
nipkow
parents:
15439
diff
changeset
|
702 |
prefer 3; apply assumption |
|
20432
07ec57376051
lin_arith_prover: splitting reverted because of performance loss
webertj
parents:
20380
diff
changeset
|
703 |
apply (simp_all add: quorem_def) apply arith |
| 13882 | 704 |
apply (rule conjI) |
705 |
apply (rule_tac P="%x. n * (m div n) \<le> x" in |
|
706 |
subst [OF mod_div_equality [of _ n]]) |
|
707 |
apply (simp only: add: mult_ac) |
|
708 |
apply (rule_tac P="%x. x < n + n * (m div n)" in |
|
709 |
subst [OF mod_div_equality [of _ n]]) |
|
710 |
apply (simp only: add: mult_ac add_ac) |
|
| 14208 | 711 |
apply (rule add_less_mono1, simp) |
| 13882 | 712 |
done |
713 |
||
714 |
theorem split_div': |
|
715 |
"P ((m::nat) div n) = ((n = 0 \<and> P 0) \<or> |
|
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
716 |
(\<exists>q. (n * q \<le> m \<and> m < n * (Suc q)) \<and> P q))" |
| 13882 | 717 |
apply (case_tac "0 < n") |
718 |
apply (simp only: add: split_div_lemma) |
|
719 |
apply (simp_all add: DIVISION_BY_ZERO_DIV) |
|
720 |
done |
|
721 |
||
|
13189
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
722 |
lemma split_mod: |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
723 |
"P(n mod k :: nat) = |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
724 |
((k = 0 \<longrightarrow> P n) \<and> (k \<noteq> 0 \<longrightarrow> (!i. !j<k. n = k*i + j \<longrightarrow> P j)))" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
725 |
(is "?P = ?Q" is "_ = (_ \<and> (_ \<longrightarrow> ?R))") |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
726 |
proof |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
727 |
assume P: ?P |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
728 |
show ?Q |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
729 |
proof (cases) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
730 |
assume "k = 0" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
731 |
with P show ?Q by(simp add:DIVISION_BY_ZERO_MOD) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
732 |
next |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
733 |
assume not0: "k \<noteq> 0" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
734 |
thus ?Q |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
735 |
proof (simp, intro allI impI) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
736 |
fix i j |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
737 |
assume "n = k*i + j" "j < k" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
738 |
thus "P j" using not0 P by(simp add:add_ac mult_ac) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
739 |
qed |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
740 |
qed |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
741 |
next |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
742 |
assume Q: ?Q |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
743 |
show ?P |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
744 |
proof (cases) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
745 |
assume "k = 0" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
746 |
with Q show ?P by(simp add:DIVISION_BY_ZERO_MOD) |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
747 |
next |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
748 |
assume not0: "k \<noteq> 0" |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
749 |
with Q have R: ?R by simp |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
750 |
from not0 R[THEN spec,of "n div k",THEN spec, of "n mod k"] |
| 13517 | 751 |
show ?P by simp |
|
13189
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
752 |
qed |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
753 |
qed |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
754 |
|
| 13882 | 755 |
theorem mod_div_equality': "(m::nat) mod n = m - (m div n) * n" |
756 |
apply (rule_tac P="%x. m mod n = x - (m div n) * n" in |
|
757 |
subst [OF mod_div_equality [of _ n]]) |
|
758 |
apply arith |
|
759 |
done |
|
760 |
||
| 22800 | 761 |
lemma div_mod_equality': |
762 |
fixes m n :: nat |
|
763 |
shows "m div n * n = m - m mod n" |
|
764 |
proof - |
|
765 |
have "m mod n \<le> m mod n" .. |
|
766 |
from div_mod_equality have |
|
767 |
"m div n * n + m mod n - m mod n = m - m mod n" by simp |
|
768 |
with diff_add_assoc [OF `m mod n \<le> m mod n`, of "m div n * n"] have |
|
769 |
"m div n * n + (m mod n - m mod n) = m - m mod n" |
|
770 |
by simp |
|
771 |
then show ?thesis by simp |
|
772 |
qed |
|
773 |
||
774 |
||
| 14640 | 775 |
subsection {*An ``induction'' law for modulus arithmetic.*}
|
776 |
||
777 |
lemma mod_induct_0: |
|
778 |
assumes step: "\<forall>i<p. P i \<longrightarrow> P ((Suc i) mod p)" |
|
779 |
and base: "P i" and i: "i<p" |
|
780 |
shows "P 0" |
|
781 |
proof (rule ccontr) |
|
782 |
assume contra: "\<not>(P 0)" |
|
783 |
from i have p: "0<p" by simp |
|
784 |
have "\<forall>k. 0<k \<longrightarrow> \<not> P (p-k)" (is "\<forall>k. ?A k") |
|
785 |
proof |
|
786 |
fix k |
|
787 |
show "?A k" |
|
788 |
proof (induct k) |
|
789 |
show "?A 0" by simp -- "by contradiction" |
|
790 |
next |
|
791 |
fix n |
|
792 |
assume ih: "?A n" |
|
793 |
show "?A (Suc n)" |
|
794 |
proof (clarsimp) |
|
| 22718 | 795 |
assume y: "P (p - Suc n)" |
796 |
have n: "Suc n < p" |
|
797 |
proof (rule ccontr) |
|
798 |
assume "\<not>(Suc n < p)" |
|
799 |
hence "p - Suc n = 0" |
|
800 |
by simp |
|
801 |
with y contra show "False" |
|
802 |
by simp |
|
803 |
qed |
|
804 |
hence n2: "Suc (p - Suc n) = p-n" by arith |
|
805 |
from p have "p - Suc n < p" by arith |
|
806 |
with y step have z: "P ((Suc (p - Suc n)) mod p)" |
|
807 |
by blast |
|
808 |
show "False" |
|
809 |
proof (cases "n=0") |
|
810 |
case True |
|
811 |
with z n2 contra show ?thesis by simp |
|
812 |
next |
|
813 |
case False |
|
814 |
with p have "p-n < p" by arith |
|
815 |
with z n2 False ih show ?thesis by simp |
|
816 |
qed |
|
| 14640 | 817 |
qed |
818 |
qed |
|
819 |
qed |
|
820 |
moreover |
|
821 |
from i obtain k where "0<k \<and> i+k=p" |
|
822 |
by (blast dest: less_imp_add_positive) |
|
823 |
hence "0<k \<and> i=p-k" by auto |
|
824 |
moreover |
|
825 |
note base |
|
826 |
ultimately |
|
827 |
show "False" by blast |
|
828 |
qed |
|
829 |
||
830 |
lemma mod_induct: |
|
831 |
assumes step: "\<forall>i<p. P i \<longrightarrow> P ((Suc i) mod p)" |
|
832 |
and base: "P i" and i: "i<p" and j: "j<p" |
|
833 |
shows "P j" |
|
834 |
proof - |
|
835 |
have "\<forall>j<p. P j" |
|
836 |
proof |
|
837 |
fix j |
|
838 |
show "j<p \<longrightarrow> P j" (is "?A j") |
|
839 |
proof (induct j) |
|
840 |
from step base i show "?A 0" |
|
| 22718 | 841 |
by (auto elim: mod_induct_0) |
| 14640 | 842 |
next |
843 |
fix k |
|
844 |
assume ih: "?A k" |
|
845 |
show "?A (Suc k)" |
|
846 |
proof |
|
| 22718 | 847 |
assume suc: "Suc k < p" |
848 |
hence k: "k<p" by simp |
|
849 |
with ih have "P k" .. |
|
850 |
with step k have "P (Suc k mod p)" |
|
851 |
by blast |
|
852 |
moreover |
|
853 |
from suc have "Suc k mod p = Suc k" |
|
854 |
by simp |
|
855 |
ultimately |
|
856 |
show "P (Suc k)" by simp |
|
| 14640 | 857 |
qed |
858 |
qed |
|
859 |
qed |
|
860 |
with j show ?thesis by blast |
|
861 |
qed |
|
862 |
||
863 |
||
|
18202
46af82efd311
presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy
chaieb
parents:
18154
diff
changeset
|
864 |
lemma mod_add_left_eq: "((a::nat) + b) mod c = (a mod c + b) mod c" |
|
46af82efd311
presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy
chaieb
parents:
18154
diff
changeset
|
865 |
apply (rule trans [symmetric]) |
| 22718 | 866 |
apply (rule mod_add1_eq, simp) |
|
18202
46af82efd311
presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy
chaieb
parents:
18154
diff
changeset
|
867 |
apply (rule mod_add1_eq [symmetric]) |
|
46af82efd311
presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy
chaieb
parents:
18154
diff
changeset
|
868 |
done |
|
46af82efd311
presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy
chaieb
parents:
18154
diff
changeset
|
869 |
|
|
46af82efd311
presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy
chaieb
parents:
18154
diff
changeset
|
870 |
lemma mod_add_right_eq: "(a+b) mod (c::nat) = (a + (b mod c)) mod c" |
| 22718 | 871 |
apply (rule trans [symmetric]) |
872 |
apply (rule mod_add1_eq, simp) |
|
873 |
apply (rule mod_add1_eq [symmetric]) |
|
874 |
done |
|
|
18202
46af82efd311
presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy
chaieb
parents:
18154
diff
changeset
|
875 |
|
| 22800 | 876 |
lemma mod_div_decomp: |
877 |
fixes n k :: nat |
|
878 |
obtains m q where "m = n div k" and "q = n mod k" |
|
879 |
and "n = m * k + q" |
|
880 |
proof - |
|
881 |
from mod_div_equality have "n = n div k * k + n mod k" by auto |
|
882 |
moreover have "n div k = n div k" .. |
|
883 |
moreover have "n mod k = n mod k" .. |
|
884 |
note that ultimately show thesis by blast |
|
885 |
qed |
|
886 |
||
| 20589 | 887 |
|
|
22744
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
888 |
subsection {* Code generation for div, mod and dvd on nat *}
|
| 20589 | 889 |
|
| 22845 | 890 |
definition [code func del]: |
| 20589 | 891 |
"divmod (m\<Colon>nat) n = (m div n, m mod n)" |
892 |
||
| 22718 | 893 |
lemma divmod_zero [code]: "divmod m 0 = (0, m)" |
| 20589 | 894 |
unfolding divmod_def by simp |
895 |
||
896 |
lemma divmod_succ [code]: |
|
897 |
"divmod m (Suc k) = (if m < Suc k then (0, m) else |
|
898 |
let |
|
899 |
(p, q) = divmod (m - Suc k) (Suc k) |
|
| 22718 | 900 |
in (Suc p, q))" |
| 20589 | 901 |
unfolding divmod_def Let_def split_def |
902 |
by (auto intro: div_geq mod_geq) |
|
903 |
||
| 22718 | 904 |
lemma div_divmod [code]: "m div n = fst (divmod m n)" |
| 20589 | 905 |
unfolding divmod_def by simp |
906 |
||
| 22718 | 907 |
lemma mod_divmod [code]: "m mod n = snd (divmod m n)" |
| 20589 | 908 |
unfolding divmod_def by simp |
909 |
||
|
22744
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
910 |
definition |
|
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
911 |
dvd_nat :: "nat \<Rightarrow> nat \<Rightarrow> bool" |
|
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
912 |
where |
|
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
913 |
"dvd_nat m n \<longleftrightarrow> n mod m = (0 \<Colon> nat)" |
|
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
914 |
|
|
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
915 |
lemma [code inline]: |
|
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
916 |
"op dvd = dvd_nat" |
|
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
917 |
by (auto simp add: dvd_nat_def dvd_eq_mod_eq_0 expand_fun_eq) |
|
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
918 |
|
| 21191 | 919 |
code_modulename SML |
| 23017 | 920 |
Divides Nat |
| 20640 | 921 |
|
|
21911
e29bcab0c81c
added OCaml code generation (without dictionaries)
haftmann
parents:
21408
diff
changeset
|
922 |
code_modulename OCaml |
| 23017 | 923 |
Divides Nat |
924 |
||
925 |
code_modulename Haskell |
|
926 |
Divides Nat |
|
|
21911
e29bcab0c81c
added OCaml code generation (without dictionaries)
haftmann
parents:
21408
diff
changeset
|
927 |
|
|
22744
5cbe966d67a2
Isar definitions are now added explicitly to code theorem table
haftmann
parents:
22718
diff
changeset
|
928 |
hide (open) const divmod dvd_nat |
| 20589 | 929 |
|
930 |
subsection {* Legacy bindings *}
|
|
931 |
||
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
932 |
ML |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
933 |
{*
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
934 |
val div_def = thm "div_def" |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
935 |
val mod_def = thm "mod_def" |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
936 |
val dvd_def = thm "dvd_def" |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
937 |
val quorem_def = thm "quorem_def" |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
938 |
|
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
939 |
val wf_less_trans = thm "wf_less_trans"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
940 |
val mod_eq = thm "mod_eq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
941 |
val div_eq = thm "div_eq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
942 |
val DIVISION_BY_ZERO_DIV = thm "DIVISION_BY_ZERO_DIV"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
943 |
val DIVISION_BY_ZERO_MOD = thm "DIVISION_BY_ZERO_MOD"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
944 |
val mod_less = thm "mod_less"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
945 |
val mod_geq = thm "mod_geq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
946 |
val le_mod_geq = thm "le_mod_geq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
947 |
val mod_if = thm "mod_if"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
948 |
val mod_1 = thm "mod_1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
949 |
val mod_self = thm "mod_self"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
950 |
val mod_add_self2 = thm "mod_add_self2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
951 |
val mod_add_self1 = thm "mod_add_self1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
952 |
val mod_mult_self1 = thm "mod_mult_self1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
953 |
val mod_mult_self2 = thm "mod_mult_self2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
954 |
val mod_mult_distrib = thm "mod_mult_distrib"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
955 |
val mod_mult_distrib2 = thm "mod_mult_distrib2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
956 |
val mod_mult_self_is_0 = thm "mod_mult_self_is_0"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
957 |
val mod_mult_self1_is_0 = thm "mod_mult_self1_is_0"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
958 |
val div_less = thm "div_less"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
959 |
val div_geq = thm "div_geq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
960 |
val le_div_geq = thm "le_div_geq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
961 |
val div_if = thm "div_if"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
962 |
val mod_div_equality = thm "mod_div_equality"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
963 |
val mod_div_equality2 = thm "mod_div_equality2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
964 |
val div_mod_equality = thm "div_mod_equality"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
965 |
val div_mod_equality2 = thm "div_mod_equality2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
966 |
val mult_div_cancel = thm "mult_div_cancel"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
967 |
val mod_less_divisor = thm "mod_less_divisor"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
968 |
val div_mult_self_is_m = thm "div_mult_self_is_m"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
969 |
val div_mult_self1_is_m = thm "div_mult_self1_is_m"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
970 |
val unique_quotient_lemma = thm "unique_quotient_lemma"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
971 |
val unique_quotient = thm "unique_quotient"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
972 |
val unique_remainder = thm "unique_remainder"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
973 |
val div_0 = thm "div_0"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
974 |
val mod_0 = thm "mod_0"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
975 |
val div_mult1_eq = thm "div_mult1_eq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
976 |
val mod_mult1_eq = thm "mod_mult1_eq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
977 |
val mod_mult1_eq' = thm "mod_mult1_eq'"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
978 |
val mod_mult_distrib_mod = thm "mod_mult_distrib_mod"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
979 |
val div_add1_eq = thm "div_add1_eq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
980 |
val mod_add1_eq = thm "mod_add1_eq"; |
|
18202
46af82efd311
presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy
chaieb
parents:
18154
diff
changeset
|
981 |
val mod_add_left_eq = thm "mod_add_left_eq"; |
|
46af82efd311
presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy
chaieb
parents:
18154
diff
changeset
|
982 |
val mod_add_right_eq = thm "mod_add_right_eq"; |
|
14267
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
983 |
val mod_lemma = thm "mod_lemma"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
984 |
val div_mult2_eq = thm "div_mult2_eq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
985 |
val mod_mult2_eq = thm "mod_mult2_eq"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
986 |
val div_mult_mult_lemma = thm "div_mult_mult_lemma"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
987 |
val div_mult_mult1 = thm "div_mult_mult1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
988 |
val div_mult_mult2 = thm "div_mult_mult2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
989 |
val div_1 = thm "div_1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
990 |
val div_self = thm "div_self"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
991 |
val div_add_self2 = thm "div_add_self2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
992 |
val div_add_self1 = thm "div_add_self1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
993 |
val div_mult_self1 = thm "div_mult_self1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
994 |
val div_mult_self2 = thm "div_mult_self2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
995 |
val div_le_mono = thm "div_le_mono"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
996 |
val div_le_mono2 = thm "div_le_mono2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
997 |
val div_le_dividend = thm "div_le_dividend"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
998 |
val div_less_dividend = thm "div_less_dividend"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
999 |
val mod_Suc = thm "mod_Suc"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1000 |
val dvdI = thm "dvdI"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1001 |
val dvdE = thm "dvdE"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1002 |
val dvd_0_right = thm "dvd_0_right"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1003 |
val dvd_0_left = thm "dvd_0_left"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1004 |
val dvd_0_left_iff = thm "dvd_0_left_iff"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1005 |
val dvd_1_left = thm "dvd_1_left"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1006 |
val dvd_1_iff_1 = thm "dvd_1_iff_1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1007 |
val dvd_refl = thm "dvd_refl"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1008 |
val dvd_trans = thm "dvd_trans"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1009 |
val dvd_anti_sym = thm "dvd_anti_sym"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1010 |
val dvd_add = thm "dvd_add"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1011 |
val dvd_diff = thm "dvd_diff"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1012 |
val dvd_diffD = thm "dvd_diffD"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1013 |
val dvd_diffD1 = thm "dvd_diffD1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1014 |
val dvd_mult = thm "dvd_mult"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1015 |
val dvd_mult2 = thm "dvd_mult2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1016 |
val dvd_reduce = thm "dvd_reduce"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1017 |
val dvd_mod = thm "dvd_mod"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1018 |
val dvd_mod_imp_dvd = thm "dvd_mod_imp_dvd"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1019 |
val dvd_mod_iff = thm "dvd_mod_iff"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1020 |
val dvd_mult_cancel = thm "dvd_mult_cancel"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1021 |
val dvd_mult_cancel1 = thm "dvd_mult_cancel1"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1022 |
val dvd_mult_cancel2 = thm "dvd_mult_cancel2"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1023 |
val mult_dvd_mono = thm "mult_dvd_mono"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1024 |
val dvd_mult_left = thm "dvd_mult_left"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1025 |
val dvd_mult_right = thm "dvd_mult_right"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1026 |
val dvd_imp_le = thm "dvd_imp_le"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1027 |
val dvd_eq_mod_eq_0 = thm "dvd_eq_mod_eq_0"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1028 |
val dvd_mult_div_cancel = thm "dvd_mult_div_cancel"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1029 |
val mod_eq_0_iff = thm "mod_eq_0_iff"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1030 |
val mod_eqD = thm "mod_eqD"; |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1031 |
*} |
|
b963e9cee2a0
More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas
paulson
parents:
14208
diff
changeset
|
1032 |
|
|
13189
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
1033 |
(* |
|
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
1034 |
lemma split_div: |
| 13152 | 1035 |
assumes m: "m \<noteq> 0" |
1036 |
shows "P(n div m :: nat) = (!i. !j<m. n = m*i + j \<longrightarrow> P i)" |
|
1037 |
(is "?P = ?Q") |
|
1038 |
proof |
|
1039 |
assume P: ?P |
|
1040 |
show ?Q |
|
1041 |
proof (intro allI impI) |
|
1042 |
fix i j |
|
1043 |
assume n: "n = m*i + j" and j: "j < m" |
|
1044 |
show "P i" |
|
1045 |
proof (cases) |
|
1046 |
assume "i = 0" |
|
1047 |
with n j P show "P i" by simp |
|
1048 |
next |
|
1049 |
assume "i \<noteq> 0" |
|
1050 |
with n j P show "P i" by (simp add:add_ac div_mult_self1) |
|
1051 |
qed |
|
1052 |
qed |
|
1053 |
next |
|
1054 |
assume Q: ?Q |
|
1055 |
from m Q[THEN spec,of "n div m",THEN spec, of "n mod m"] |
|
| 13517 | 1056 |
show ?P by simp |
| 13152 | 1057 |
qed |
1058 |
||
1059 |
lemma split_mod: |
|
1060 |
assumes m: "m \<noteq> 0" |
|
1061 |
shows "P(n mod m :: nat) = (!i. !j<m. n = m*i + j \<longrightarrow> P j)" |
|
1062 |
(is "?P = ?Q") |
|
1063 |
proof |
|
1064 |
assume P: ?P |
|
1065 |
show ?Q |
|
1066 |
proof (intro allI impI) |
|
1067 |
fix i j |
|
1068 |
assume "n = m*i + j" "j < m" |
|
1069 |
thus "P j" using m P by(simp add:add_ac mult_ac) |
|
1070 |
qed |
|
1071 |
next |
|
1072 |
assume Q: ?Q |
|
1073 |
from m Q[THEN spec,of "n div m",THEN spec, of "n mod m"] |
|
| 13517 | 1074 |
show ?P by simp |
| 13152 | 1075 |
qed |
|
13189
81ed5c6de890
Now arith can deal with div/mod arbitrary nat numerals.
nipkow
parents:
13152
diff
changeset
|
1076 |
*) |
| 3366 | 1077 |
end |