| author | huffman |
| Thu, 23 Feb 2012 11:20:42 +0100 | |
| changeset 46598 | fd0ac848140e |
| parent 46025 | 64a19ea435fc |
| child 46599 | 102a06189a6c |
| permissions | -rw-r--r-- |
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(* |
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Author: Jeremy Dawson, NICTA |
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Basic definitions to do with integers, expressed using Pls, Min, BIT. |
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*) |
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header {* Basic Definitions for Binary Integers *}
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theory Bit_Representation |
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imports Misc_Numeric "~~/src/HOL/Library/Bit" |
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begin |
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subsection {* Further properties of numerals *}
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definition bitval :: "bit \<Rightarrow> 'a\<Colon>zero_neq_one" where |
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"bitval = bit_case 0 1" |
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lemma bitval_simps [simp]: |
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"bitval 0 = 0" |
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"bitval 1 = 1" |
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by (simp_all add: bitval_def) |
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definition Bit :: "int \<Rightarrow> bit \<Rightarrow> int" (infixl "BIT" 90) where |
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"k BIT b = bitval b + k + k" |
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definition bin_last :: "int \<Rightarrow> bit" where |
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"bin_last w = (if w mod 2 = 0 then (0::bit) else (1::bit))" |
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definition bin_rest :: "int \<Rightarrow> int" where |
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"bin_rest w = w div 2" |
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lemma bin_rl_simp [simp]: |
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"bin_rest w BIT bin_last w = w" |
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unfolding bin_rest_def bin_last_def Bit_def |
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using mod_div_equality [of w 2] |
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by (cases "w mod 2 = 0", simp_all) |
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lemma bin_rest_BIT: "bin_rest (x BIT b) = x" |
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unfolding bin_rest_def Bit_def |
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by (cases b, simp_all) |
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lemma bin_last_BIT: "bin_last (x BIT b) = b" |
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unfolding bin_last_def Bit_def |
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by (cases b, simp_all add: z1pmod2) |
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lemma BIT_eq_iff [iff]: "u BIT b = v BIT c \<longleftrightarrow> u = v \<and> b = c" |
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by (metis bin_rest_BIT bin_last_BIT) |
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lemma BIT_bin_simps [simp]: |
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"number_of w BIT 0 = number_of (Int.Bit0 w)" |
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"number_of w BIT 1 = number_of (Int.Bit1 w)" |
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unfolding Bit_def number_of_is_id numeral_simps by simp_all |
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lemma BIT_special_simps [simp]: |
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shows "0 BIT 0 = 0" and "0 BIT 1 = 1" and "1 BIT 0 = 2" and "1 BIT 1 = 3" |
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unfolding Bit_def by simp_all |
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lemma bin_last_numeral_simps [simp]: |
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"bin_last 0 = 0" |
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"bin_last 1 = 1" |
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"bin_last -1 = 1" |
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"bin_last (number_of (Int.Bit0 w)) = 0" |
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"bin_last (number_of (Int.Bit1 w)) = 1" |
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unfolding bin_last_def by simp_all |
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lemma bin_rest_numeral_simps [simp]: |
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"bin_rest 0 = 0" |
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"bin_rest 1 = 0" |
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"bin_rest -1 = -1" |
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"bin_rest (number_of (Int.Bit0 w)) = number_of w" |
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"bin_rest (number_of (Int.Bit1 w)) = number_of w" |
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lemma BIT_B0_eq_Bit0: "w BIT 0 = Int.Bit0 w" |
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unfolding Bit_def Bit0_def by simp |
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lemma BIT_B1_eq_Bit1: "w BIT 1 = Int.Bit1 w" |
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unfolding Bit_def Bit1_def by simp |
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lemmas BIT_simps = BIT_B0_eq_Bit0 BIT_B1_eq_Bit1 |
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lemma number_of_False_cong: |
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"False \<Longrightarrow> number_of x = number_of y" |
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by (rule FalseE) |
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lemma less_Bits: |
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"(v BIT b < w BIT c) = (v < w | v <= w & b = (0::bit) & c = (1::bit))" |
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unfolding Bit_def by (auto simp add: bitval_def split: bit.split) |
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lemma le_Bits: |
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"(v BIT b <= w BIT c) = (v < w | v <= w & (b ~= (1::bit) | c ~= (0::bit)))" |
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unfolding Bit_def by (auto simp add: bitval_def split: bit.split) |
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lemma Bit_B0: |
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"k BIT (0::bit) = k + k" |
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by (unfold Bit_def) simp |
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lemma Bit_B1: |
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"k BIT (1::bit) = k + k + 1" |
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by (unfold Bit_def) simp |
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lemma Bit_B0_2t: "k BIT (0::bit) = 2 * k" |
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by (rule trans, rule Bit_B0) simp |
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lemma Bit_B1_2t: "k BIT (1::bit) = 2 * k + 1" |
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by (rule trans, rule Bit_B1) simp |
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lemma B_mod_2': |
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"X = 2 ==> (w BIT (1::bit)) mod X = 1 & (w BIT (0::bit)) mod X = 0" |
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apply (simp (no_asm) only: Bit_B0 Bit_B1) |
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apply (simp add: z1pmod2) |
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done |
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lemma B1_mod_2 [simp]: "(Int.Bit1 w) mod 2 = 1" |
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unfolding numeral_simps number_of_is_id by (simp add: z1pmod2) |
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lemma B0_mod_2 [simp]: "(Int.Bit0 w) mod 2 = 0" |
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unfolding numeral_simps number_of_is_id by simp |
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lemma neB1E [elim!]: |
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assumes ne: "y \<noteq> (1::bit)" |
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assumes y: "y = (0::bit) \<Longrightarrow> P" |
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shows "P" |
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apply (rule y) |
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apply (cases y rule: bit.exhaust, simp) |
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apply (simp add: ne) |
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done |
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lemma bin_ex_rl: "EX w b. w BIT b = bin" |
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apply (unfold Bit_def) |
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apply (cases "even bin") |
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apply (clarsimp simp: even_equiv_def) |
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apply (auto simp: odd_equiv_def bitval_def split: bit.split) |
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done |
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lemma bin_exhaust: |
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assumes Q: "\<And>x b. bin = x BIT b \<Longrightarrow> Q" |
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shows "Q" |
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apply (insert bin_ex_rl [of bin]) |
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apply (erule exE)+ |
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apply (rule Q) |
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apply force |
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done |
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subsection {* Destructors for binary integers *}
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definition bin_rl :: "int \<Rightarrow> int \<times> bit" where |
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"bin_rl w = (bin_rest w, bin_last w)" |
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lemma bin_rl_char: "bin_rl w = (r, l) \<longleftrightarrow> r BIT l = w" |
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unfolding bin_rl_def by (auto simp: bin_rest_BIT bin_last_BIT) |
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primrec bin_nth where |
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Z: "bin_nth w 0 = (bin_last w = (1::bit))" |
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| Suc: "bin_nth w (Suc n) = bin_nth (bin_rest w) n" |
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lemma bin_rl_simps [simp]: |
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"bin_rl Int.Pls = (Int.Pls, (0::bit))" |
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"bin_rl Int.Min = (Int.Min, (1::bit))" |
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"bin_rl (Int.Bit0 r) = (r, (0::bit))" |
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"bin_rl (Int.Bit1 r) = (r, (1::bit))" |
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"bin_rl (r BIT b) = (r, b)" |
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unfolding bin_rl_char by (simp_all add: BIT_simps) |
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lemma bin_abs_lem: |
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"bin = (w BIT b) ==> ~ bin = Int.Min --> ~ bin = Int.Pls --> |
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nat (abs w) < nat (abs bin)" |
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apply clarsimp |
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apply (unfold Pls_def Min_def Bit_def) |
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apply (cases b) |
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apply (clarsimp, arith) |
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apply (clarsimp, arith) |
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done |
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lemma bin_induct: |
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assumes PPls: "P Int.Pls" |
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and PMin: "P Int.Min" |
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and PBit: "!!bin bit. P bin ==> P (bin BIT bit)" |
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shows "P bin" |
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apply (rule_tac P=P and a=bin and f1="nat o abs" |
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in wf_measure [THEN wf_induct]) |
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apply (simp add: measure_def inv_image_def) |
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apply (case_tac x rule: bin_exhaust) |
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apply (frule bin_abs_lem) |
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apply (auto simp add : PPls PMin PBit) |
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done |
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lemma numeral_induct: |
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assumes Pls: "P Int.Pls" |
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assumes Min: "P Int.Min" |
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assumes Bit0: "\<And>w. \<lbrakk>P w; w \<noteq> Int.Pls\<rbrakk> \<Longrightarrow> P (Int.Bit0 w)" |
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assumes Bit1: "\<And>w. \<lbrakk>P w; w \<noteq> Int.Min\<rbrakk> \<Longrightarrow> P (Int.Bit1 w)" |
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shows "P x" |
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apply (induct x rule: bin_induct) |
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apply (rule Pls) |
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apply (rule Min) |
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apply (case_tac bit) |
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apply (case_tac "bin = Int.Pls") |
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apply (simp add: BIT_simps) |
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apply (simp add: Bit0 BIT_simps) |
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apply (case_tac "bin = Int.Min") |
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apply (simp add: BIT_simps) |
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apply (simp add: Bit1 BIT_simps) |
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done |
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lemma bin_rest_simps [simp]: |
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"bin_rest Int.Pls = Int.Pls" |
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"bin_rest Int.Min = Int.Min" |
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"bin_rest (Int.Bit0 w) = w" |
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"bin_rest (Int.Bit1 w) = w" |
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"bin_rest (w BIT b) = w" |
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using bin_rl_simps bin_rl_def by auto |
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lemma bin_last_simps [simp]: |
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"bin_last Int.Pls = (0::bit)" |
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"bin_last Int.Min = (1::bit)" |
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"bin_last (Int.Bit0 w) = (0::bit)" |
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"bin_last (Int.Bit1 w) = (1::bit)" |
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"bin_last (w BIT b) = b" |
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using bin_rl_simps bin_rl_def by auto |
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lemma Bit_div2 [simp]: "(w BIT b) div 2 = w" |
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unfolding bin_rest_def [symmetric] by auto |
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lemma Bit0_div2 [simp]: "(Int.Bit0 w) div 2 = w" |
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using Bit_div2 [where b="(0::bit)"] by (simp add: BIT_simps) |
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lemma Bit1_div2 [simp]: "(Int.Bit1 w) div 2 = w" |
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using Bit_div2 [where b="(1::bit)"] by (simp add: BIT_simps) |
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lemma bin_nth_lem [rule_format]: |
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"ALL y. bin_nth x = bin_nth y --> x = y" |
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apply (induct x rule: bin_induct) |
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apply safe |
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apply (erule rev_mp) |
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apply (induct_tac y rule: bin_induct) |
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apply safe |
| 24333 | 239 |
apply (drule_tac x=0 in fun_cong, force) |
240 |
apply (erule notE, rule ext, |
|
241 |
drule_tac x="Suc x" in fun_cong, force) |
|
| 45847 | 242 |
apply (drule_tac x=0 in fun_cong, force simp: BIT_simps) |
| 24333 | 243 |
apply (erule rev_mp) |
244 |
apply (induct_tac y rule: bin_induct) |
|
|
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245 |
apply safe |
| 24333 | 246 |
apply (drule_tac x=0 in fun_cong, force) |
247 |
apply (erule notE, rule ext, |
|
248 |
drule_tac x="Suc x" in fun_cong, force) |
|
| 45847 | 249 |
apply (drule_tac x=0 in fun_cong, force simp: BIT_simps) |
| 24333 | 250 |
apply (case_tac y rule: bin_exhaust) |
251 |
apply clarify |
|
252 |
apply (erule allE) |
|
253 |
apply (erule impE) |
|
254 |
prefer 2 |
|
| 45848 | 255 |
apply (erule conjI) |
| 24333 | 256 |
apply (drule_tac x=0 in fun_cong, force) |
257 |
apply (rule ext) |
|
258 |
apply (drule_tac x="Suc ?x" in fun_cong, force) |
|
259 |
done |
|
260 |
||
261 |
lemma bin_nth_eq_iff: "(bin_nth x = bin_nth y) = (x = y)" |
|
262 |
by (auto elim: bin_nth_lem) |
|
263 |
||
| 45604 | 264 |
lemmas bin_eqI = ext [THEN bin_nth_eq_iff [THEN iffD1]] |
| 24333 | 265 |
|
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lemma bin_eq_iff: "x = y \<longleftrightarrow> (\<forall>n. bin_nth x n = bin_nth y n)" |
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by (auto intro!: bin_nth_lem del: equalityI) |
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|
268 |
|
| 45853 | 269 |
lemma bin_nth_zero [simp]: "\<not> bin_nth 0 n" |
270 |
by (induct n) auto |
|
271 |
||
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lemma bin_nth_1 [simp]: "bin_nth 1 n \<longleftrightarrow> n = 0" |
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by (cases n) simp_all |
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274 |
|
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lemma bin_nth_Pls [simp]: "~ bin_nth Int.Pls n" |
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by (induct n) auto (* FIXME: delete *) |
| 24333 | 277 |
|
| 45952 | 278 |
lemma bin_nth_minus1 [simp]: "bin_nth -1 n" |
279 |
by (induct n) auto |
|
280 |
||
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lemma bin_nth_Min [simp]: "bin_nth Int.Min n" |
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by (induct n) auto (* FIXME: delete *) |
| 24333 | 283 |
|
| 37654 | 284 |
lemma bin_nth_0_BIT: "bin_nth (w BIT b) 0 = (b = (1::bit))" |
| 24333 | 285 |
by auto |
286 |
||
287 |
lemma bin_nth_Suc_BIT: "bin_nth (w BIT b) (Suc n) = bin_nth w n" |
|
288 |
by auto |
|
289 |
||
290 |
lemma bin_nth_minus [simp]: "0 < n ==> bin_nth (w BIT b) n = bin_nth w (n - 1)" |
|
291 |
by (cases n) auto |
|
292 |
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lemma bin_nth_minus_Bit0 [simp]: |
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|
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"0 < n ==> bin_nth (number_of (Int.Bit0 w)) n = bin_nth (number_of w) (n - 1)" |
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using bin_nth_minus [where w="number_of w" and b="(0::bit)"] by simp |
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|
296 |
|
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|
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lemma bin_nth_minus_Bit1 [simp]: |
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|
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"0 < n ==> bin_nth (number_of (Int.Bit1 w)) n = bin_nth (number_of w) (n - 1)" |
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|
300 |
|
| 24333 | 301 |
lemmas bin_nth_0 = bin_nth.simps(1) |
302 |
lemmas bin_nth_Suc = bin_nth.simps(2) |
|
303 |
||
304 |
lemmas bin_nth_simps = |
|
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bin_nth_0 bin_nth_Suc bin_nth_zero bin_nth_minus1 bin_nth_minus |
|
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|
306 |
bin_nth_minus_Bit0 bin_nth_minus_Bit1 |
| 24333 | 307 |
|
| 26557 | 308 |
|
309 |
subsection {* Truncating binary integers *}
|
|
310 |
||
| 45846 | 311 |
definition bin_sign :: "int \<Rightarrow> int" where |
| 37667 | 312 |
bin_sign_def: "bin_sign k = (if k \<ge> 0 then 0 else - 1)" |
| 26557 | 313 |
|
314 |
lemma bin_sign_simps [simp]: |
|
| 45850 | 315 |
"bin_sign 0 = 0" |
316 |
"bin_sign -1 = -1" |
|
317 |
"bin_sign (number_of (Int.Bit0 w)) = bin_sign (number_of w)" |
|
318 |
"bin_sign (number_of (Int.Bit1 w)) = bin_sign (number_of w)" |
|
| 26557 | 319 |
"bin_sign Int.Pls = Int.Pls" |
320 |
"bin_sign Int.Min = Int.Min" |
|
321 |
"bin_sign (Int.Bit0 w) = bin_sign w" |
|
322 |
"bin_sign (Int.Bit1 w) = bin_sign w" |
|
323 |
"bin_sign (w BIT b) = bin_sign w" |
|
| 45850 | 324 |
unfolding bin_sign_def numeral_simps Bit_def bitval_def number_of_is_id |
325 |
by (simp_all split: bit.split) |
|
| 26557 | 326 |
|
| 24364 | 327 |
lemma bin_sign_rest [simp]: |
| 37667 | 328 |
"bin_sign (bin_rest w) = bin_sign w" |
| 26557 | 329 |
by (cases w rule: bin_exhaust) auto |
| 24364 | 330 |
|
| 37667 | 331 |
primrec bintrunc :: "nat \<Rightarrow> int \<Rightarrow> int" where |
|
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|
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Z : "bintrunc 0 bin = 0" |
| 37667 | 333 |
| Suc : "bintrunc (Suc n) bin = bintrunc n (bin_rest bin) BIT (bin_last bin)" |
| 24364 | 334 |
|
| 37667 | 335 |
primrec sbintrunc :: "nat => int => int" where |
|
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|
336 |
Z : "sbintrunc 0 bin = (case bin_last bin of (1::bit) \<Rightarrow> -1 | (0::bit) \<Rightarrow> 0)" |
| 37667 | 337 |
| Suc : "sbintrunc (Suc n) bin = sbintrunc n (bin_rest bin) BIT (bin_last bin)" |
338 |
||
|
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|
339 |
lemma sign_bintr: "bin_sign (bintrunc n w) = 0" |
|
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|
340 |
by (induct n arbitrary: w) auto |
| 24333 | 341 |
|
|
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|
342 |
lemma bintrunc_mod2p: "bintrunc n w = (w mod 2 ^ n)" |
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|
343 |
apply (induct n arbitrary: w) |
|
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|
344 |
apply simp |
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|
345 |
apply (simp add: bin_last_def bin_rest_def Bit_def zmod_zmult2_eq) |
| 24333 | 346 |
done |
347 |
||
|
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|
348 |
lemma sbintrunc_mod2p: "sbintrunc n w = (w + 2 ^ n) mod 2 ^ (Suc n) - 2 ^ n" |
|
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|
349 |
apply (induct n arbitrary: w) |
| 24333 | 350 |
apply clarsimp |
| 30034 | 351 |
apply (subst mod_add_left_eq) |
|
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|
352 |
apply (simp add: bin_last_def) |
|
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|
353 |
apply simp |
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|
354 |
apply (simp add: bin_last_def bin_rest_def Bit_def) |
|
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|
355 |
apply (clarsimp simp: mod_mult_mult1 [symmetric] |
| 24333 | 356 |
zmod_zdiv_equality [THEN diff_eq_eq [THEN iffD2 [THEN sym]]]) |
357 |
apply (rule trans [symmetric, OF _ emep1]) |
|
358 |
apply auto |
|
359 |
apply (auto simp: even_def) |
|
360 |
done |
|
361 |
||
| 24465 | 362 |
subsection "Simplifications for (s)bintrunc" |
363 |
||
| 45852 | 364 |
lemma bintrunc_n_0 [simp]: "bintrunc n 0 = 0" |
|
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|
365 |
by (induct n) auto |
| 45852 | 366 |
|
| 45855 | 367 |
lemma sbintrunc_n_0 [simp]: "sbintrunc n 0 = 0" |
|
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|
368 |
by (induct n) auto |
| 45855 | 369 |
|
| 45856 | 370 |
lemma sbintrunc_n_minus1 [simp]: "sbintrunc n -1 = -1" |
|
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|
371 |
by (induct n) auto |
| 45856 | 372 |
|
| 45852 | 373 |
lemma bintrunc_Suc_numeral: |
374 |
"bintrunc (Suc n) 1 = 1" |
|
375 |
"bintrunc (Suc n) -1 = bintrunc n -1 BIT 1" |
|
376 |
"bintrunc (Suc n) (number_of (Int.Bit0 w)) = bintrunc n (number_of w) BIT 0" |
|
377 |
"bintrunc (Suc n) (number_of (Int.Bit1 w)) = bintrunc n (number_of w) BIT 1" |
|
378 |
by simp_all |
|
379 |
||
| 45856 | 380 |
lemma sbintrunc_0_numeral [simp]: |
381 |
"sbintrunc 0 1 = -1" |
|
382 |
"sbintrunc 0 (number_of (Int.Bit0 w)) = 0" |
|
383 |
"sbintrunc 0 (number_of (Int.Bit1 w)) = -1" |
|
|
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changeset
|
384 |
by simp_all |
| 45856 | 385 |
|
| 45855 | 386 |
lemma sbintrunc_Suc_numeral: |
387 |
"sbintrunc (Suc n) 1 = 1" |
|
388 |
"sbintrunc (Suc n) (number_of (Int.Bit0 w)) = sbintrunc n (number_of w) BIT 0" |
|
389 |
"sbintrunc (Suc n) (number_of (Int.Bit1 w)) = sbintrunc n (number_of w) BIT 1" |
|
390 |
by simp_all |
|
391 |
||
| 24465 | 392 |
lemma bit_bool: |
| 37654 | 393 |
"(b = (b' = (1::bit))) = (b' = (if b then (1::bit) else (0::bit)))" |
| 24465 | 394 |
by (cases b') auto |
395 |
||
396 |
lemmas bit_bool1 [simp] = refl [THEN bit_bool [THEN iffD1], symmetric] |
|
| 24333 | 397 |
|
|
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|
398 |
lemma bin_sign_lem: "(bin_sign (sbintrunc n bin) = -1) = bin_nth bin n" |
|
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|
399 |
apply (induct n arbitrary: bin) |
| 24333 | 400 |
apply (case_tac bin rule: bin_exhaust, case_tac b, auto)+ |
401 |
done |
|
402 |
||
|
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|
403 |
lemma nth_bintr: "bin_nth (bintrunc m w) n = (n < m & bin_nth w n)" |
|
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changeset
|
404 |
apply (induct n arbitrary: w m) |
| 24333 | 405 |
apply (case_tac m, auto)[1] |
406 |
apply (case_tac m, auto)[1] |
|
407 |
done |
|
408 |
||
409 |
lemma nth_sbintr: |
|
|
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|
410 |
"bin_nth (sbintrunc m w) n = |
| 24333 | 411 |
(if n < m then bin_nth w n else bin_nth w m)" |
|
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changeset
|
412 |
apply (induct n arbitrary: w m) |
| 24333 | 413 |
apply (case_tac m, simp_all split: bit.splits)[1] |
414 |
apply (case_tac m, simp_all split: bit.splits)[1] |
|
415 |
done |
|
416 |
||
417 |
lemma bin_nth_Bit: |
|
| 37654 | 418 |
"bin_nth (w BIT b) n = (n = 0 & b = (1::bit) | (EX m. n = Suc m & bin_nth w m))" |
| 24333 | 419 |
by (cases n) auto |
420 |
||
|
26086
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|
421 |
lemma bin_nth_Bit0: |
|
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|
422 |
"bin_nth (number_of (Int.Bit0 w)) n \<longleftrightarrow> |
|
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|
423 |
(\<exists>m. n = Suc m \<and> bin_nth (number_of w) m)" |
|
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changeset
|
424 |
using bin_nth_Bit [where w="number_of w" and b="(0::bit)"] by simp |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
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diff
changeset
|
425 |
|
|
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New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
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changeset
|
426 |
lemma bin_nth_Bit1: |
|
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changeset
|
427 |
"bin_nth (number_of (Int.Bit1 w)) n \<longleftrightarrow> |
|
fad87bb608fc
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changeset
|
428 |
n = 0 \<or> (\<exists>m. n = Suc m \<and> bin_nth (number_of w) m)" |
|
fad87bb608fc
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changeset
|
429 |
using bin_nth_Bit [where w="number_of w" and b="(1::bit)"] by simp |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
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diff
changeset
|
430 |
|
| 24333 | 431 |
lemma bintrunc_bintrunc_l: |
432 |
"n <= m ==> (bintrunc m (bintrunc n w) = bintrunc n w)" |
|
433 |
by (rule bin_eqI) (auto simp add : nth_bintr) |
|
434 |
||
435 |
lemma sbintrunc_sbintrunc_l: |
|
436 |
"n <= m ==> (sbintrunc m (sbintrunc n w) = sbintrunc n w)" |
|
| 32439 | 437 |
by (rule bin_eqI) (auto simp: nth_sbintr) |
| 24333 | 438 |
|
439 |
lemma bintrunc_bintrunc_ge: |
|
440 |
"n <= m ==> (bintrunc n (bintrunc m w) = bintrunc n w)" |
|
441 |
by (rule bin_eqI) (auto simp: nth_bintr) |
|
442 |
||
443 |
lemma bintrunc_bintrunc_min [simp]: |
|
444 |
"bintrunc m (bintrunc n w) = bintrunc (min m n) w" |
|
445 |
apply (rule bin_eqI) |
|
446 |
apply (auto simp: nth_bintr) |
|
447 |
done |
|
448 |
||
449 |
lemma sbintrunc_sbintrunc_min [simp]: |
|
450 |
"sbintrunc m (sbintrunc n w) = sbintrunc (min m n) w" |
|
451 |
apply (rule bin_eqI) |
|
|
32642
026e7c6a6d08
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haftmann
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32439
diff
changeset
|
452 |
apply (auto simp: nth_sbintr min_max.inf_absorb1 min_max.inf_absorb2) |
| 24333 | 453 |
done |
454 |
||
455 |
lemmas bintrunc_Pls = |
|
| 45604 | 456 |
bintrunc.Suc [where bin="Int.Pls", simplified bin_last_simps bin_rest_simps] |
| 24333 | 457 |
|
458 |
lemmas bintrunc_Min [simp] = |
|
| 45604 | 459 |
bintrunc.Suc [where bin="Int.Min", simplified bin_last_simps bin_rest_simps] |
| 24333 | 460 |
|
461 |
lemmas bintrunc_BIT [simp] = |
|
| 45604 | 462 |
bintrunc.Suc [where bin="w BIT b", simplified bin_last_simps bin_rest_simps] for w b |
| 24333 | 463 |
|
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
464 |
lemma bintrunc_Bit0 [simp]: |
|
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
465 |
"bintrunc (Suc n) (Int.Bit0 w) = Int.Bit0 (bintrunc n w)" |
| 45847 | 466 |
using bintrunc_BIT [where b="(0::bit)"] by (simp add: BIT_simps) |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
467 |
|
|
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
468 |
lemma bintrunc_Bit1 [simp]: |
|
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
469 |
"bintrunc (Suc n) (Int.Bit1 w) = Int.Bit1 (bintrunc n w)" |
| 45847 | 470 |
using bintrunc_BIT [where b="(1::bit)"] by (simp add: BIT_simps) |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
471 |
|
| 24333 | 472 |
lemmas bintrunc_Sucs = bintrunc_Pls bintrunc_Min bintrunc_BIT |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
473 |
bintrunc_Bit0 bintrunc_Bit1 |
| 45852 | 474 |
bintrunc_Suc_numeral |
| 24333 | 475 |
|
476 |
lemmas sbintrunc_Suc_Pls = |
|
| 45604 | 477 |
sbintrunc.Suc [where bin="Int.Pls", simplified bin_last_simps bin_rest_simps] |
| 24333 | 478 |
|
479 |
lemmas sbintrunc_Suc_Min = |
|
| 45604 | 480 |
sbintrunc.Suc [where bin="Int.Min", simplified bin_last_simps bin_rest_simps] |
| 24333 | 481 |
|
482 |
lemmas sbintrunc_Suc_BIT [simp] = |
|
| 45604 | 483 |
sbintrunc.Suc [where bin="w BIT b", simplified bin_last_simps bin_rest_simps] for w b |
| 24333 | 484 |
|
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
485 |
lemma sbintrunc_Suc_Bit0 [simp]: |
|
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
486 |
"sbintrunc (Suc n) (Int.Bit0 w) = Int.Bit0 (sbintrunc n w)" |
| 45847 | 487 |
using sbintrunc_Suc_BIT [where b="(0::bit)"] by (simp add: BIT_simps) |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
488 |
|
|
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
489 |
lemma sbintrunc_Suc_Bit1 [simp]: |
|
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
490 |
"sbintrunc (Suc n) (Int.Bit1 w) = Int.Bit1 (sbintrunc n w)" |
| 45847 | 491 |
using sbintrunc_Suc_BIT [where b="(1::bit)"] by (simp add: BIT_simps) |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
492 |
|
| 24333 | 493 |
lemmas sbintrunc_Sucs = sbintrunc_Suc_Pls sbintrunc_Suc_Min sbintrunc_Suc_BIT |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
494 |
sbintrunc_Suc_Bit0 sbintrunc_Suc_Bit1 |
| 45855 | 495 |
sbintrunc_Suc_numeral |
| 24333 | 496 |
|
497 |
lemmas sbintrunc_Pls = |
|
|
25919
8b1c0d434824
joined theories IntDef, Numeral, IntArith to theory Int
haftmann
parents:
25349
diff
changeset
|
498 |
sbintrunc.Z [where bin="Int.Pls", |
| 45604 | 499 |
simplified bin_last_simps bin_rest_simps bit.simps] |
| 24333 | 500 |
|
501 |
lemmas sbintrunc_Min = |
|
|
25919
8b1c0d434824
joined theories IntDef, Numeral, IntArith to theory Int
haftmann
parents:
25349
diff
changeset
|
502 |
sbintrunc.Z [where bin="Int.Min", |
| 45604 | 503 |
simplified bin_last_simps bin_rest_simps bit.simps] |
| 24333 | 504 |
|
505 |
lemmas sbintrunc_0_BIT_B0 [simp] = |
|
| 37654 | 506 |
sbintrunc.Z [where bin="w BIT (0::bit)", |
| 45604 | 507 |
simplified bin_last_simps bin_rest_simps bit.simps] for w |
| 24333 | 508 |
|
509 |
lemmas sbintrunc_0_BIT_B1 [simp] = |
|
| 37654 | 510 |
sbintrunc.Z [where bin="w BIT (1::bit)", |
| 45604 | 511 |
simplified bin_last_simps bin_rest_simps bit.simps] for w |
| 24333 | 512 |
|
|
46001
0b562d564d5f
redefine some binary operations on integers work on abstract numerals instead of Int.Pls and Int.Min
huffman
parents:
46000
diff
changeset
|
513 |
lemma sbintrunc_0_Bit0 [simp]: "sbintrunc 0 (Int.Bit0 w) = 0" |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
514 |
using sbintrunc_0_BIT_B0 by simp |
|
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
515 |
|
|
46001
0b562d564d5f
redefine some binary operations on integers work on abstract numerals instead of Int.Pls and Int.Min
huffman
parents:
46000
diff
changeset
|
516 |
lemma sbintrunc_0_Bit1 [simp]: "sbintrunc 0 (Int.Bit1 w) = -1" |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
517 |
using sbintrunc_0_BIT_B1 by simp |
|
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
518 |
|
| 24333 | 519 |
lemmas sbintrunc_0_simps = |
520 |
sbintrunc_Pls sbintrunc_Min sbintrunc_0_BIT_B0 sbintrunc_0_BIT_B1 |
|
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
521 |
sbintrunc_0_Bit0 sbintrunc_0_Bit1 |
| 24333 | 522 |
|
523 |
lemmas bintrunc_simps = bintrunc.Z bintrunc_Sucs |
|
524 |
lemmas sbintrunc_simps = sbintrunc_0_simps sbintrunc_Sucs |
|
525 |
||
526 |
lemma bintrunc_minus: |
|
527 |
"0 < n ==> bintrunc (Suc (n - 1)) w = bintrunc n w" |
|
528 |
by auto |
|
529 |
||
530 |
lemma sbintrunc_minus: |
|
531 |
"0 < n ==> sbintrunc (Suc (n - 1)) w = sbintrunc n w" |
|
532 |
by auto |
|
533 |
||
534 |
lemmas bintrunc_minus_simps = |
|
| 45604 | 535 |
bintrunc_Sucs [THEN [2] bintrunc_minus [symmetric, THEN trans]] |
| 24333 | 536 |
lemmas sbintrunc_minus_simps = |
| 45604 | 537 |
sbintrunc_Sucs [THEN [2] sbintrunc_minus [symmetric, THEN trans]] |
| 24333 | 538 |
|
539 |
lemma bintrunc_n_Pls [simp]: |
|
|
25919
8b1c0d434824
joined theories IntDef, Numeral, IntArith to theory Int
haftmann
parents:
25349
diff
changeset
|
540 |
"bintrunc n Int.Pls = Int.Pls" |
|
46001
0b562d564d5f
redefine some binary operations on integers work on abstract numerals instead of Int.Pls and Int.Min
huffman
parents:
46000
diff
changeset
|
541 |
unfolding Pls_def by simp |
| 24333 | 542 |
|
543 |
lemma sbintrunc_n_PM [simp]: |
|
|
25919
8b1c0d434824
joined theories IntDef, Numeral, IntArith to theory Int
haftmann
parents:
25349
diff
changeset
|
544 |
"sbintrunc n Int.Pls = Int.Pls" |
|
8b1c0d434824
joined theories IntDef, Numeral, IntArith to theory Int
haftmann
parents:
25349
diff
changeset
|
545 |
"sbintrunc n Int.Min = Int.Min" |
|
46001
0b562d564d5f
redefine some binary operations on integers work on abstract numerals instead of Int.Pls and Int.Min
huffman
parents:
46000
diff
changeset
|
546 |
unfolding Pls_def Min_def by simp_all |
| 24333 | 547 |
|
| 45604 | 548 |
lemmas thobini1 = arg_cong [where f = "%w. w BIT b"] for b |
| 24333 | 549 |
|
550 |
lemmas bintrunc_BIT_I = trans [OF bintrunc_BIT thobini1] |
|
551 |
lemmas bintrunc_Min_I = trans [OF bintrunc_Min thobini1] |
|
552 |
||
| 45604 | 553 |
lemmas bmsts = bintrunc_minus_simps(1-3) [THEN thobini1 [THEN [2] trans]] |
| 24333 | 554 |
lemmas bintrunc_Pls_minus_I = bmsts(1) |
555 |
lemmas bintrunc_Min_minus_I = bmsts(2) |
|
556 |
lemmas bintrunc_BIT_minus_I = bmsts(3) |
|
557 |
||
558 |
lemma bintrunc_Suc_lem: |
|
559 |
"bintrunc (Suc n) x = y ==> m = Suc n ==> bintrunc m x = y" |
|
560 |
by auto |
|
561 |
||
562 |
lemmas bintrunc_Suc_Ialts = |
|
| 45604 | 563 |
bintrunc_Min_I [THEN bintrunc_Suc_lem] |
564 |
bintrunc_BIT_I [THEN bintrunc_Suc_lem] |
|
| 24333 | 565 |
|
566 |
lemmas sbintrunc_BIT_I = trans [OF sbintrunc_Suc_BIT thobini1] |
|
567 |
||
568 |
lemmas sbintrunc_Suc_Is = |
|
| 45604 | 569 |
sbintrunc_Sucs(1-3) [THEN thobini1 [THEN [2] trans]] |
| 24333 | 570 |
|
571 |
lemmas sbintrunc_Suc_minus_Is = |
|
| 45604 | 572 |
sbintrunc_minus_simps(1-3) [THEN thobini1 [THEN [2] trans]] |
| 24333 | 573 |
|
574 |
lemma sbintrunc_Suc_lem: |
|
575 |
"sbintrunc (Suc n) x = y ==> m = Suc n ==> sbintrunc m x = y" |
|
576 |
by auto |
|
577 |
||
578 |
lemmas sbintrunc_Suc_Ialts = |
|
| 45604 | 579 |
sbintrunc_Suc_Is [THEN sbintrunc_Suc_lem] |
| 24333 | 580 |
|
581 |
lemma sbintrunc_bintrunc_lt: |
|
582 |
"m > n ==> sbintrunc n (bintrunc m w) = sbintrunc n w" |
|
583 |
by (rule bin_eqI) (auto simp: nth_sbintr nth_bintr) |
|
584 |
||
585 |
lemma bintrunc_sbintrunc_le: |
|
586 |
"m <= Suc n ==> bintrunc m (sbintrunc n w) = bintrunc m w" |
|
587 |
apply (rule bin_eqI) |
|
588 |
apply (auto simp: nth_sbintr nth_bintr) |
|
589 |
apply (subgoal_tac "x=n", safe, arith+)[1] |
|
590 |
apply (subgoal_tac "x=n", safe, arith+)[1] |
|
591 |
done |
|
592 |
||
593 |
lemmas bintrunc_sbintrunc [simp] = order_refl [THEN bintrunc_sbintrunc_le] |
|
594 |
lemmas sbintrunc_bintrunc [simp] = lessI [THEN sbintrunc_bintrunc_lt] |
|
595 |
lemmas bintrunc_bintrunc [simp] = order_refl [THEN bintrunc_bintrunc_l] |
|
596 |
lemmas sbintrunc_sbintrunc [simp] = order_refl [THEN sbintrunc_sbintrunc_l] |
|
597 |
||
598 |
lemma bintrunc_sbintrunc' [simp]: |
|
599 |
"0 < n \<Longrightarrow> bintrunc n (sbintrunc (n - 1) w) = bintrunc n w" |
|
600 |
by (cases n) (auto simp del: bintrunc.Suc) |
|
601 |
||
602 |
lemma sbintrunc_bintrunc' [simp]: |
|
603 |
"0 < n \<Longrightarrow> sbintrunc (n - 1) (bintrunc n w) = sbintrunc (n - 1) w" |
|
604 |
by (cases n) (auto simp del: bintrunc.Suc) |
|
605 |
||
606 |
lemma bin_sbin_eq_iff: |
|
607 |
"bintrunc (Suc n) x = bintrunc (Suc n) y <-> |
|
608 |
sbintrunc n x = sbintrunc n y" |
|
609 |
apply (rule iffI) |
|
610 |
apply (rule box_equals [OF _ sbintrunc_bintrunc sbintrunc_bintrunc]) |
|
611 |
apply simp |
|
612 |
apply (rule box_equals [OF _ bintrunc_sbintrunc bintrunc_sbintrunc]) |
|
613 |
apply simp |
|
614 |
done |
|
615 |
||
616 |
lemma bin_sbin_eq_iff': |
|
617 |
"0 < n \<Longrightarrow> bintrunc n x = bintrunc n y <-> |
|
618 |
sbintrunc (n - 1) x = sbintrunc (n - 1) y" |
|
619 |
by (cases n) (simp_all add: bin_sbin_eq_iff del: bintrunc.Suc) |
|
620 |
||
621 |
lemmas bintrunc_sbintruncS0 [simp] = bintrunc_sbintrunc' [unfolded One_nat_def] |
|
622 |
lemmas sbintrunc_bintruncS0 [simp] = sbintrunc_bintrunc' [unfolded One_nat_def] |
|
623 |
||
624 |
lemmas bintrunc_bintrunc_l' = le_add1 [THEN bintrunc_bintrunc_l] |
|
625 |
lemmas sbintrunc_sbintrunc_l' = le_add1 [THEN sbintrunc_sbintrunc_l] |
|
626 |
||
627 |
(* although bintrunc_minus_simps, if added to default simpset, |
|
628 |
tends to get applied where it's not wanted in developing the theories, |
|
629 |
we get a version for when the word length is given literally *) |
|
630 |
||
631 |
lemmas nat_non0_gr = |
|
| 45604 | 632 |
trans [OF iszero_def [THEN Not_eq_iff [THEN iffD2]] refl] |
| 24333 | 633 |
|
634 |
lemmas bintrunc_pred_simps [simp] = |
|
| 45604 | 635 |
bintrunc_minus_simps [of "number_of bin", simplified nobm1] for bin |
| 24333 | 636 |
|
637 |
lemmas sbintrunc_pred_simps [simp] = |
|
| 45604 | 638 |
sbintrunc_minus_simps [of "number_of bin", simplified nobm1] for bin |
| 24333 | 639 |
|
640 |
lemma no_bintr_alt: |
|
641 |
"number_of (bintrunc n w) = w mod 2 ^ n" |
|
642 |
by (simp add: number_of_eq bintrunc_mod2p) |
|
643 |
||
644 |
lemma no_bintr_alt1: "bintrunc n = (%w. w mod 2 ^ n :: int)" |
|
645 |
by (rule ext) (rule bintrunc_mod2p) |
|
646 |
||
647 |
lemma range_bintrunc: "range (bintrunc n) = {i. 0 <= i & i < 2 ^ n}"
|
|
648 |
apply (unfold no_bintr_alt1) |
|
649 |
apply (auto simp add: image_iff) |
|
650 |
apply (rule exI) |
|
651 |
apply (auto intro: int_mod_lem [THEN iffD1, symmetric]) |
|
652 |
done |
|
653 |
||
654 |
lemma no_bintr: |
|
655 |
"number_of (bintrunc n w) = (number_of w mod 2 ^ n :: int)" |
|
656 |
by (simp add : bintrunc_mod2p number_of_eq) |
|
657 |
||
658 |
lemma no_sbintr_alt2: |
|
659 |
"sbintrunc n = (%w. (w + 2 ^ n) mod 2 ^ Suc n - 2 ^ n :: int)" |
|
660 |
by (rule ext) (simp add : sbintrunc_mod2p) |
|
661 |
||
662 |
lemma no_sbintr: |
|
663 |
"number_of (sbintrunc n w) = |
|
664 |
((number_of w + 2 ^ n) mod 2 ^ Suc n - 2 ^ n :: int)" |
|
665 |
by (simp add : no_sbintr_alt2 number_of_eq) |
|
666 |
||
667 |
lemma range_sbintrunc: |
|
668 |
"range (sbintrunc n) = {i. - (2 ^ n) <= i & i < 2 ^ n}"
|
|
669 |
apply (unfold no_sbintr_alt2) |
|
670 |
apply (auto simp add: image_iff eq_diff_eq) |
|
671 |
apply (rule exI) |
|
672 |
apply (auto intro: int_mod_lem [THEN iffD1, symmetric]) |
|
673 |
done |
|
674 |
||
|
25349
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
675 |
lemma sb_inc_lem: |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
676 |
"(a::int) + 2^k < 0 \<Longrightarrow> a + 2^k + 2^(Suc k) <= (a + 2^k) mod 2^(Suc k)" |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
677 |
apply (erule int_mod_ge' [where n = "2 ^ (Suc k)" and b = "a + 2 ^ k", simplified zless2p]) |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
678 |
apply (rule TrueI) |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
679 |
done |
| 24333 | 680 |
|
|
25349
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
681 |
lemma sb_inc_lem': |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
682 |
"(a::int) < - (2^k) \<Longrightarrow> a + 2^k + 2^(Suc k) <= (a + 2^k) mod 2^(Suc k)" |
| 35048 | 683 |
by (rule sb_inc_lem) simp |
| 24333 | 684 |
|
685 |
lemma sbintrunc_inc: |
|
|
25349
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
686 |
"x < - (2^n) ==> x + 2^(Suc n) <= sbintrunc n x" |
| 24333 | 687 |
unfolding no_sbintr_alt2 by (drule sb_inc_lem') simp |
688 |
||
|
25349
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
689 |
lemma sb_dec_lem: |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
690 |
"(0::int) <= - (2^k) + a ==> (a + 2^k) mod (2 * 2 ^ k) <= - (2 ^ k) + a" |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
691 |
by (rule int_mod_le' [where n = "2 ^ (Suc k)" and b = "a + 2 ^ k", |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
692 |
simplified zless2p, OF _ TrueI, simplified]) |
| 24333 | 693 |
|
|
25349
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
694 |
lemma sb_dec_lem': |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
695 |
"(2::int) ^ k <= a ==> (a + 2 ^ k) mod (2 * 2 ^ k) <= - (2 ^ k) + a" |
|
0d46bea01741
eliminated illegal schematic variables in where/of;
wenzelm
parents:
25134
diff
changeset
|
696 |
by (rule iffD1 [OF diff_le_eq', THEN sb_dec_lem, simplified]) |
| 24333 | 697 |
|
698 |
lemma sbintrunc_dec: |
|
699 |
"x >= (2 ^ n) ==> x - 2 ^ (Suc n) >= sbintrunc n x" |
|
700 |
unfolding no_sbintr_alt2 by (drule sb_dec_lem') simp |
|
701 |
||
| 45604 | 702 |
lemmas zmod_uminus' = zmod_uminus [where b=c] for c |
703 |
lemmas zpower_zmod' = zpower_zmod [where m=c and y=k] for c k |
|
| 24333 | 704 |
|
705 |
lemmas brdmod1s' [symmetric] = |
|
| 30034 | 706 |
mod_add_left_eq mod_add_right_eq |
| 24333 | 707 |
zmod_zsub_left_eq zmod_zsub_right_eq |
708 |
zmod_zmult1_eq zmod_zmult1_eq_rev |
|
709 |
||
710 |
lemmas brdmods' [symmetric] = |
|
711 |
zpower_zmod' [symmetric] |
|
| 30034 | 712 |
trans [OF mod_add_left_eq mod_add_right_eq] |
| 24333 | 713 |
trans [OF zmod_zsub_left_eq zmod_zsub_right_eq] |
714 |
trans [OF zmod_zmult1_eq zmod_zmult1_eq_rev] |
|
715 |
zmod_uminus' [symmetric] |
|
| 30034 | 716 |
mod_add_left_eq [where b = "1::int"] |
| 24333 | 717 |
zmod_zsub_left_eq [where b = "1"] |
718 |
||
719 |
lemmas bintr_arith1s = |
|
| 46000 | 720 |
brdmod1s' [where c="2^n::int", folded bintrunc_mod2p] for n |
| 24333 | 721 |
lemmas bintr_ariths = |
| 46000 | 722 |
brdmods' [where c="2^n::int", folded bintrunc_mod2p] for n |
| 24333 | 723 |
|
| 45604 | 724 |
lemmas m2pths = pos_mod_sign pos_mod_bound [OF zless2p] |
| 24364 | 725 |
|
| 24333 | 726 |
lemma bintr_ge0: "(0 :: int) <= number_of (bintrunc n w)" |
727 |
by (simp add : no_bintr m2pths) |
|
728 |
||
729 |
lemma bintr_lt2p: "number_of (bintrunc n w) < (2 ^ n :: int)" |
|
730 |
by (simp add : no_bintr m2pths) |
|
731 |
||
732 |
lemma bintr_Min: |
|
|
25919
8b1c0d434824
joined theories IntDef, Numeral, IntArith to theory Int
haftmann
parents:
25349
diff
changeset
|
733 |
"number_of (bintrunc n Int.Min) = (2 ^ n :: int) - 1" |
| 24333 | 734 |
by (simp add : no_bintr m1mod2k) |
735 |
||
736 |
lemma sbintr_ge: "(- (2 ^ n) :: int) <= number_of (sbintrunc n w)" |
|
737 |
by (simp add : no_sbintr m2pths) |
|
738 |
||
739 |
lemma sbintr_lt: "number_of (sbintrunc n w) < (2 ^ n :: int)" |
|
740 |
by (simp add : no_sbintr m2pths) |
|
741 |
||
742 |
lemma bintrunc_Suc: |
|
743 |
"bintrunc (Suc n) bin = bintrunc n (bin_rest bin) BIT bin_last bin" |
|
744 |
by (case_tac bin rule: bin_exhaust) auto |
|
745 |
||
746 |
lemma sign_Pls_ge_0: |
|
|
25919
8b1c0d434824
joined theories IntDef, Numeral, IntArith to theory Int
haftmann
parents:
25349
diff
changeset
|
747 |
"(bin_sign bin = Int.Pls) = (number_of bin >= (0 :: int))" |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
748 |
by (induct bin rule: numeral_induct) auto |
| 24333 | 749 |
|
750 |
lemma sign_Min_lt_0: |
|
|
25919
8b1c0d434824
joined theories IntDef, Numeral, IntArith to theory Int
haftmann
parents:
25349
diff
changeset
|
751 |
"(bin_sign bin = Int.Min) = (number_of bin < (0 :: int))" |
|
26086
3c243098b64a
New simpler representation of numerals, using Bit0 and Bit1 instead of BIT, B0, and B1
huffman
parents:
25919
diff
changeset
|
752 |
by (induct bin rule: numeral_induct) auto |
| 24333 | 753 |
|
754 |
lemmas sign_Min_neg = trans [OF sign_Min_lt_0 neg_def [symmetric]] |
|
755 |
||
756 |
lemma bin_rest_trunc: |
|
|
45954
f67d3bb5f09c
use 'induct arbitrary' instead of universal quantifiers
huffman
parents:
45953
diff
changeset
|
757 |
"(bin_rest (bintrunc n bin)) = bintrunc (n - 1) (bin_rest bin)" |
|
f67d3bb5f09c
use 'induct arbitrary' instead of universal quantifiers
huffman
parents:
45953
diff
changeset
|
758 |
by (induct n arbitrary: bin) auto |
| 24333 | 759 |
|
760 |
lemma bin_rest_power_trunc [rule_format] : |
|
| 30971 | 761 |
"(bin_rest ^^ k) (bintrunc n bin) = |
762 |
bintrunc (n - k) ((bin_rest ^^ k) bin)" |
|
| 24333 | 763 |
by (induct k) (auto simp: bin_rest_trunc) |
764 |
||
765 |
lemma bin_rest_trunc_i: |
|
766 |
"bintrunc n (bin_rest bin) = bin_rest (bintrunc (Suc n) bin)" |
|
767 |
by auto |
|
768 |
||
769 |
lemma bin_rest_strunc: |
|
|
45954
f67d3bb5f09c
use 'induct arbitrary' instead of universal quantifiers
huffman
parents:
45953
diff
changeset
|
770 |
"bin_rest (sbintrunc (Suc n) bin) = sbintrunc n (bin_rest bin)" |
|
f67d3bb5f09c
use 'induct arbitrary' instead of universal quantifiers
huffman
parents:
45953
diff
changeset
|
771 |
by (induct n arbitrary: bin) auto |
| 24333 | 772 |
|
773 |
lemma bintrunc_rest [simp]: |
|
|
45954
f67d3bb5f09c
use 'induct arbitrary' instead of universal quantifiers
huffman
parents:
45953
diff
changeset
|
774 |
"bintrunc n (bin_rest (bintrunc n bin)) = bin_rest (bintrunc n bin)" |
|
f67d3bb5f09c
use 'induct arbitrary' instead of universal quantifiers
huffman
parents:
45953
diff
changeset
|
775 |
apply (induct n arbitrary: bin, simp) |
| 24333 | 776 |
apply (case_tac bin rule: bin_exhaust) |
777 |
apply (auto simp: bintrunc_bintrunc_l) |
|
778 |
done |
|
779 |
||
780 |
lemma sbintrunc_rest [simp]: |
|
|
45954
f67d3bb5f09c
use 'induct arbitrary' instead of universal quantifiers
huffman
parents:
45953
diff
changeset
|
781 |
"sbintrunc n (bin_rest (sbintrunc n bin)) = bin_rest (sbintrunc n bin)" |
|
f67d3bb5f09c
use 'induct arbitrary' instead of universal quantifiers
huffman
parents:
45953
diff
changeset
|
782 |
apply (induct n arbitrary: bin, simp) |
| 24333 | 783 |
apply (case_tac bin rule: bin_exhaust) |
784 |
apply (auto simp: bintrunc_bintrunc_l split: bit.splits) |
|
785 |
done |
|
786 |
||
787 |
lemma bintrunc_rest': |
|
788 |
"bintrunc n o bin_rest o bintrunc n = bin_rest o bintrunc n" |
|
789 |
by (rule ext) auto |
|
790 |
||
791 |
lemma sbintrunc_rest' : |
|
792 |
"sbintrunc n o bin_rest o sbintrunc n = bin_rest o sbintrunc n" |
|
793 |
by (rule ext) auto |
|
794 |
||
795 |
lemma rco_lem: |
|
| 30971 | 796 |
"f o g o f = g o f ==> f o (g o f) ^^ n = g ^^ n o f" |
| 24333 | 797 |
apply (rule ext) |
798 |
apply (induct_tac n) |
|
799 |
apply (simp_all (no_asm)) |
|
800 |
apply (drule fun_cong) |
|
801 |
apply (unfold o_def) |
|
802 |
apply (erule trans) |
|
803 |
apply simp |
|
804 |
done |
|
805 |
||
| 30971 | 806 |
lemma rco_alt: "(f o g) ^^ n o f = f o (g o f) ^^ n" |
| 24333 | 807 |
apply (rule ext) |
808 |
apply (induct n) |
|
809 |
apply (simp_all add: o_def) |
|
810 |
done |
|
811 |
||
812 |
lemmas rco_bintr = bintrunc_rest' |
|
813 |
[THEN rco_lem [THEN fun_cong], unfolded o_def] |
|
814 |
lemmas rco_sbintr = sbintrunc_rest' |
|
815 |
[THEN rco_lem [THEN fun_cong], unfolded o_def] |
|
816 |
||
| 24364 | 817 |
subsection {* Splitting and concatenation *}
|
818 |
||
| 26557 | 819 |
primrec bin_split :: "nat \<Rightarrow> int \<Rightarrow> int \<times> int" where |
|
46001
0b562d564d5f
redefine some binary operations on integers work on abstract numerals instead of Int.Pls and Int.Min
huffman
parents:
46000
diff
changeset
|
820 |
Z: "bin_split 0 w = (w, 0)" |
| 26557 | 821 |
| Suc: "bin_split (Suc n) w = (let (w1, w2) = bin_split n (bin_rest w) |
822 |
in (w1, w2 BIT bin_last w))" |
|
| 24364 | 823 |
|
| 37667 | 824 |
lemma [code]: |
825 |
"bin_split (Suc n) w = (let (w1, w2) = bin_split n (bin_rest w) in (w1, w2 BIT bin_last w))" |
|
826 |
"bin_split 0 w = (w, 0)" |
|
827 |
by (simp_all add: Pls_def) |
|
828 |
||
| 26557 | 829 |
primrec bin_cat :: "int \<Rightarrow> nat \<Rightarrow> int \<Rightarrow> int" where |
830 |
Z: "bin_cat w 0 v = w" |
|
831 |
| Suc: "bin_cat w (Suc n) v = bin_cat w n (bin_rest v) BIT bin_last v" |
|
| 24364 | 832 |
|
833 |
subsection {* Miscellaneous lemmas *}
|
|
834 |
||
|
30952
7ab2716dd93b
power operation on functions with syntax o^; power operation on relations with syntax ^^
haftmann
parents:
30940
diff
changeset
|
835 |
lemma funpow_minus_simp: |
| 30971 | 836 |
"0 < n \<Longrightarrow> f ^^ n = f \<circ> f ^^ (n - 1)" |
|
30952
7ab2716dd93b
power operation on functions with syntax o^; power operation on relations with syntax ^^
haftmann
parents:
30940
diff
changeset
|
837 |
by (cases n) simp_all |
| 24364 | 838 |
|
839 |
lemmas funpow_pred_simp [simp] = |
|
| 45604 | 840 |
funpow_minus_simp [of "number_of bin", simplified nobm1] for bin |
| 24364 | 841 |
|
842 |
lemmas replicate_minus_simp = |
|
| 45604 | 843 |
trans [OF gen_minus [where f = "%n. replicate n x"] replicate.replicate_Suc] for x |
| 24364 | 844 |
|
845 |
lemmas replicate_pred_simp [simp] = |
|
| 45604 | 846 |
replicate_minus_simp [of "number_of bin", simplified nobm1] for bin |
| 24364 | 847 |
|
| 45604 | 848 |
lemmas power_Suc_no [simp] = power_Suc [of "number_of a"] for a |
| 24364 | 849 |
|
850 |
lemmas power_minus_simp = |
|
| 45604 | 851 |
trans [OF gen_minus [where f = "power f"] power_Suc] for f |
| 24364 | 852 |
|
853 |
lemmas power_pred_simp = |
|
| 45604 | 854 |
power_minus_simp [of "number_of bin", simplified nobm1] for bin |
855 |
lemmas power_pred_simp_no [simp] = power_pred_simp [where f= "number_of f"] for f |
|
| 24364 | 856 |
|
857 |
lemma list_exhaust_size_gt0: |
|
858 |
assumes y: "\<And>a list. y = a # list \<Longrightarrow> P" |
|
859 |
shows "0 < length y \<Longrightarrow> P" |
|
860 |
apply (cases y, simp) |
|
861 |
apply (rule y) |
|
|
44890
22f665a2e91c
new fastforce replacing fastsimp - less confusing name
nipkow
parents:
41413
diff
changeset
|
862 |
apply fastforce |
| 24364 | 863 |
done |
864 |
||
865 |
lemma list_exhaust_size_eq0: |
|
866 |
assumes y: "y = [] \<Longrightarrow> P" |
|
867 |
shows "length y = 0 \<Longrightarrow> P" |
|
868 |
apply (cases y) |
|
869 |
apply (rule y, simp) |
|
870 |
apply simp |
|
871 |
done |
|
872 |
||
873 |
lemma size_Cons_lem_eq: |
|
874 |
"y = xa # list ==> size y = Suc k ==> size list = k" |
|
875 |
by auto |
|
876 |
||
877 |
lemma size_Cons_lem_eq_bin: |
|
|
25919
8b1c0d434824
joined theories IntDef, Numeral, IntArith to theory Int
haftmann
parents:
25349
diff
changeset
|
878 |
"y = xa # list ==> size y = number_of (Int.succ k) ==> |
| 24364 | 879 |
size list = number_of k" |
880 |
by (auto simp: pred_def succ_def split add : split_if_asm) |
|
881 |
||
|
44939
5930d35c976d
removed unused legacy lemma names, some comment cleanup.
kleing
parents:
44890
diff
changeset
|
882 |
lemmas ls_splits = prod.split prod.split_asm split_if_asm |
| 24333 | 883 |
|
| 37654 | 884 |
lemma not_B1_is_B0: "y \<noteq> (1::bit) \<Longrightarrow> y = (0::bit)" |
| 24333 | 885 |
by (cases y) auto |
886 |
||
887 |
lemma B1_ass_B0: |
|
| 37654 | 888 |
assumes y: "y = (0::bit) \<Longrightarrow> y = (1::bit)" |
889 |
shows "y = (1::bit)" |
|
| 24333 | 890 |
apply (rule classical) |
891 |
apply (drule not_B1_is_B0) |
|
892 |
apply (erule y) |
|
893 |
done |
|
894 |
||
895 |
-- "simplifications for specific word lengths" |
|
896 |
lemmas n2s_ths [THEN eq_reflection] = add_2_eq_Suc add_2_eq_Suc' |
|
897 |
||
898 |
lemmas s2n_ths = n2s_ths [symmetric] |
|
899 |
||
900 |
end |