| author | nipkow |
| Tue, 17 Jun 2025 14:11:40 +0200 | |
| changeset 82733 | 8b537e1af2ec |
| parent 81805 | 1655c4a3516b |
| permissions | -rw-r--r-- |
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(* Author: Stefan Berghofer et al. |
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*) |
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section \<open>Signed division: negative results rounded towards zero rather than minus infinity.\<close> |
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theory Signed_Division |
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imports Main |
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begin |
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class signed_divide = |
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fixes signed_divide :: \<open>'a \<Rightarrow> 'a \<Rightarrow> 'a\<close> (infixl \<open>sdiv\<close> 70) |
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class signed_modulo = |
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fixes signed_modulo :: \<open>'a \<Rightarrow> 'a \<Rightarrow> 'a\<close> (infixl \<open>smod\<close> 70) |
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class signed_division = comm_semiring_1_cancel + signed_divide + signed_modulo + |
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assumes sdiv_mult_smod_eq: \<open>a sdiv b * b + a smod b = a\<close> |
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begin |
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lemma mult_sdiv_smod_eq: |
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\<open>b * (a sdiv b) + a smod b = a\<close> |
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using sdiv_mult_smod_eq [of a b] by (simp add: ac_simps) |
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lemma smod_sdiv_mult_eq: |
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\<open>a smod b + a sdiv b * b = a\<close> |
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using sdiv_mult_smod_eq [of a b] by (simp add: ac_simps) |
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lemma smod_mult_sdiv_eq: |
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\<open>a smod b + b * (a sdiv b) = a\<close> |
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using sdiv_mult_smod_eq [of a b] by (simp add: ac_simps) |
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lemma minus_sdiv_mult_eq_smod: |
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\<open>a - a sdiv b * b = a smod b\<close> |
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by (rule add_implies_diff [symmetric]) (fact smod_sdiv_mult_eq) |
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lemma minus_mult_sdiv_eq_smod: |
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\<open>a - b * (a sdiv b) = a smod b\<close> |
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by (rule add_implies_diff [symmetric]) (fact smod_mult_sdiv_eq) |
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lemma minus_smod_eq_sdiv_mult: |
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\<open>a - a smod b = a sdiv b * b\<close> |
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by (rule add_implies_diff [symmetric]) (fact sdiv_mult_smod_eq) |
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lemma minus_smod_eq_mult_sdiv: |
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\<open>a - a smod b = b * (a sdiv b)\<close> |
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by (rule add_implies_diff [symmetric]) (fact mult_sdiv_smod_eq) |
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end |
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text \<open> |
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\noindent The following specification of division is named ``T-division'' in \<^cite>\<open>"leijen01"\<close>. |
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It is motivated by ISO C99, which in turn adopted the typical behavior of |
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hardware modern in the beginning of the 1990ies; but note ISO C99 describes |
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the instance on machine words, not mathematical integers. |
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\<close> |
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||
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instantiation int :: signed_division |
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begin |
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definition signed_divide_int :: \<open>int \<Rightarrow> int \<Rightarrow> int\<close> |
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where \<open>k sdiv l = sgn k * sgn l * (\<bar>k\<bar> div \<bar>l\<bar>)\<close> for k l :: int |
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definition signed_modulo_int :: \<open>int \<Rightarrow> int \<Rightarrow> int\<close> |
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where \<open>k smod l = sgn k * (\<bar>k\<bar> mod \<bar>l\<bar>)\<close> for k l :: int |
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instance by standard |
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(simp add: signed_divide_int_def signed_modulo_int_def div_abs_eq mod_abs_eq algebra_simps) |
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end |
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lemma divide_int_eq_signed_divide_int: |
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\<open>k div l = k sdiv l - of_bool (l \<noteq> 0 \<and> sgn k \<noteq> sgn l \<and> \<not> l dvd k)\<close> |
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for k l :: int |
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by (simp add: div_eq_div_abs [of k l] signed_divide_int_def) |
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lemma signed_divide_int_eq_divide_int: |
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\<open>k sdiv l = k div l + of_bool (l \<noteq> 0 \<and> sgn k \<noteq> sgn l \<and> \<not> l dvd k)\<close> |
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for k l :: int |
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by (simp add: divide_int_eq_signed_divide_int) |
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lemma modulo_int_eq_signed_modulo_int: |
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\<open>k mod l = k smod l + l * of_bool (sgn k \<noteq> sgn l \<and> \<not> l dvd k)\<close> |
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for k l :: int |
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by (simp add: mod_eq_mod_abs [of k l] signed_modulo_int_def) |
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lemma signed_modulo_int_eq_modulo_int: |
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\<open>k smod l = k mod l - l * of_bool (sgn k \<noteq> sgn l \<and> \<not> l dvd k)\<close> |
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for k l :: int |
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by (simp add: modulo_int_eq_signed_modulo_int) |
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lemma sdiv_int_div_0: |
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"(x :: int) sdiv 0 = 0" |
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by (clarsimp simp: signed_divide_int_def) |
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lemma sdiv_int_0_div [simp]: |
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"0 sdiv (x :: int) = 0" |
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by (clarsimp simp: signed_divide_int_def) |
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lemma smod_int_alt_def: |
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"(a::int) smod b = sgn (a) * (abs a mod abs b)" |
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by (fact signed_modulo_int_def) |
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lemma int_sdiv_simps [simp]: |
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"(a :: int) sdiv 1 = a" |
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"(a :: int) sdiv 0 = 0" |
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"(a :: int) sdiv -1 = -a" |
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by (auto simp: signed_divide_int_def sgn_if) |
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lemma smod_int_mod_0 [simp]: |
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"x smod (0 :: int) = x" |
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by (clarsimp simp: signed_modulo_int_def abs_mult_sgn ac_simps) |
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lemma smod_int_0_mod [simp]: |
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"0 smod (x :: int) = 0" |
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by (clarsimp simp: smod_int_alt_def) |
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lemma sgn_sdiv_eq_sgn_mult: |
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"a sdiv b \<noteq> 0 \<Longrightarrow> sgn ((a :: int) sdiv b) = sgn (a * b)" |
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by (auto simp: signed_divide_int_def sgn_div_eq_sgn_mult sgn_mult) |
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lemma int_sdiv_same_is_1 [simp]: |
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assumes "a \<noteq> 0" |
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shows "((a :: int) sdiv b = a) = (b = 1)" |
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proof - |
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have "b = 1" if "a sdiv b = a" |
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proof - |
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have "b>0" |
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by (smt (verit, ccfv_threshold) assms mult_cancel_left2 sgn_if sgn_mult |
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sgn_sdiv_eq_sgn_mult that) |
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then show ?thesis |
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by (smt (verit) assms dvd_eq_mod_eq_0 int_div_less_self of_bool_eq(1,2) sgn_if |
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signed_divide_int_eq_divide_int that zdiv_zminus1_eq_if) |
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qed |
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then show ?thesis |
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by auto |
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qed |
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lemma int_sdiv_negated_is_minus1 [simp]: |
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"a \<noteq> 0 \<Longrightarrow> ((a :: int) sdiv b = - a) = (b = -1)" |
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using int_sdiv_same_is_1 [of _ "-b"] |
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using signed_divide_int_def by fastforce |
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lemma sdiv_int_range: |
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\<open>a sdiv b \<in> {- \<bar>a\<bar>..\<bar>a\<bar>}\<close> for a b :: int
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using zdiv_mono2 [of \<open>\<bar>a\<bar>\<close> 1 \<open>\<bar>b\<bar>\<close>] |
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by (cases \<open>b = 0\<close>; cases \<open>sgn b = sgn a\<close>) |
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(auto simp add: signed_divide_int_def pos_imp_zdiv_nonneg_iff |
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dest!: sgn_not_eq_imp intro: order_trans [of _ 0]) |
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lemma smod_int_range: |
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\<open>a smod b \<in> {- \<bar>b\<bar> + 1..\<bar>b\<bar> - 1}\<close>
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if \<open>b \<noteq> 0\<close> for a b :: int |
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proof - |
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define m n where \<open>m = nat \<bar>a\<bar>\<close> \<open>n = nat \<bar>b\<bar>\<close> |
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then have \<open>\<bar>a\<bar> = int m\<close> \<open>\<bar>b\<bar> = int n\<close> |
|
156 |
by simp_all |
|
157 |
with that have \<open>n > 0\<close> |
|
158 |
by simp |
|
159 |
with signed_modulo_int_def [of a b] \<open>\<bar>a\<bar> = int m\<close> \<open>\<bar>b\<bar> = int n\<close> |
|
160 |
show ?thesis |
|
161 |
by (auto simp add: sgn_if diff_le_eq int_one_le_iff_zero_less simp flip: of_nat_mod of_nat_diff) |
|
162 |
qed |
|
| 72768 | 163 |
|
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lemma smod_int_compares: |
|
165 |
"\<lbrakk> 0 \<le> a; 0 < b \<rbrakk> \<Longrightarrow> (a :: int) smod b < b" |
|
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"\<lbrakk> 0 \<le> a; 0 < b \<rbrakk> \<Longrightarrow> 0 \<le> (a :: int) smod b" |
|
167 |
"\<lbrakk> a \<le> 0; 0 < b \<rbrakk> \<Longrightarrow> -b < (a :: int) smod b" |
|
168 |
"\<lbrakk> a \<le> 0; 0 < b \<rbrakk> \<Longrightarrow> (a :: int) smod b \<le> 0" |
|
169 |
"\<lbrakk> 0 \<le> a; b < 0 \<rbrakk> \<Longrightarrow> (a :: int) smod b < - b" |
|
170 |
"\<lbrakk> 0 \<le> a; b < 0 \<rbrakk> \<Longrightarrow> 0 \<le> (a :: int) smod b" |
|
171 |
"\<lbrakk> a \<le> 0; b < 0 \<rbrakk> \<Longrightarrow> (a :: int) smod b \<le> 0" |
|
172 |
"\<lbrakk> a \<le> 0; b < 0 \<rbrakk> \<Longrightarrow> b \<le> (a :: int) smod b" |
|
| 81805 | 173 |
using smod_int_range [where a=a and b=b] |
174 |
by (auto simp: add1_zle_eq smod_int_alt_def sgn_if) |
|
| 72768 | 175 |
|
176 |
lemma smod_mod_positive: |
|
177 |
"\<lbrakk> 0 \<le> (a :: int); 0 \<le> b \<rbrakk> \<Longrightarrow> a smod b = a mod b" |
|
178 |
by (clarsimp simp: smod_int_alt_def zsgn_def) |
|
179 |
||
| 74592 | 180 |
lemma minus_sdiv_eq [simp]: |
181 |
\<open>- k sdiv l = - (k sdiv l)\<close> for k l :: int |
|
182 |
by (simp add: signed_divide_int_def) |
|
183 |
||
184 |
lemma sdiv_minus_eq [simp]: |
|
185 |
\<open>k sdiv - l = - (k sdiv l)\<close> for k l :: int |
|
186 |
by (simp add: signed_divide_int_def) |
|
187 |
||
188 |
lemma sdiv_int_numeral_numeral [simp]: |
|
189 |
\<open>numeral m sdiv numeral n = numeral m div (numeral n :: int)\<close> |
|
190 |
by (simp add: signed_divide_int_def) |
|
191 |
||
192 |
lemma minus_smod_eq [simp]: |
|
193 |
\<open>- k smod l = - (k smod l)\<close> for k l :: int |
|
194 |
by (simp add: smod_int_alt_def) |
|
195 |
||
196 |
lemma smod_minus_eq [simp]: |
|
197 |
\<open>k smod - l = k smod l\<close> for k l :: int |
|
198 |
by (simp add: smod_int_alt_def) |
|
199 |
||
200 |
lemma smod_int_numeral_numeral [simp]: |
|
201 |
\<open>numeral m smod numeral n = numeral m mod (numeral n :: int)\<close> |
|
202 |
by (simp add: smod_int_alt_def) |
|
203 |
||
|
72281
beeadb35e357
more thorough treatment of division, particularly signed division on int and word
haftmann
parents:
diff
changeset
|
204 |
end |