| author | wenzelm |
| Sun, 08 Jul 2007 19:51:58 +0200 | |
| changeset 23655 | d2d1138e0ddc |
| parent 23477 | f4b83f03cac9 |
| child 23879 | 4776af8be741 |
| permissions | -rw-r--r-- |
| 14770 | 1 |
(* Title: HOL/OrderedGroup.thy |
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ID: $Id$ |
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Author: Gertrud Bauer, Steven Obua, Lawrence C Paulson, and Markus Wenzel, |
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c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
4 |
with contributions by Jeremy Avigad |
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*) |
6 |
||
7 |
header {* Ordered Groups *}
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||
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theory OrderedGroup |
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imports Lattices |
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uses "~~/src/Provers/Arith/abel_cancel.ML" |
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begin |
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14 |
text {*
|
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15 |
The theory of partially ordered groups is taken from the books: |
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\begin{itemize}
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\item \emph{Lattice Theory} by Garret Birkhoff, American Mathematical Society 1979
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\item \emph{Partially Ordered Algebraic Systems}, Pergamon Press 1963
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19 |
\end{itemize}
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Most of the used notions can also be looked up in |
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\begin{itemize}
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\item \url{http://www.mathworld.com} by Eric Weisstein et. al.
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\item \emph{Algebra I} by van der Waerden, Springer.
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24 |
\end{itemize}
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*} |
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||
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subsection {* Semigroups and Monoids *}
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class semigroup_add = plus + |
30 |
assumes add_assoc: "(a \<^loc>+ b) \<^loc>+ c = a \<^loc>+ (b \<^loc>+ c)" |
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31 |
||
32 |
class ab_semigroup_add = semigroup_add + |
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assumes add_commute: "a \<^loc>+ b = b \<^loc>+ a" |
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lemma add_left_commute: "a + (b + c) = b + (a + (c::'a::ab_semigroup_add))" |
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by (rule mk_left_commute [of "op +", OF add_assoc add_commute]) |
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37 |
||
38 |
theorems add_ac = add_assoc add_commute add_left_commute |
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39 |
||
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class semigroup_mult = times + |
41 |
assumes mult_assoc: "(a \<^loc>* b) \<^loc>* c = a \<^loc>* (b \<^loc>* c)" |
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|
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class ab_semigroup_mult = semigroup_mult + |
44 |
assumes mult_commute: "a \<^loc>* b = b \<^loc>* a" |
|
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begin |
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|
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lemma mult_left_commute: "a \<^loc>* (b \<^loc>* c) = b \<^loc>* (a \<^loc>* c)" |
48 |
by (rule mk_left_commute [of "op \<^loc>*", OF mult_assoc mult_commute]) |
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49 |
||
50 |
end |
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theorems mult_ac = mult_assoc mult_commute mult_left_commute |
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53 |
||
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class monoid_add = zero + semigroup_add + |
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assumes add_0_left [simp]: "\<^loc>0 \<^loc>+ a = a" and add_0_right [simp]: "a \<^loc>+ \<^loc>0 = a" |
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56 |
||
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class comm_monoid_add = zero + ab_semigroup_add + |
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assumes add_0: "\<^loc>0 \<^loc>+ a = a" |
59 |
||
60 |
instance comm_monoid_add < monoid_add |
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by intro_classes (insert comm_monoid_add_class.zero_plus.add_0, simp_all add: add_commute, auto) |
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class monoid_mult = one + semigroup_mult + |
64 |
assumes mult_1_left [simp]: "\<^loc>1 \<^loc>* a = a" |
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assumes mult_1_right [simp]: "a \<^loc>* \<^loc>1 = a" |
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class comm_monoid_mult = one + ab_semigroup_mult + |
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assumes mult_1: "\<^loc>1 \<^loc>* a = a" |
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instance comm_monoid_mult \<subseteq> monoid_mult |
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by intro_classes (insert mult_1, simp_all add: mult_commute, auto) |
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|
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class cancel_semigroup_add = semigroup_add + |
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assumes add_left_imp_eq: "a \<^loc>+ b = a \<^loc>+ c \<Longrightarrow> b = c" |
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assumes add_right_imp_eq: "b \<^loc>+ a = c \<^loc>+ a \<Longrightarrow> b = c" |
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class cancel_ab_semigroup_add = ab_semigroup_add + |
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assumes add_imp_eq: "a \<^loc>+ b = a \<^loc>+ c \<Longrightarrow> b = c" |
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instance cancel_ab_semigroup_add \<subseteq> cancel_semigroup_add |
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proof intro_classes |
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fix a b c :: 'a |
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assume "a + b = a + c" |
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then show "b = c" by (rule add_imp_eq) |
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next |
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fix a b c :: 'a |
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assume "b + a = c + a" |
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then have "a + b = a + c" by (simp only: add_commute) |
89 |
then show "b = c" by (rule add_imp_eq) |
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qed |
91 |
||
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lemma add_left_cancel [simp]: |
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"a + b = a + c \<longleftrightarrow> b = (c \<Colon> 'a\<Colon>cancel_semigroup_add)" |
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by (blast dest: add_left_imp_eq) |
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95 |
||
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lemma add_right_cancel [simp]: |
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"b + a = c + a \<longleftrightarrow> b = (c \<Colon> 'a\<Colon>cancel_semigroup_add)" |
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by (blast dest: add_right_imp_eq) |
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||
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subsection {* Groups *}
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101 |
||
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class ab_group_add = minus + comm_monoid_add + |
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assumes ab_left_minus: "uminus a \<^loc>+ a = \<^loc>0" |
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assumes ab_diff_minus: "a \<^loc>- b = a \<^loc>+ (uminus b)" |
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105 |
||
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class group_add = minus + monoid_add + |
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assumes left_minus [simp]: "uminus a \<^loc>+ a = \<^loc>0" |
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assumes diff_minus: "a \<^loc>- b = a \<^loc>+ (uminus b)" |
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instance ab_group_add < group_add |
111 |
by intro_classes (simp_all add: ab_left_minus ab_diff_minus) |
|
112 |
||
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instance ab_group_add \<subseteq> cancel_ab_semigroup_add |
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proof intro_classes |
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fix a b c :: 'a |
116 |
assume "a + b = a + c" |
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then have "uminus a + a + b = uminus a + a + c" unfolding add_assoc by simp |
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then show "b = c" by simp |
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qed |
120 |
||
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lemma minus_add_cancel: "-(a::'a::group_add) + (a+b) = b" |
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by(simp add:add_assoc[symmetric]) |
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123 |
||
124 |
lemma minus_zero[simp]: "-(0::'a::group_add) = 0" |
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proof - |
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have "-(0::'a::group_add) = - 0 + (0+0)" by(simp only: add_0_right) |
127 |
also have "\<dots> = 0" by(rule minus_add_cancel) |
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finally show ?thesis . |
129 |
qed |
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130 |
||
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lemma minus_minus[simp]: "- (-(a::'a::group_add)) = a" |
132 |
proof - |
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have "-(-a) = -(-a) + (-a + a)" by simp |
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also have "\<dots> = a" by(rule minus_add_cancel) |
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finally show ?thesis . |
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qed |
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lemma right_minus[simp]: "a + - a = (0::'a::group_add)" |
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proof - |
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have "a + -a = -(-a) + -a" by simp |
141 |
also have "\<dots> = 0" thm group_add.left_minus by(rule left_minus) |
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finally show ?thesis . |
143 |
qed |
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144 |
||
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lemma right_minus_eq: "(a - b = 0) = (a = (b::'a::group_add))" |
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proof |
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assume "a - b = 0" |
148 |
have "a = (a - b) + b" by (simp add:diff_minus add_assoc) |
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149 |
also have "\<dots> = b" using `a - b = 0` by simp |
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finally show "a = b" . |
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next |
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assume "a = b" thus "a - b = 0" by (simp add: diff_minus) |
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qed |
154 |
||
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lemma equals_zero_I: assumes "a+b = 0" shows "-a = (b::'a::group_add)" |
156 |
proof - |
|
157 |
have "- a = -a + (a+b)" using assms by simp |
|
158 |
also have "\<dots> = b" by(simp add:add_assoc[symmetric]) |
|
159 |
finally show ?thesis . |
|
160 |
qed |
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| 14738 | 161 |
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lemma diff_self[simp]: "(a::'a::group_add) - a = 0" |
163 |
by(simp add: diff_minus) |
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| 14738 | 164 |
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lemma diff_0 [simp]: "(0::'a::group_add) - a = -a" |
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by (simp add: diff_minus) |
167 |
||
| 23085 | 168 |
lemma diff_0_right [simp]: "a - (0::'a::group_add) = a" |
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by (simp add: diff_minus) |
170 |
||
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lemma diff_minus_eq_add [simp]: "a - - b = a + (b::'a::group_add)" |
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by (simp add: diff_minus) |
173 |
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lemma uminus_add_conv_diff: "-a + b = b - (a::'a::ab_group_add)" |
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by(simp add:diff_minus add_commute) |
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176 |
|
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lemma neg_equal_iff_equal [simp]: "(-a = -b) = (a = (b::'a::group_add))" |
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proof |
179 |
assume "- a = - b" |
|
180 |
hence "- (- a) = - (- b)" |
|
181 |
by simp |
|
182 |
thus "a=b" by simp |
|
183 |
next |
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184 |
assume "a=b" |
|
185 |
thus "-a = -b" by simp |
|
186 |
qed |
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187 |
||
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lemma neg_equal_0_iff_equal [simp]: "(-a = 0) = (a = (0::'a::group_add))" |
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by (subst neg_equal_iff_equal [symmetric], simp) |
190 |
||
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lemma neg_0_equal_iff_equal [simp]: "(0 = -a) = (0 = (a::'a::group_add))" |
| 14738 | 192 |
by (subst neg_equal_iff_equal [symmetric], simp) |
193 |
||
194 |
text{*The next two equations can make the simplifier loop!*}
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195 |
||
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lemma equation_minus_iff: "(a = - b) = (b = - (a::'a::group_add))" |
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proof - |
198 |
have "(- (-a) = - b) = (- a = b)" by (rule neg_equal_iff_equal) |
|
199 |
thus ?thesis by (simp add: eq_commute) |
|
200 |
qed |
|
201 |
||
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lemma minus_equation_iff: "(- a = b) = (- (b::'a::group_add) = a)" |
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proof - |
204 |
have "(- a = - (-b)) = (a = -b)" by (rule neg_equal_iff_equal) |
|
205 |
thus ?thesis by (simp add: eq_commute) |
|
206 |
qed |
|
207 |
||
208 |
lemma minus_add_distrib [simp]: "- (a + b) = -a + -(b::'a::ab_group_add)" |
|
209 |
apply (rule equals_zero_I) |
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apply (simp add: add_ac) |
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done |
212 |
||
213 |
lemma minus_diff_eq [simp]: "- (a - b) = b - (a::'a::ab_group_add)" |
|
214 |
by (simp add: diff_minus add_commute) |
|
215 |
||
216 |
subsection {* (Partially) Ordered Groups *}
|
|
217 |
||
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class pordered_ab_semigroup_add = order + ab_semigroup_add + |
219 |
assumes add_left_mono: "a \<sqsubseteq> b \<Longrightarrow> c \<^loc>+ a \<sqsubseteq> c \<^loc>+ b" |
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| 14738 | 220 |
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class pordered_cancel_ab_semigroup_add = |
222 |
pordered_ab_semigroup_add + cancel_ab_semigroup_add |
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| 14738 | 223 |
|
| 22390 | 224 |
class pordered_ab_semigroup_add_imp_le = pordered_cancel_ab_semigroup_add + |
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225 |
assumes add_le_imp_le_left: "c \<^loc>+ a \<sqsubseteq> c \<^loc>+ b \<Longrightarrow> a \<sqsubseteq> b" |
| 14738 | 226 |
|
| 22390 | 227 |
class pordered_ab_group_add = ab_group_add + pordered_ab_semigroup_add |
| 14738 | 228 |
|
229 |
instance pordered_ab_group_add \<subseteq> pordered_ab_semigroup_add_imp_le |
|
230 |
proof |
|
231 |
fix a b c :: 'a |
|
232 |
assume "c + a \<le> c + b" |
|
233 |
hence "(-c) + (c + a) \<le> (-c) + (c + b)" by (rule add_left_mono) |
|
234 |
hence "((-c) + c) + a \<le> ((-c) + c) + b" by (simp only: add_assoc) |
|
235 |
thus "a \<le> b" by simp |
|
236 |
qed |
|
237 |
||
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class ordered_cancel_ab_semigroup_add = pordered_cancel_ab_semigroup_add + linorder |
| 14738 | 239 |
|
240 |
instance ordered_cancel_ab_semigroup_add \<subseteq> pordered_ab_semigroup_add_imp_le |
|
241 |
proof |
|
242 |
fix a b c :: 'a |
|
243 |
assume le: "c + a <= c + b" |
|
244 |
show "a <= b" |
|
245 |
proof (rule ccontr) |
|
246 |
assume w: "~ a \<le> b" |
|
247 |
hence "b <= a" by (simp add: linorder_not_le) |
|
248 |
hence le2: "c+b <= c+a" by (rule add_left_mono) |
|
249 |
have "a = b" |
|
250 |
apply (insert le) |
|
251 |
apply (insert le2) |
|
252 |
apply (drule order_antisym, simp_all) |
|
253 |
done |
|
254 |
with w show False |
|
255 |
by (simp add: linorder_not_le [symmetric]) |
|
256 |
qed |
|
257 |
qed |
|
258 |
||
259 |
lemma add_right_mono: "a \<le> (b::'a::pordered_ab_semigroup_add) ==> a + c \<le> b + c" |
|
| 22390 | 260 |
by (simp add: add_commute [of _ c] add_left_mono) |
| 14738 | 261 |
|
262 |
text {* non-strict, in both arguments *}
|
|
263 |
lemma add_mono: |
|
264 |
"[|a \<le> b; c \<le> d|] ==> a + c \<le> b + (d::'a::pordered_ab_semigroup_add)" |
|
265 |
apply (erule add_right_mono [THEN order_trans]) |
|
266 |
apply (simp add: add_commute add_left_mono) |
|
267 |
done |
|
268 |
||
269 |
lemma add_strict_left_mono: |
|
270 |
"a < b ==> c + a < c + (b::'a::pordered_cancel_ab_semigroup_add)" |
|
271 |
by (simp add: order_less_le add_left_mono) |
|
272 |
||
273 |
lemma add_strict_right_mono: |
|
274 |
"a < b ==> a + c < b + (c::'a::pordered_cancel_ab_semigroup_add)" |
|
275 |
by (simp add: add_commute [of _ c] add_strict_left_mono) |
|
276 |
||
277 |
text{*Strict monotonicity in both arguments*}
|
|
278 |
lemma add_strict_mono: "[|a<b; c<d|] ==> a + c < b + (d::'a::pordered_cancel_ab_semigroup_add)" |
|
279 |
apply (erule add_strict_right_mono [THEN order_less_trans]) |
|
280 |
apply (erule add_strict_left_mono) |
|
281 |
done |
|
282 |
||
283 |
lemma add_less_le_mono: |
|
284 |
"[| a<b; c\<le>d |] ==> a + c < b + (d::'a::pordered_cancel_ab_semigroup_add)" |
|
285 |
apply (erule add_strict_right_mono [THEN order_less_le_trans]) |
|
286 |
apply (erule add_left_mono) |
|
287 |
done |
|
288 |
||
289 |
lemma add_le_less_mono: |
|
290 |
"[| a\<le>b; c<d |] ==> a + c < b + (d::'a::pordered_cancel_ab_semigroup_add)" |
|
291 |
apply (erule add_right_mono [THEN order_le_less_trans]) |
|
292 |
apply (erule add_strict_left_mono) |
|
293 |
done |
|
294 |
||
295 |
lemma add_less_imp_less_left: |
|
296 |
assumes less: "c + a < c + b" shows "a < (b::'a::pordered_ab_semigroup_add_imp_le)" |
|
297 |
proof - |
|
298 |
from less have le: "c + a <= c + b" by (simp add: order_le_less) |
|
299 |
have "a <= b" |
|
300 |
apply (insert le) |
|
301 |
apply (drule add_le_imp_le_left) |
|
302 |
by (insert le, drule add_le_imp_le_left, assumption) |
|
303 |
moreover have "a \<noteq> b" |
|
304 |
proof (rule ccontr) |
|
305 |
assume "~(a \<noteq> b)" |
|
306 |
then have "a = b" by simp |
|
307 |
then have "c + a = c + b" by simp |
|
308 |
with less show "False"by simp |
|
309 |
qed |
|
310 |
ultimately show "a < b" by (simp add: order_le_less) |
|
311 |
qed |
|
312 |
||
313 |
lemma add_less_imp_less_right: |
|
314 |
"a + c < b + c ==> a < (b::'a::pordered_ab_semigroup_add_imp_le)" |
|
315 |
apply (rule add_less_imp_less_left [of c]) |
|
316 |
apply (simp add: add_commute) |
|
317 |
done |
|
318 |
||
319 |
lemma add_less_cancel_left [simp]: |
|
320 |
"(c+a < c+b) = (a < (b::'a::pordered_ab_semigroup_add_imp_le))" |
|
321 |
by (blast intro: add_less_imp_less_left add_strict_left_mono) |
|
322 |
||
323 |
lemma add_less_cancel_right [simp]: |
|
324 |
"(a+c < b+c) = (a < (b::'a::pordered_ab_semigroup_add_imp_le))" |
|
325 |
by (blast intro: add_less_imp_less_right add_strict_right_mono) |
|
326 |
||
327 |
lemma add_le_cancel_left [simp]: |
|
328 |
"(c+a \<le> c+b) = (a \<le> (b::'a::pordered_ab_semigroup_add_imp_le))" |
|
329 |
by (auto, drule add_le_imp_le_left, simp_all add: add_left_mono) |
|
330 |
||
331 |
lemma add_le_cancel_right [simp]: |
|
332 |
"(a+c \<le> b+c) = (a \<le> (b::'a::pordered_ab_semigroup_add_imp_le))" |
|
333 |
by (simp add: add_commute[of a c] add_commute[of b c]) |
|
334 |
||
335 |
lemma add_le_imp_le_right: |
|
336 |
"a + c \<le> b + c ==> a \<le> (b::'a::pordered_ab_semigroup_add_imp_le)" |
|
337 |
by simp |
|
338 |
||
|
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|
339 |
lemma add_increasing: |
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15229
diff
changeset
|
340 |
fixes c :: "'a::{pordered_ab_semigroup_add_imp_le, comm_monoid_add}"
|
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
341 |
shows "[|0\<le>a; b\<le>c|] ==> b \<le> a + c" |
| 14738 | 342 |
by (insert add_mono [of 0 a b c], simp) |
343 |
||
| 15539 | 344 |
lemma add_increasing2: |
345 |
fixes c :: "'a::{pordered_ab_semigroup_add_imp_le, comm_monoid_add}"
|
|
346 |
shows "[|0\<le>c; b\<le>a|] ==> b \<le> a + c" |
|
347 |
by (simp add:add_increasing add_commute[of a]) |
|
348 |
||
|
15234
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
349 |
lemma add_strict_increasing: |
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
350 |
fixes c :: "'a::{pordered_ab_semigroup_add_imp_le, comm_monoid_add}"
|
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
351 |
shows "[|0<a; b\<le>c|] ==> b < a + c" |
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
352 |
by (insert add_less_le_mono [of 0 a b c], simp) |
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
353 |
|
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
354 |
lemma add_strict_increasing2: |
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
355 |
fixes c :: "'a::{pordered_ab_semigroup_add_imp_le, comm_monoid_add}"
|
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
356 |
shows "[|0\<le>a; b<c|] ==> b < a + c" |
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
357 |
by (insert add_le_less_mono [of 0 a b c], simp) |
|
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
358 |
|
| 19527 | 359 |
lemma max_add_distrib_left: |
360 |
fixes z :: "'a::pordered_ab_semigroup_add_imp_le" |
|
361 |
shows "(max x y) + z = max (x+z) (y+z)" |
|
362 |
by (rule max_of_mono [THEN sym], rule add_le_cancel_right) |
|
363 |
||
364 |
lemma min_add_distrib_left: |
|
365 |
fixes z :: "'a::pordered_ab_semigroup_add_imp_le" |
|
366 |
shows "(min x y) + z = min (x+z) (y+z)" |
|
367 |
by (rule min_of_mono [THEN sym], rule add_le_cancel_right) |
|
368 |
||
369 |
lemma max_diff_distrib_left: |
|
370 |
fixes z :: "'a::pordered_ab_group_add" |
|
371 |
shows "(max x y) - z = max (x-z) (y-z)" |
|
372 |
by (simp add: diff_minus, rule max_add_distrib_left) |
|
373 |
||
374 |
lemma min_diff_distrib_left: |
|
375 |
fixes z :: "'a::pordered_ab_group_add" |
|
376 |
shows "(min x y) - z = min (x-z) (y-z)" |
|
377 |
by (simp add: diff_minus, rule min_add_distrib_left) |
|
378 |
||
|
15234
ec91a90c604e
simplification tweaks for better arithmetic reasoning
paulson
parents:
15229
diff
changeset
|
379 |
|
| 14738 | 380 |
subsection {* Ordering Rules for Unary Minus *}
|
381 |
||
382 |
lemma le_imp_neg_le: |
|
| 23389 | 383 |
assumes "a \<le> (b::'a::{pordered_ab_semigroup_add_imp_le, ab_group_add})" shows "-b \<le> -a"
|
| 14738 | 384 |
proof - |
385 |
have "-a+a \<le> -a+b" |
|
| 23389 | 386 |
using `a \<le> b` by (rule add_left_mono) |
| 14738 | 387 |
hence "0 \<le> -a+b" |
388 |
by simp |
|
389 |
hence "0 + (-b) \<le> (-a + b) + (-b)" |
|
390 |
by (rule add_right_mono) |
|
391 |
thus ?thesis |
|
392 |
by (simp add: add_assoc) |
|
393 |
qed |
|
394 |
||
395 |
lemma neg_le_iff_le [simp]: "(-b \<le> -a) = (a \<le> (b::'a::pordered_ab_group_add))" |
|
396 |
proof |
|
397 |
assume "- b \<le> - a" |
|
398 |
hence "- (- a) \<le> - (- b)" |
|
399 |
by (rule le_imp_neg_le) |
|
400 |
thus "a\<le>b" by simp |
|
401 |
next |
|
402 |
assume "a\<le>b" |
|
403 |
thus "-b \<le> -a" by (rule le_imp_neg_le) |
|
404 |
qed |
|
405 |
||
406 |
lemma neg_le_0_iff_le [simp]: "(-a \<le> 0) = (0 \<le> (a::'a::pordered_ab_group_add))" |
|
407 |
by (subst neg_le_iff_le [symmetric], simp) |
|
408 |
||
409 |
lemma neg_0_le_iff_le [simp]: "(0 \<le> -a) = (a \<le> (0::'a::pordered_ab_group_add))" |
|
410 |
by (subst neg_le_iff_le [symmetric], simp) |
|
411 |
||
412 |
lemma neg_less_iff_less [simp]: "(-b < -a) = (a < (b::'a::pordered_ab_group_add))" |
|
413 |
by (force simp add: order_less_le) |
|
414 |
||
415 |
lemma neg_less_0_iff_less [simp]: "(-a < 0) = (0 < (a::'a::pordered_ab_group_add))" |
|
416 |
by (subst neg_less_iff_less [symmetric], simp) |
|
417 |
||
418 |
lemma neg_0_less_iff_less [simp]: "(0 < -a) = (a < (0::'a::pordered_ab_group_add))" |
|
419 |
by (subst neg_less_iff_less [symmetric], simp) |
|
420 |
||
421 |
text{*The next several equations can make the simplifier loop!*}
|
|
422 |
||
423 |
lemma less_minus_iff: "(a < - b) = (b < - (a::'a::pordered_ab_group_add))" |
|
424 |
proof - |
|
425 |
have "(- (-a) < - b) = (b < - a)" by (rule neg_less_iff_less) |
|
426 |
thus ?thesis by simp |
|
427 |
qed |
|
428 |
||
429 |
lemma minus_less_iff: "(- a < b) = (- b < (a::'a::pordered_ab_group_add))" |
|
430 |
proof - |
|
431 |
have "(- a < - (-b)) = (- b < a)" by (rule neg_less_iff_less) |
|
432 |
thus ?thesis by simp |
|
433 |
qed |
|
434 |
||
435 |
lemma le_minus_iff: "(a \<le> - b) = (b \<le> - (a::'a::pordered_ab_group_add))" |
|
436 |
proof - |
|
437 |
have mm: "!! a (b::'a). (-(-a)) < -b \<Longrightarrow> -(-b) < -a" by (simp only: minus_less_iff) |
|
438 |
have "(- (- a) <= -b) = (b <= - a)" |
|
439 |
apply (auto simp only: order_le_less) |
|
440 |
apply (drule mm) |
|
441 |
apply (simp_all) |
|
442 |
apply (drule mm[simplified], assumption) |
|
443 |
done |
|
444 |
then show ?thesis by simp |
|
445 |
qed |
|
446 |
||
447 |
lemma minus_le_iff: "(- a \<le> b) = (- b \<le> (a::'a::pordered_ab_group_add))" |
|
448 |
by (auto simp add: order_le_less minus_less_iff) |
|
449 |
||
450 |
lemma add_diff_eq: "a + (b - c) = (a + b) - (c::'a::ab_group_add)" |
|
451 |
by (simp add: diff_minus add_ac) |
|
452 |
||
453 |
lemma diff_add_eq: "(a - b) + c = (a + c) - (b::'a::ab_group_add)" |
|
454 |
by (simp add: diff_minus add_ac) |
|
455 |
||
456 |
lemma diff_eq_eq: "(a-b = c) = (a = c + (b::'a::ab_group_add))" |
|
457 |
by (auto simp add: diff_minus add_assoc) |
|
458 |
||
459 |
lemma eq_diff_eq: "(a = c-b) = (a + (b::'a::ab_group_add) = c)" |
|
460 |
by (auto simp add: diff_minus add_assoc) |
|
461 |
||
462 |
lemma diff_diff_eq: "(a - b) - c = a - (b + (c::'a::ab_group_add))" |
|
463 |
by (simp add: diff_minus add_ac) |
|
464 |
||
465 |
lemma diff_diff_eq2: "a - (b - c) = (a + c) - (b::'a::ab_group_add)" |
|
466 |
by (simp add: diff_minus add_ac) |
|
467 |
||
468 |
lemma diff_add_cancel: "a - b + b = (a::'a::ab_group_add)" |
|
469 |
by (simp add: diff_minus add_ac) |
|
470 |
||
471 |
lemma add_diff_cancel: "a + b - b = (a::'a::ab_group_add)" |
|
472 |
by (simp add: diff_minus add_ac) |
|
473 |
||
|
14754
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
474 |
text{*Further subtraction laws*}
|
| 14738 | 475 |
|
476 |
lemma less_iff_diff_less_0: "(a < b) = (a - b < (0::'a::pordered_ab_group_add))" |
|
477 |
proof - |
|
478 |
have "(a < b) = (a + (- b) < b + (-b))" |
|
479 |
by (simp only: add_less_cancel_right) |
|
480 |
also have "... = (a - b < 0)" by (simp add: diff_minus) |
|
481 |
finally show ?thesis . |
|
482 |
qed |
|
483 |
||
484 |
lemma diff_less_eq: "(a-b < c) = (a < c + (b::'a::pordered_ab_group_add))" |
|
| 15481 | 485 |
apply (subst less_iff_diff_less_0 [of a]) |
| 14738 | 486 |
apply (rule less_iff_diff_less_0 [of _ c, THEN ssubst]) |
487 |
apply (simp add: diff_minus add_ac) |
|
488 |
done |
|
489 |
||
490 |
lemma less_diff_eq: "(a < c-b) = (a + (b::'a::pordered_ab_group_add) < c)" |
|
| 15481 | 491 |
apply (subst less_iff_diff_less_0 [of "a+b"]) |
492 |
apply (subst less_iff_diff_less_0 [of a]) |
|
| 14738 | 493 |
apply (simp add: diff_minus add_ac) |
494 |
done |
|
495 |
||
496 |
lemma diff_le_eq: "(a-b \<le> c) = (a \<le> c + (b::'a::pordered_ab_group_add))" |
|
497 |
by (auto simp add: order_le_less diff_less_eq diff_add_cancel add_diff_cancel) |
|
498 |
||
499 |
lemma le_diff_eq: "(a \<le> c-b) = (a + (b::'a::pordered_ab_group_add) \<le> c)" |
|
500 |
by (auto simp add: order_le_less less_diff_eq diff_add_cancel add_diff_cancel) |
|
501 |
||
502 |
text{*This list of rewrites simplifies (in)equalities by bringing subtractions
|
|
503 |
to the top and then moving negative terms to the other side. |
|
504 |
Use with @{text add_ac}*}
|
|
505 |
lemmas compare_rls = |
|
506 |
diff_minus [symmetric] |
|
507 |
add_diff_eq diff_add_eq diff_diff_eq diff_diff_eq2 |
|
508 |
diff_less_eq less_diff_eq diff_le_eq le_diff_eq |
|
509 |
diff_eq_eq eq_diff_eq |
|
510 |
||
|
16775
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
511 |
subsection {* Support for reasoning about signs *}
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
512 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
513 |
lemma add_pos_pos: "0 < |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
514 |
(x::'a::{comm_monoid_add,pordered_cancel_ab_semigroup_add})
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
515 |
==> 0 < y ==> 0 < x + y" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
516 |
apply (subgoal_tac "0 + 0 < x + y") |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
517 |
apply simp |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
518 |
apply (erule add_less_le_mono) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
519 |
apply (erule order_less_imp_le) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
520 |
done |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
521 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
522 |
lemma add_pos_nonneg: "0 < |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
523 |
(x::'a::{comm_monoid_add,pordered_cancel_ab_semigroup_add})
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
524 |
==> 0 <= y ==> 0 < x + y" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
525 |
apply (subgoal_tac "0 + 0 < x + y") |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
526 |
apply simp |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
527 |
apply (erule add_less_le_mono, assumption) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
528 |
done |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
529 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
530 |
lemma add_nonneg_pos: "0 <= |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
531 |
(x::'a::{comm_monoid_add,pordered_cancel_ab_semigroup_add})
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
532 |
==> 0 < y ==> 0 < x + y" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
533 |
apply (subgoal_tac "0 + 0 < x + y") |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
534 |
apply simp |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
535 |
apply (erule add_le_less_mono, assumption) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
536 |
done |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
537 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
538 |
lemma add_nonneg_nonneg: "0 <= |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
539 |
(x::'a::{comm_monoid_add,pordered_cancel_ab_semigroup_add})
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
540 |
==> 0 <= y ==> 0 <= x + y" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
541 |
apply (subgoal_tac "0 + 0 <= x + y") |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
542 |
apply simp |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
543 |
apply (erule add_mono, assumption) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
544 |
done |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
545 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
546 |
lemma add_neg_neg: "(x::'a::{comm_monoid_add,pordered_cancel_ab_semigroup_add})
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
547 |
< 0 ==> y < 0 ==> x + y < 0" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
548 |
apply (subgoal_tac "x + y < 0 + 0") |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
549 |
apply simp |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
550 |
apply (erule add_less_le_mono) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
551 |
apply (erule order_less_imp_le) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
552 |
done |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
553 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
554 |
lemma add_neg_nonpos: |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
555 |
"(x::'a::{comm_monoid_add,pordered_cancel_ab_semigroup_add}) < 0
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
556 |
==> y <= 0 ==> x + y < 0" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
557 |
apply (subgoal_tac "x + y < 0 + 0") |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
558 |
apply simp |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
559 |
apply (erule add_less_le_mono, assumption) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
560 |
done |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
561 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
562 |
lemma add_nonpos_neg: |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
563 |
"(x::'a::{comm_monoid_add,pordered_cancel_ab_semigroup_add}) <= 0
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
564 |
==> y < 0 ==> x + y < 0" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
565 |
apply (subgoal_tac "x + y < 0 + 0") |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
566 |
apply simp |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
567 |
apply (erule add_le_less_mono, assumption) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
568 |
done |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
569 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
570 |
lemma add_nonpos_nonpos: |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
571 |
"(x::'a::{comm_monoid_add,pordered_cancel_ab_semigroup_add}) <= 0
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
572 |
==> y <= 0 ==> x + y <= 0" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
573 |
apply (subgoal_tac "x + y <= 0 + 0") |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
574 |
apply simp |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
575 |
apply (erule add_mono, assumption) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
576 |
done |
| 14738 | 577 |
|
578 |
subsection{*Lemmas for the @{text cancel_numerals} simproc*}
|
|
579 |
||
580 |
lemma eq_iff_diff_eq_0: "(a = b) = (a-b = (0::'a::ab_group_add))" |
|
581 |
by (simp add: compare_rls) |
|
582 |
||
583 |
lemma le_iff_diff_le_0: "(a \<le> b) = (a-b \<le> (0::'a::pordered_ab_group_add))" |
|
584 |
by (simp add: compare_rls) |
|
585 |
||
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
586 |
|
| 14738 | 587 |
subsection {* Lattice Ordered (Abelian) Groups *}
|
588 |
||
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
589 |
class lordered_ab_group_meet = pordered_ab_group_add + lower_semilattice |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
590 |
|
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
591 |
class lordered_ab_group_join = pordered_ab_group_add + upper_semilattice |
| 14738 | 592 |
|
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
593 |
class lordered_ab_group = pordered_ab_group_add + lattice |
| 14738 | 594 |
|
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
595 |
instance lordered_ab_group \<subseteq> lordered_ab_group_meet by default |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
596 |
instance lordered_ab_group \<subseteq> lordered_ab_group_join by default |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
597 |
|
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
598 |
lemma add_inf_distrib_left: "a + inf b c = inf (a + b) (a + (c::'a::{pordered_ab_group_add, lower_semilattice}))"
|
| 14738 | 599 |
apply (rule order_antisym) |
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
600 |
apply (simp_all add: le_infI) |
| 14738 | 601 |
apply (rule add_le_imp_le_left [of "-a"]) |
602 |
apply (simp only: add_assoc[symmetric], simp) |
|
| 21312 | 603 |
apply rule |
604 |
apply (rule add_le_imp_le_left[of "a"], simp only: add_assoc[symmetric], simp)+ |
|
| 14738 | 605 |
done |
606 |
||
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
607 |
lemma add_sup_distrib_left: "a + sup b c = sup (a + b) (a+ (c::'a::{pordered_ab_group_add, upper_semilattice}))"
|
| 14738 | 608 |
apply (rule order_antisym) |
609 |
apply (rule add_le_imp_le_left [of "-a"]) |
|
610 |
apply (simp only: add_assoc[symmetric], simp) |
|
| 21312 | 611 |
apply rule |
612 |
apply (rule add_le_imp_le_left [of "a"], simp only: add_assoc[symmetric], simp)+ |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
613 |
apply (rule le_supI) |
| 21312 | 614 |
apply (simp_all) |
| 14738 | 615 |
done |
616 |
||
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
617 |
lemma add_inf_distrib_right: "inf a b + (c::'a::lordered_ab_group) = inf (a+c) (b+c)" |
| 14738 | 618 |
proof - |
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
619 |
have "c + inf a b = inf (c+a) (c+b)" by (simp add: add_inf_distrib_left) |
| 14738 | 620 |
thus ?thesis by (simp add: add_commute) |
621 |
qed |
|
622 |
||
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
623 |
lemma add_sup_distrib_right: "sup a b + (c::'a::lordered_ab_group) = sup (a+c) (b+c)" |
| 14738 | 624 |
proof - |
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
625 |
have "c + sup a b = sup (c+a) (c+b)" by (simp add: add_sup_distrib_left) |
| 14738 | 626 |
thus ?thesis by (simp add: add_commute) |
627 |
qed |
|
628 |
||
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
629 |
lemmas add_sup_inf_distribs = add_inf_distrib_right add_inf_distrib_left add_sup_distrib_right add_sup_distrib_left |
| 14738 | 630 |
|
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
631 |
lemma inf_eq_neg_sup: "inf a (b\<Colon>'a\<Colon>lordered_ab_group) = - sup (-a) (-b)" |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
632 |
proof (rule inf_unique) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
633 |
fix a b :: 'a |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
634 |
show "- sup (-a) (-b) \<le> a" by (rule add_le_imp_le_right [of _ "sup (-a) (-b)"]) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
635 |
(simp, simp add: add_sup_distrib_left) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
636 |
next |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
637 |
fix a b :: 'a |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
638 |
show "- sup (-a) (-b) \<le> b" by (rule add_le_imp_le_right [of _ "sup (-a) (-b)"]) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
639 |
(simp, simp add: add_sup_distrib_left) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
640 |
next |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
641 |
fix a b c :: 'a |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
642 |
assume "a \<le> b" "a \<le> c" |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
643 |
then show "a \<le> - sup (-b) (-c)" by (subst neg_le_iff_le [symmetric]) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
644 |
(simp add: le_supI) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
645 |
qed |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
646 |
|
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
647 |
lemma sup_eq_neg_inf: "sup a (b\<Colon>'a\<Colon>lordered_ab_group) = - inf (-a) (-b)" |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
648 |
proof (rule sup_unique) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
649 |
fix a b :: 'a |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
650 |
show "a \<le> - inf (-a) (-b)" by (rule add_le_imp_le_right [of _ "inf (-a) (-b)"]) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
651 |
(simp, simp add: add_inf_distrib_left) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
652 |
next |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
653 |
fix a b :: 'a |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
654 |
show "b \<le> - inf (-a) (-b)" by (rule add_le_imp_le_right [of _ "inf (-a) (-b)"]) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
655 |
(simp, simp add: add_inf_distrib_left) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
656 |
next |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
657 |
fix a b c :: 'a |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
658 |
assume "a \<le> c" "b \<le> c" |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
659 |
then show "- inf (-a) (-b) \<le> c" by (subst neg_le_iff_le [symmetric]) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
660 |
(simp add: le_infI) |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
661 |
qed |
| 14738 | 662 |
|
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
663 |
lemma add_eq_inf_sup: "a + b = sup a b + inf a (b\<Colon>'a\<Colon>lordered_ab_group)" |
| 14738 | 664 |
proof - |
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
665 |
have "0 = - inf 0 (a-b) + inf (a-b) 0" by (simp add: inf_commute) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
666 |
hence "0 = sup 0 (b-a) + inf (a-b) 0" by (simp add: inf_eq_neg_sup) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
667 |
hence "0 = (-a + sup a b) + (inf a b + (-b))" |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
668 |
apply (simp add: add_sup_distrib_left add_inf_distrib_right) |
| 14738 | 669 |
by (simp add: diff_minus add_commute) |
670 |
thus ?thesis |
|
671 |
apply (simp add: compare_rls) |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
672 |
apply (subst add_left_cancel[symmetric, of "a+b" "sup a b + inf a b" "-a"]) |
| 14738 | 673 |
apply (simp only: add_assoc, simp add: add_assoc[symmetric]) |
674 |
done |
|
675 |
qed |
|
676 |
||
677 |
subsection {* Positive Part, Negative Part, Absolute Value *}
|
|
678 |
||
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
679 |
definition |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
680 |
nprt :: "'a \<Rightarrow> ('a::lordered_ab_group)" where
|
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
681 |
"nprt x = inf x 0" |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
682 |
|
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
683 |
definition |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
684 |
pprt :: "'a \<Rightarrow> ('a::lordered_ab_group)" where
|
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
685 |
"pprt x = sup x 0" |
| 14738 | 686 |
|
687 |
lemma prts: "a = pprt a + nprt a" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
688 |
by (simp add: pprt_def nprt_def add_eq_inf_sup[symmetric]) |
| 14738 | 689 |
|
690 |
lemma zero_le_pprt[simp]: "0 \<le> pprt a" |
|
| 21312 | 691 |
by (simp add: pprt_def) |
| 14738 | 692 |
|
693 |
lemma nprt_le_zero[simp]: "nprt a \<le> 0" |
|
| 21312 | 694 |
by (simp add: nprt_def) |
| 14738 | 695 |
|
696 |
lemma le_eq_neg: "(a \<le> -b) = (a + b \<le> (0::_::lordered_ab_group))" (is "?l = ?r") |
|
697 |
proof - |
|
698 |
have a: "?l \<longrightarrow> ?r" |
|
699 |
apply (auto) |
|
700 |
apply (rule add_le_imp_le_right[of _ "-b" _]) |
|
701 |
apply (simp add: add_assoc) |
|
702 |
done |
|
703 |
have b: "?r \<longrightarrow> ?l" |
|
704 |
apply (auto) |
|
705 |
apply (rule add_le_imp_le_right[of _ "b" _]) |
|
706 |
apply (simp) |
|
707 |
done |
|
708 |
from a b show ?thesis by blast |
|
709 |
qed |
|
710 |
||
| 15580 | 711 |
lemma pprt_0[simp]: "pprt 0 = 0" by (simp add: pprt_def) |
712 |
lemma nprt_0[simp]: "nprt 0 = 0" by (simp add: nprt_def) |
|
713 |
||
714 |
lemma pprt_eq_id[simp]: "0 <= x \<Longrightarrow> pprt x = x" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
715 |
by (simp add: pprt_def le_iff_sup sup_aci) |
| 15580 | 716 |
|
717 |
lemma nprt_eq_id[simp]: "x <= 0 \<Longrightarrow> nprt x = x" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
718 |
by (simp add: nprt_def le_iff_inf inf_aci) |
| 15580 | 719 |
|
720 |
lemma pprt_eq_0[simp]: "x <= 0 \<Longrightarrow> pprt x = 0" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
721 |
by (simp add: pprt_def le_iff_sup sup_aci) |
| 15580 | 722 |
|
723 |
lemma nprt_eq_0[simp]: "0 <= x \<Longrightarrow> nprt x = 0" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
724 |
by (simp add: nprt_def le_iff_inf inf_aci) |
| 15580 | 725 |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
726 |
lemma sup_0_imp_0: "sup a (-a) = 0 \<Longrightarrow> a = (0::'a::lordered_ab_group)" |
| 14738 | 727 |
proof - |
728 |
{
|
|
729 |
fix a::'a |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
730 |
assume hyp: "sup a (-a) = 0" |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
731 |
hence "sup a (-a) + a = a" by (simp) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
732 |
hence "sup (a+a) 0 = a" by (simp add: add_sup_distrib_right) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
733 |
hence "sup (a+a) 0 <= a" by (simp) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
734 |
hence "0 <= a" by (blast intro: order_trans inf_sup_ord) |
| 14738 | 735 |
} |
736 |
note p = this |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
737 |
assume hyp:"sup a (-a) = 0" |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
738 |
hence hyp2:"sup (-a) (-(-a)) = 0" by (simp add: sup_commute) |
| 14738 | 739 |
from p[OF hyp] p[OF hyp2] show "a = 0" by simp |
740 |
qed |
|
741 |
||
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
742 |
lemma inf_0_imp_0: "inf a (-a) = 0 \<Longrightarrow> a = (0::'a::lordered_ab_group)" |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
743 |
apply (simp add: inf_eq_neg_sup) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
744 |
apply (simp add: sup_commute) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
745 |
apply (erule sup_0_imp_0) |
| 15481 | 746 |
done |
| 14738 | 747 |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
748 |
lemma inf_0_eq_0[simp]: "(inf a (-a) = 0) = (a = (0::'a::lordered_ab_group))" |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
749 |
by (auto, erule inf_0_imp_0) |
| 14738 | 750 |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
751 |
lemma sup_0_eq_0[simp]: "(sup a (-a) = 0) = (a = (0::'a::lordered_ab_group))" |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
752 |
by (auto, erule sup_0_imp_0) |
| 14738 | 753 |
|
754 |
lemma zero_le_double_add_iff_zero_le_single_add[simp]: "(0 \<le> a + a) = (0 \<le> (a::'a::lordered_ab_group))" |
|
755 |
proof |
|
756 |
assume "0 <= a + a" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
757 |
hence a:"inf (a+a) 0 = 0" by (simp add: le_iff_inf inf_commute) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
758 |
have "(inf a 0)+(inf a 0) = inf (inf (a+a) 0) a" (is "?l=_") by (simp add: add_sup_inf_distribs inf_aci) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
759 |
hence "?l = 0 + inf a 0" by (simp add: a, simp add: inf_commute) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
760 |
hence "inf a 0 = 0" by (simp only: add_right_cancel) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
761 |
then show "0 <= a" by (simp add: le_iff_inf inf_commute) |
| 14738 | 762 |
next |
763 |
assume a: "0 <= a" |
|
764 |
show "0 <= a + a" by (simp add: add_mono[OF a a, simplified]) |
|
765 |
qed |
|
766 |
||
767 |
lemma double_add_le_zero_iff_single_add_le_zero[simp]: "(a + a <= 0) = ((a::'a::lordered_ab_group) <= 0)" |
|
768 |
proof - |
|
769 |
have "(a + a <= 0) = (0 <= -(a+a))" by (subst le_minus_iff, simp) |
|
770 |
moreover have "\<dots> = (a <= 0)" by (simp add: zero_le_double_add_iff_zero_le_single_add) |
|
771 |
ultimately show ?thesis by blast |
|
772 |
qed |
|
773 |
||
774 |
lemma double_add_less_zero_iff_single_less_zero[simp]: "(a+a<0) = ((a::'a::{pordered_ab_group_add,linorder}) < 0)" (is ?s)
|
|
775 |
proof cases |
|
776 |
assume a: "a < 0" |
|
777 |
thus ?s by (simp add: add_strict_mono[OF a a, simplified]) |
|
778 |
next |
|
779 |
assume "~(a < 0)" |
|
780 |
hence a:"0 <= a" by (simp) |
|
781 |
hence "0 <= a+a" by (simp add: add_mono[OF a a, simplified]) |
|
782 |
hence "~(a+a < 0)" by simp |
|
783 |
with a show ?thesis by simp |
|
784 |
qed |
|
785 |
||
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
786 |
class lordered_ab_group_abs = lordered_ab_group + |
|
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
787 |
assumes abs_lattice: "abs x = sup x (uminus x)" |
| 14738 | 788 |
|
789 |
lemma abs_zero[simp]: "abs 0 = (0::'a::lordered_ab_group_abs)" |
|
790 |
by (simp add: abs_lattice) |
|
791 |
||
792 |
lemma abs_eq_0[simp]: "(abs a = 0) = (a = (0::'a::lordered_ab_group_abs))" |
|
793 |
by (simp add: abs_lattice) |
|
794 |
||
795 |
lemma abs_0_eq[simp]: "(0 = abs a) = (a = (0::'a::lordered_ab_group_abs))" |
|
796 |
proof - |
|
797 |
have "(0 = abs a) = (abs a = 0)" by (simp only: eq_ac) |
|
798 |
thus ?thesis by simp |
|
799 |
qed |
|
800 |
||
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
801 |
lemma neg_inf_eq_sup[simp]: "- inf a (b::_::lordered_ab_group) = sup (-a) (-b)" |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
802 |
by (simp add: inf_eq_neg_sup) |
| 14738 | 803 |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
804 |
lemma neg_sup_eq_inf[simp]: "- sup a (b::_::lordered_ab_group) = inf (-a) (-b)" |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
805 |
by (simp del: neg_inf_eq_sup add: sup_eq_neg_inf) |
| 14738 | 806 |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
807 |
lemma sup_eq_if: "sup a (-a) = (if a < 0 then -a else (a::'a::{lordered_ab_group, linorder}))"
|
| 14738 | 808 |
proof - |
809 |
note b = add_le_cancel_right[of a a "-a",symmetric,simplified] |
|
810 |
have c: "a + a = 0 \<Longrightarrow> -a = a" by (rule add_right_imp_eq[of _ a], simp) |
|
|
22452
8a86fd2a1bf0
adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy
haftmann
parents:
22422
diff
changeset
|
811 |
show ?thesis by (auto simp add: max_def b linorder_not_less sup_max) |
| 14738 | 812 |
qed |
813 |
||
814 |
lemma abs_if_lattice: "\<bar>a\<bar> = (if a < 0 then -a else (a::'a::{lordered_ab_group_abs, linorder}))"
|
|
815 |
proof - |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
816 |
show ?thesis by (simp add: abs_lattice sup_eq_if) |
| 14738 | 817 |
qed |
818 |
||
819 |
lemma abs_ge_zero[simp]: "0 \<le> abs (a::'a::lordered_ab_group_abs)" |
|
820 |
proof - |
|
| 21312 | 821 |
have a:"a <= abs a" and b:"-a <= abs a" by (auto simp add: abs_lattice) |
| 14738 | 822 |
show ?thesis by (rule add_mono[OF a b, simplified]) |
823 |
qed |
|
824 |
||
825 |
lemma abs_le_zero_iff [simp]: "(abs a \<le> (0::'a::lordered_ab_group_abs)) = (a = 0)" |
|
826 |
proof |
|
827 |
assume "abs a <= 0" |
|
828 |
hence "abs a = 0" by (auto dest: order_antisym) |
|
829 |
thus "a = 0" by simp |
|
830 |
next |
|
831 |
assume "a = 0" |
|
832 |
thus "abs a <= 0" by simp |
|
833 |
qed |
|
834 |
||
835 |
lemma zero_less_abs_iff [simp]: "(0 < abs a) = (a \<noteq> (0::'a::lordered_ab_group_abs))" |
|
836 |
by (simp add: order_less_le) |
|
837 |
||
838 |
lemma abs_not_less_zero [simp]: "~ abs a < (0::'a::lordered_ab_group_abs)" |
|
839 |
proof - |
|
840 |
have a:"!! x (y::_::order). x <= y \<Longrightarrow> ~(y < x)" by auto |
|
841 |
show ?thesis by (simp add: a) |
|
842 |
qed |
|
843 |
||
844 |
lemma abs_ge_self: "a \<le> abs (a::'a::lordered_ab_group_abs)" |
|
| 21312 | 845 |
by (simp add: abs_lattice) |
| 14738 | 846 |
|
847 |
lemma abs_ge_minus_self: "-a \<le> abs (a::'a::lordered_ab_group_abs)" |
|
| 21312 | 848 |
by (simp add: abs_lattice) |
| 14738 | 849 |
|
850 |
lemma abs_prts: "abs (a::_::lordered_ab_group_abs) = pprt a - nprt a" |
|
851 |
apply (simp add: pprt_def nprt_def diff_minus) |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
852 |
apply (simp add: add_sup_inf_distribs sup_aci abs_lattice[symmetric]) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
853 |
apply (subst sup_absorb2, auto) |
| 14738 | 854 |
done |
855 |
||
856 |
lemma abs_minus_cancel [simp]: "abs (-a) = abs(a::'a::lordered_ab_group_abs)" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
857 |
by (simp add: abs_lattice sup_commute) |
| 14738 | 858 |
|
859 |
lemma abs_idempotent [simp]: "abs (abs a) = abs (a::'a::lordered_ab_group_abs)" |
|
860 |
apply (simp add: abs_lattice[of "abs a"]) |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
861 |
apply (subst sup_absorb1) |
| 14738 | 862 |
apply (rule order_trans[of _ 0]) |
863 |
by auto |
|
864 |
||
|
15093
49ede01e9ee6
conversion of Integration and NSPrimes to Isar scripts
paulson
parents:
15010
diff
changeset
|
865 |
lemma abs_minus_commute: |
|
49ede01e9ee6
conversion of Integration and NSPrimes to Isar scripts
paulson
parents:
15010
diff
changeset
|
866 |
fixes a :: "'a::lordered_ab_group_abs" |
|
49ede01e9ee6
conversion of Integration and NSPrimes to Isar scripts
paulson
parents:
15010
diff
changeset
|
867 |
shows "abs (a-b) = abs(b-a)" |
|
49ede01e9ee6
conversion of Integration and NSPrimes to Isar scripts
paulson
parents:
15010
diff
changeset
|
868 |
proof - |
|
49ede01e9ee6
conversion of Integration and NSPrimes to Isar scripts
paulson
parents:
15010
diff
changeset
|
869 |
have "abs (a-b) = abs (- (a-b))" by (simp only: abs_minus_cancel) |
|
49ede01e9ee6
conversion of Integration and NSPrimes to Isar scripts
paulson
parents:
15010
diff
changeset
|
870 |
also have "... = abs(b-a)" by simp |
|
49ede01e9ee6
conversion of Integration and NSPrimes to Isar scripts
paulson
parents:
15010
diff
changeset
|
871 |
finally show ?thesis . |
|
49ede01e9ee6
conversion of Integration and NSPrimes to Isar scripts
paulson
parents:
15010
diff
changeset
|
872 |
qed |
|
49ede01e9ee6
conversion of Integration and NSPrimes to Isar scripts
paulson
parents:
15010
diff
changeset
|
873 |
|
| 14738 | 874 |
lemma zero_le_iff_zero_nprt: "(0 \<le> a) = (nprt a = 0)" |
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
875 |
by (simp add: le_iff_inf nprt_def inf_commute) |
| 14738 | 876 |
|
877 |
lemma le_zero_iff_zero_pprt: "(a \<le> 0) = (pprt a = 0)" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
878 |
by (simp add: le_iff_sup pprt_def sup_commute) |
| 14738 | 879 |
|
880 |
lemma le_zero_iff_pprt_id: "(0 \<le> a) = (pprt a = a)" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
881 |
by (simp add: le_iff_sup pprt_def sup_commute) |
| 14738 | 882 |
|
883 |
lemma zero_le_iff_nprt_id: "(a \<le> 0) = (nprt a = a)" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
884 |
by (simp add: le_iff_inf nprt_def inf_commute) |
| 14738 | 885 |
|
| 15580 | 886 |
lemma pprt_mono[simp]: "(a::_::lordered_ab_group) <= b \<Longrightarrow> pprt a <= pprt b" |
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
887 |
by (simp add: le_iff_sup pprt_def sup_aci) |
| 15580 | 888 |
|
889 |
lemma nprt_mono[simp]: "(a::_::lordered_ab_group) <= b \<Longrightarrow> nprt a <= nprt b" |
|
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
890 |
by (simp add: le_iff_inf nprt_def inf_aci) |
| 15580 | 891 |
|
| 19404 | 892 |
lemma pprt_neg: "pprt (-x) = - nprt x" |
893 |
by (simp add: pprt_def nprt_def) |
|
894 |
||
895 |
lemma nprt_neg: "nprt (-x) = - pprt x" |
|
896 |
by (simp add: pprt_def nprt_def) |
|
897 |
||
| 14738 | 898 |
lemma iff2imp: "(A=B) \<Longrightarrow> (A \<Longrightarrow> B)" |
899 |
by (simp) |
|
900 |
||
|
16775
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
901 |
lemma abs_of_nonneg [simp]: "0 \<le> a \<Longrightarrow> abs a = (a::'a::lordered_ab_group_abs)" |
| 14738 | 902 |
by (simp add: iff2imp[OF zero_le_iff_zero_nprt] iff2imp[OF le_zero_iff_pprt_id] abs_prts) |
903 |
||
|
16775
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
904 |
lemma abs_of_pos: "0 < (x::'a::lordered_ab_group_abs) ==> abs x = x"; |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
905 |
by (rule abs_of_nonneg, rule order_less_imp_le); |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
906 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
907 |
lemma abs_of_nonpos [simp]: "a \<le> 0 \<Longrightarrow> abs a = -(a::'a::lordered_ab_group_abs)" |
| 14738 | 908 |
by (simp add: iff2imp[OF le_zero_iff_zero_pprt] iff2imp[OF zero_le_iff_nprt_id] abs_prts) |
909 |
||
|
16775
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
910 |
lemma abs_of_neg: "(x::'a::lordered_ab_group_abs) < 0 ==> |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
911 |
abs x = - x" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
912 |
by (rule abs_of_nonpos, rule order_less_imp_le) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
913 |
|
| 14738 | 914 |
lemma abs_leI: "[|a \<le> b; -a \<le> b|] ==> abs a \<le> (b::'a::lordered_ab_group_abs)" |
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
915 |
by (simp add: abs_lattice le_supI) |
| 14738 | 916 |
|
917 |
lemma le_minus_self_iff: "(a \<le> -a) = (a \<le> (0::'a::lordered_ab_group))" |
|
918 |
proof - |
|
919 |
from add_le_cancel_left[of "-a" "a+a" "0"] have "(a <= -a) = (a+a <= 0)" |
|
920 |
by (simp add: add_assoc[symmetric]) |
|
921 |
thus ?thesis by simp |
|
922 |
qed |
|
923 |
||
924 |
lemma minus_le_self_iff: "(-a \<le> a) = (0 \<le> (a::'a::lordered_ab_group))" |
|
925 |
proof - |
|
926 |
from add_le_cancel_left[of "-a" "0" "a+a"] have "(-a <= a) = (0 <= a+a)" |
|
927 |
by (simp add: add_assoc[symmetric]) |
|
928 |
thus ?thesis by simp |
|
929 |
qed |
|
930 |
||
931 |
lemma abs_le_D1: "abs a \<le> b ==> a \<le> (b::'a::lordered_ab_group_abs)" |
|
932 |
by (insert abs_ge_self, blast intro: order_trans) |
|
933 |
||
934 |
lemma abs_le_D2: "abs a \<le> b ==> -a \<le> (b::'a::lordered_ab_group_abs)" |
|
935 |
by (insert abs_le_D1 [of "-a"], simp) |
|
936 |
||
937 |
lemma abs_le_iff: "(abs a \<le> b) = (a \<le> b & -a \<le> (b::'a::lordered_ab_group_abs))" |
|
938 |
by (blast intro: abs_leI dest: abs_le_D1 abs_le_D2) |
|
939 |
||
| 15539 | 940 |
lemma abs_triangle_ineq: "abs(a+b) \<le> abs a + abs(b::'a::lordered_ab_group_abs)" |
| 14738 | 941 |
proof - |
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
942 |
have g:"abs a + abs b = sup (a+b) (sup (-a-b) (sup (-a+b) (a + (-b))))" (is "_=sup ?m ?n") |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
943 |
by (simp add: abs_lattice add_sup_inf_distribs sup_aci diff_minus) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
944 |
have a:"a+b <= sup ?m ?n" by (simp) |
| 21312 | 945 |
have b:"-a-b <= ?n" by (simp) |
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
946 |
have c:"?n <= sup ?m ?n" by (simp) |
|
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
947 |
from b c have d: "-a-b <= sup ?m ?n" by(rule order_trans) |
| 14738 | 948 |
have e:"-a-b = -(a+b)" by (simp add: diff_minus) |
|
22422
ee19cdb07528
stepping towards uniform lattice theory development in HOL
haftmann
parents:
22390
diff
changeset
|
949 |
from a d e have "abs(a+b) <= sup ?m ?n" |
| 14738 | 950 |
by (drule_tac abs_leI, auto) |
951 |
with g[symmetric] show ?thesis by simp |
|
952 |
qed |
|
953 |
||
|
16775
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
954 |
lemma abs_triangle_ineq2: "abs (a::'a::lordered_ab_group_abs) - |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
955 |
abs b <= abs (a - b)" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
956 |
apply (simp add: compare_rls) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
957 |
apply (subgoal_tac "abs a = abs (a - b + b)") |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
958 |
apply (erule ssubst) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
959 |
apply (rule abs_triangle_ineq) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
960 |
apply (rule arg_cong);back; |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
961 |
apply (simp add: compare_rls) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
962 |
done |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
963 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
964 |
lemma abs_triangle_ineq3: |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
965 |
"abs(abs (a::'a::lordered_ab_group_abs) - abs b) <= abs (a - b)" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
966 |
apply (subst abs_le_iff) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
967 |
apply auto |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
968 |
apply (rule abs_triangle_ineq2) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
969 |
apply (subst abs_minus_commute) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
970 |
apply (rule abs_triangle_ineq2) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
971 |
done |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
972 |
|
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
973 |
lemma abs_triangle_ineq4: "abs ((a::'a::lordered_ab_group_abs) - b) <= |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
974 |
abs a + abs b" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
975 |
proof -; |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
976 |
have "abs(a - b) = abs(a + - b)" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
977 |
by (subst diff_minus, rule refl) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
978 |
also have "... <= abs a + abs (- b)" |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
979 |
by (rule abs_triangle_ineq) |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
980 |
finally show ?thesis |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
981 |
by simp |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
982 |
qed |
|
c1b87ef4a1c3
added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities)
avigad
parents:
16417
diff
changeset
|
983 |
|
| 14738 | 984 |
lemma abs_diff_triangle_ineq: |
985 |
"\<bar>(a::'a::lordered_ab_group_abs) + b - (c+d)\<bar> \<le> \<bar>a-c\<bar> + \<bar>b-d\<bar>" |
|
986 |
proof - |
|
987 |
have "\<bar>a + b - (c+d)\<bar> = \<bar>(a-c) + (b-d)\<bar>" by (simp add: diff_minus add_ac) |
|
988 |
also have "... \<le> \<bar>a-c\<bar> + \<bar>b-d\<bar>" by (rule abs_triangle_ineq) |
|
989 |
finally show ?thesis . |
|
990 |
qed |
|
991 |
||
| 15539 | 992 |
lemma abs_add_abs[simp]: |
993 |
fixes a:: "'a::{lordered_ab_group_abs}"
|
|
994 |
shows "abs(abs a + abs b) = abs a + abs b" (is "?L = ?R") |
|
995 |
proof (rule order_antisym) |
|
996 |
show "?L \<ge> ?R" by(rule abs_ge_self) |
|
997 |
next |
|
998 |
have "?L \<le> \<bar>\<bar>a\<bar>\<bar> + \<bar>\<bar>b\<bar>\<bar>" by(rule abs_triangle_ineq) |
|
999 |
also have "\<dots> = ?R" by simp |
|
1000 |
finally show "?L \<le> ?R" . |
|
1001 |
qed |
|
1002 |
||
|
14754
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1003 |
text {* Needed for abelian cancellation simprocs: *}
|
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1004 |
|
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1005 |
lemma add_cancel_21: "((x::'a::ab_group_add) + (y + z) = y + u) = (x + z = u)" |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1006 |
apply (subst add_left_commute) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1007 |
apply (subst add_left_cancel) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1008 |
apply simp |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1009 |
done |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1010 |
|
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1011 |
lemma add_cancel_end: "(x + (y + z) = y) = (x = - (z::'a::ab_group_add))" |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1012 |
apply (subst add_cancel_21[of _ _ _ 0, simplified]) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1013 |
apply (simp add: add_right_cancel[symmetric, of "x" "-z" "z", simplified]) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1014 |
done |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1015 |
|
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1016 |
lemma less_eqI: "(x::'a::pordered_ab_group_add) - y = x' - y' \<Longrightarrow> (x < y) = (x' < y')" |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1017 |
by (simp add: less_iff_diff_less_0[of x y] less_iff_diff_less_0[of x' y']) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1018 |
|
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1019 |
lemma le_eqI: "(x::'a::pordered_ab_group_add) - y = x' - y' \<Longrightarrow> (y <= x) = (y' <= x')" |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1020 |
apply (simp add: le_iff_diff_le_0[of y x] le_iff_diff_le_0[of y' x']) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1021 |
apply (simp add: neg_le_iff_le[symmetric, of "y-x" 0] neg_le_iff_le[symmetric, of "y'-x'" 0]) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1022 |
done |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1023 |
|
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1024 |
lemma eq_eqI: "(x::'a::ab_group_add) - y = x' - y' \<Longrightarrow> (x = y) = (x' = y')" |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1025 |
by (simp add: eq_iff_diff_eq_0[of x y] eq_iff_diff_eq_0[of x' y']) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1026 |
|
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1027 |
lemma diff_def: "(x::'a::ab_group_add) - y == x + (-y)" |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1028 |
by (simp add: diff_minus) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1029 |
|
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1030 |
lemma add_minus_cancel: "(a::'a::ab_group_add) + (-a + b) = b" |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1031 |
by (simp add: add_assoc[symmetric]) |
|
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
1032 |
|
| 15178 | 1033 |
lemma le_add_right_mono: |
1034 |
assumes |
|
1035 |
"a <= b + (c::'a::pordered_ab_group_add)" |
|
1036 |
"c <= d" |
|
1037 |
shows "a <= b + d" |
|
1038 |
apply (rule_tac order_trans[where y = "b+c"]) |
|
1039 |
apply (simp_all add: prems) |
|
1040 |
done |
|
1041 |
||
|
23477
f4b83f03cac9
tuned and renamed group_eq_simps and ring_eq_simps
nipkow
parents:
23389
diff
changeset
|
1042 |
lemmas group_simps = |
| 15178 | 1043 |
mult_ac |
1044 |
add_ac |
|
1045 |
add_diff_eq diff_add_eq diff_diff_eq diff_diff_eq2 |
|
|
23477
f4b83f03cac9
tuned and renamed group_eq_simps and ring_eq_simps
nipkow
parents:
23389
diff
changeset
|
1046 |
diff_eq_eq eq_diff_eq diff_minus[symmetric] uminus_add_conv_diff |
|
f4b83f03cac9
tuned and renamed group_eq_simps and ring_eq_simps
nipkow
parents:
23389
diff
changeset
|
1047 |
diff_less_eq less_diff_eq diff_le_eq le_diff_eq |
| 15178 | 1048 |
|
1049 |
lemma estimate_by_abs: |
|
1050 |
"a + b <= (c::'a::lordered_ab_group_abs) \<Longrightarrow> a <= c + abs b" |
|
1051 |
proof - |
|
|
23477
f4b83f03cac9
tuned and renamed group_eq_simps and ring_eq_simps
nipkow
parents:
23389
diff
changeset
|
1052 |
assume "a+b <= c" |
|
f4b83f03cac9
tuned and renamed group_eq_simps and ring_eq_simps
nipkow
parents:
23389
diff
changeset
|
1053 |
hence 2: "a <= c+(-b)" by (simp add: group_simps) |
| 15178 | 1054 |
have 3: "(-b) <= abs b" by (rule abs_ge_minus_self) |
1055 |
show ?thesis by (rule le_add_right_mono[OF 2 3]) |
|
1056 |
qed |
|
1057 |
||
| 22482 | 1058 |
|
1059 |
subsection {* Tools setup *}
|
|
1060 |
||
| 17085 | 1061 |
text{*Simplification of @{term "x-y < 0"}, etc.*}
|
1062 |
lemmas diff_less_0_iff_less = less_iff_diff_less_0 [symmetric] |
|
1063 |
lemmas diff_eq_0_iff_eq = eq_iff_diff_eq_0 [symmetric] |
|
1064 |
lemmas diff_le_0_iff_le = le_iff_diff_le_0 [symmetric] |
|
1065 |
declare diff_less_0_iff_less [simp] |
|
1066 |
declare diff_eq_0_iff_eq [simp] |
|
1067 |
declare diff_le_0_iff_le [simp] |
|
1068 |
||
| 22482 | 1069 |
ML {*
|
1070 |
structure ab_group_add_cancel = Abel_Cancel( |
|
1071 |
struct |
|
1072 |
||
1073 |
(* term order for abelian groups *) |
|
1074 |
||
1075 |
fun agrp_ord (Const (a, _)) = find_index (fn a' => a = a') |
|
| 22997 | 1076 |
[@{const_name HOL.zero}, @{const_name HOL.plus},
|
1077 |
@{const_name HOL.uminus}, @{const_name HOL.minus}]
|
|
| 22482 | 1078 |
| agrp_ord _ = ~1; |
1079 |
||
1080 |
fun termless_agrp (a, b) = (Term.term_lpo agrp_ord (a, b) = LESS); |
|
1081 |
||
1082 |
local |
|
1083 |
val ac1 = mk_meta_eq @{thm add_assoc};
|
|
1084 |
val ac2 = mk_meta_eq @{thm add_commute};
|
|
1085 |
val ac3 = mk_meta_eq @{thm add_left_commute};
|
|
| 22997 | 1086 |
fun solve_add_ac thy _ (_ $ (Const (@{const_name HOL.plus},_) $ _ $ _) $ _) =
|
| 22482 | 1087 |
SOME ac1 |
| 22997 | 1088 |
| solve_add_ac thy _ (_ $ x $ (Const (@{const_name HOL.plus},_) $ y $ z)) =
|
| 22482 | 1089 |
if termless_agrp (y, x) then SOME ac3 else NONE |
1090 |
| solve_add_ac thy _ (_ $ x $ y) = |
|
1091 |
if termless_agrp (y, x) then SOME ac2 else NONE |
|
1092 |
| solve_add_ac thy _ _ = NONE |
|
1093 |
in |
|
1094 |
val add_ac_proc = Simplifier.simproc @{theory}
|
|
1095 |
"add_ac_proc" ["x + y::'a::ab_semigroup_add"] solve_add_ac; |
|
1096 |
end; |
|
1097 |
||
1098 |
val cancel_ss = HOL_basic_ss settermless termless_agrp |
|
1099 |
addsimprocs [add_ac_proc] addsimps |
|
| 23085 | 1100 |
[@{thm add_0_left}, @{thm add_0_right}, @{thm diff_def},
|
| 22482 | 1101 |
@{thm minus_add_distrib}, @{thm minus_minus}, @{thm minus_zero},
|
1102 |
@{thm right_minus}, @{thm left_minus}, @{thm add_minus_cancel},
|
|
1103 |
@{thm minus_add_cancel}];
|
|
1104 |
||
| 22548 | 1105 |
val eq_reflection = @{thm eq_reflection};
|
| 22482 | 1106 |
|
| 22548 | 1107 |
val thy_ref = Theory.self_ref @{theory};
|
| 22482 | 1108 |
|
| 22548 | 1109 |
val T = TFree("'a", ["OrderedGroup.ab_group_add"]);
|
| 22482 | 1110 |
|
| 22548 | 1111 |
val eqI_rules = [@{thm less_eqI}, @{thm le_eqI}, @{thm eq_eqI}];
|
| 22482 | 1112 |
|
1113 |
val dest_eqI = |
|
1114 |
fst o HOLogic.dest_bin "op =" HOLogic.boolT o HOLogic.dest_Trueprop o concl_of; |
|
1115 |
||
1116 |
end); |
|
1117 |
*} |
|
1118 |
||
1119 |
ML_setup {*
|
|
1120 |
Addsimprocs [ab_group_add_cancel.sum_conv, ab_group_add_cancel.rel_conv]; |
|
1121 |
*} |
|
| 17085 | 1122 |
|
| 14738 | 1123 |
end |