| author | blanchet |
| Mon, 20 Jan 2014 18:24:56 +0100 | |
| changeset 55062 | 6d3fad6f01c9 |
| parent 55059 | ef2e0fb783c6 |
| child 55066 | 4e5ddf3162ac |
| permissions | -rw-r--r-- |
| 55059 | 1 |
(* Title: HOL/BNF_Comp.thy |
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Author: Dmitriy Traytel, TU Muenchen |
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Copyright 2012 |
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Composition of bounded natural functors. |
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*) |
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header {* Composition of Bounded Natural Functors *}
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theory BNF_Comp |
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imports Basic_BNFs |
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begin |
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lemma empty_natural: "(\<lambda>_. {}) o f = image g o (\<lambda>_. {})"
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by (rule ext) simp |
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lemma Union_natural: "Union o image (image f) = image f o Union" |
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by (rule ext) (auto simp only: o_apply) |
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lemma in_Union_o_assoc: "x \<in> (Union o gset o gmap) A \<Longrightarrow> x \<in> (Union o (gset o gmap)) A" |
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by (unfold o_assoc) |
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lemma comp_single_set_bd: |
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assumes fbd_Card_order: "Card_order fbd" and |
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fset_bd: "\<And>x. |fset x| \<le>o fbd" and |
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gset_bd: "\<And>x. |gset x| \<le>o gbd" |
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haftmann
parents:
51893
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shows "|\<Union>(fset ` gset x)| \<le>o gbd *c fbd" |
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apply (subst sym[OF SUP_def]) |
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apply (rule ordLeq_transitive) |
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apply (rule card_of_UNION_Sigma) |
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apply (subst SIGMA_CSUM) |
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apply (rule ordLeq_transitive) |
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apply (rule card_of_Csum_Times') |
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apply (rule fbd_Card_order) |
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apply (rule ballI) |
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apply (rule fset_bd) |
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apply (rule ordLeq_transitive) |
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apply (rule cprod_mono1) |
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apply (rule gset_bd) |
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apply (rule ordIso_imp_ordLeq) |
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apply (rule ordIso_refl) |
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apply (rule Card_order_cprod) |
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done |
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haftmann
parents:
51893
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lemma Union_image_insert: "\<Union>(f ` insert a B) = f a \<union> \<Union>(f ` B)" |
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by simp |
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haftmann
parents:
51893
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lemma Union_image_empty: "A \<union> \<Union>(f ` {}) = A"
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by simp |
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lemma image_o_collect: "collect ((\<lambda>f. image g o f) ` F) = image g o collect F" |
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by (rule ext) (auto simp add: collect_def) |
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lemma conj_subset_def: "A \<subseteq> {x. P x \<and> Q x} = (A \<subseteq> {x. P x} \<and> A \<subseteq> {x. Q x})"
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by blast |
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weaker precendence of syntax for big intersection and union on sets
haftmann
parents:
51893
diff
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lemma UN_image_subset: "\<Union>(f ` g x) \<subseteq> X = (g x \<subseteq> {x. f x \<subseteq> X})"
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by blast |
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haftmann
parents:
51893
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changeset
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lemma comp_set_bd_Union_o_collect: "|\<Union>\<Union>((\<lambda>f. f x) ` X)| \<le>o hbd \<Longrightarrow> |(Union \<circ> collect X) x| \<le>o hbd" |
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by (unfold o_apply collect_def SUP_def) |
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lemma wpull_cong: |
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"\<lbrakk>A' = A; B1' = B1; B2' = B2; wpull A B1 B2 f1 f2 p1 p2\<rbrakk> \<Longrightarrow> wpull A' B1' B2' f1 f2 p1 p2" |
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by simp |
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traytel
parents:
49512
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lemma Grp_fst_snd: "(Grp (Collect (split R)) fst)^--1 OO Grp (Collect (split R)) snd = R" |
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traytel
parents:
49512
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unfolding Grp_def fun_eq_iff relcompp.simps by auto |
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596baae88a88
got rid of the set based relator---use (binary) predicate based relator instead
traytel
parents:
49512
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changeset
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596baae88a88
got rid of the set based relator---use (binary) predicate based relator instead
traytel
parents:
49512
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changeset
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lemma OO_Grp_cong: "A = B \<Longrightarrow> (Grp A f)^--1 OO Grp A g = (Grp B f)^--1 OO Grp B g" |
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596baae88a88
got rid of the set based relator---use (binary) predicate based relator instead
traytel
parents:
49512
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changeset
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by simp |
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596baae88a88
got rid of the set based relator---use (binary) predicate based relator instead
traytel
parents:
49512
diff
changeset
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ML_file "Tools/BNF/bnf_comp_tactics.ML" |
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ML_file "Tools/BNF/bnf_comp.ML" |
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split basic BNFs into really basic ones and others, and added Andreas Lochbihler's "option" BNF
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48975
7f79f94a432c
added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei)
blanchet
parents:
diff
changeset
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end |