| author | nipkow |
| Fri, 19 Mar 2004 11:06:53 +0100 | |
| changeset 14478 | bdf6b7adc3ec |
| parent 14418 | b62323c85134 |
| child 14485 | ea2707645af8 |
| permissions | -rw-r--r-- |
| 8924 | 1 |
(* Title: HOL/SetInterval.thy |
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ID: $Id$ |
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Author: Tobias Nipkow and Clemens Ballarin |
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Copyright 2000 TU Muenchen |
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lessThan, greaterThan, atLeast, atMost and two-sided intervals |
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*) |
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theory SetInterval = NatArith: |
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constdefs |
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eliminated theories "equalities" and "mono" (made part of "Typedef",
wenzelm
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10214
diff
changeset
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lessThan :: "('a::ord) => 'a set" ("(1{.._'(})")
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eliminated theories "equalities" and "mono" (made part of "Typedef",
wenzelm
parents:
10214
diff
changeset
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"{..u(} == {x. x<u}"
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11609
3f3d1add4d94
eliminated theories "equalities" and "mono" (made part of "Typedef",
wenzelm
parents:
10214
diff
changeset
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atMost :: "('a::ord) => 'a set" ("(1{.._})")
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3f3d1add4d94
eliminated theories "equalities" and "mono" (made part of "Typedef",
wenzelm
parents:
10214
diff
changeset
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"{..u} == {x. x<=u}"
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11609
3f3d1add4d94
eliminated theories "equalities" and "mono" (made part of "Typedef",
wenzelm
parents:
10214
diff
changeset
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greaterThan :: "('a::ord) => 'a set" ("(1{')_..})")
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3f3d1add4d94
eliminated theories "equalities" and "mono" (made part of "Typedef",
wenzelm
parents:
10214
diff
changeset
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"{)l..} == {x. l<x}"
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11609
3f3d1add4d94
eliminated theories "equalities" and "mono" (made part of "Typedef",
wenzelm
parents:
10214
diff
changeset
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atLeast :: "('a::ord) => 'a set" ("(1{_..})")
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3f3d1add4d94
eliminated theories "equalities" and "mono" (made part of "Typedef",
wenzelm
parents:
10214
diff
changeset
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"{l..} == {x. l<=x}"
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greaterThanLessThan :: "['a::ord, 'a] => 'a set" ("(1{')_.._'(})")
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"{)l..u(} == {)l..} Int {..u(}"
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atLeastLessThan :: "['a::ord, 'a] => 'a set" ("(1{_.._'(})")
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"{l..u(} == {l..} Int {..u(}"
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greaterThanAtMost :: "['a::ord, 'a] => 'a set" ("(1{')_.._})")
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"{)l..u} == {)l..} Int {..u}"
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atLeastAtMost :: "['a::ord, 'a] => 'a set" ("(1{_.._})")
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"{l..u} == {l..} Int {..u}"
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syntax |
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"@UNION_le" :: "nat => nat => 'b set => 'b set" ("(3UN _<=_./ _)" 10)
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"@UNION_less" :: "nat => nat => 'b set => 'b set" ("(3UN _<_./ _)" 10)
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"@INTER_le" :: "nat => nat => 'b set => 'b set" ("(3INT _<=_./ _)" 10)
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"@INTER_less" :: "nat => nat => 'b set => 'b set" ("(3INT _<_./ _)" 10)
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syntax (input) |
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"@UNION_le" :: "nat => nat => 'b set => 'b set" ("(3\<Union> _\<le>_./ _)" 10)
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"@UNION_less" :: "nat => nat => 'b set => 'b set" ("(3\<Union> _<_./ _)" 10)
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"@INTER_le" :: "nat => nat => 'b set => 'b set" ("(3\<Inter> _\<le>_./ _)" 10)
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"@INTER_less" :: "nat => nat => 'b set => 'b set" ("(3\<Inter> _<_./ _)" 10)
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syntax (xsymbols) |
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"@UNION_le" :: "nat \<Rightarrow> nat => 'b set => 'b set" ("(3\<Union>\<^bsub>_ \<le> _\<^esub>/ _)" 10)
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"@UNION_less" :: "nat \<Rightarrow> nat => 'b set => 'b set" ("(3\<Union>\<^bsub>_ < _\<^esub>/ _)" 10)
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"@INTER_le" :: "nat \<Rightarrow> nat => 'b set => 'b set" ("(3\<Inter>\<^bsub>_ \<le> _\<^esub>/ _)" 10)
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"@INTER_less" :: "nat \<Rightarrow> nat => 'b set => 'b set" ("(3\<Inter>\<^bsub>_ < _\<^esub>/ _)" 10)
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translations |
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"UN i<=n. A" == "UN i:{..n}. A"
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"UN i<n. A" == "UN i:{..n(}. A"
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"INT i<=n. A" == "INT i:{..n}. A"
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"INT i<n. A" == "INT i:{..n(}. A"
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subsection {*lessThan*}
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lemma lessThan_iff [iff]: "(i: lessThan k) = (i<k)" |
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by (simp add: lessThan_def) |
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lemma lessThan_0 [simp]: "lessThan (0::nat) = {}"
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by (simp add: lessThan_def) |
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lemma lessThan_Suc: "lessThan (Suc k) = insert k (lessThan k)" |
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by (simp add: lessThan_def less_Suc_eq, blast) |
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lemma lessThan_Suc_atMost: "lessThan (Suc k) = atMost k" |
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by (simp add: lessThan_def atMost_def less_Suc_eq_le) |
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lemma UN_lessThan_UNIV: "(UN m::nat. lessThan m) = UNIV" |
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by blast |
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lemma Compl_lessThan [simp]: |
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"!!k:: 'a::linorder. -lessThan k = atLeast k" |
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apply (auto simp add: lessThan_def atLeast_def) |
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done |
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lemma single_Diff_lessThan [simp]: "!!k:: 'a::order. {k} - lessThan k = {k}"
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by auto |
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subsection {*greaterThan*}
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lemma greaterThan_iff [iff]: "(i: greaterThan k) = (k<i)" |
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by (simp add: greaterThan_def) |
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lemma greaterThan_0 [simp]: "greaterThan 0 = range Suc" |
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apply (simp add: greaterThan_def) |
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apply (blast dest: gr0_conv_Suc [THEN iffD1]) |
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done |
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lemma greaterThan_Suc: "greaterThan (Suc k) = greaterThan k - {Suc k}"
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apply (simp add: greaterThan_def) |
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apply (auto elim: linorder_neqE) |
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done |
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lemma INT_greaterThan_UNIV: "(INT m::nat. greaterThan m) = {}"
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by blast |
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lemma Compl_greaterThan [simp]: |
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"!!k:: 'a::linorder. -greaterThan k = atMost k" |
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apply (simp add: greaterThan_def atMost_def le_def, auto) |
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done |
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lemma Compl_atMost [simp]: "!!k:: 'a::linorder. -atMost k = greaterThan k" |
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apply (subst Compl_greaterThan [symmetric]) |
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apply (rule double_complement) |
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done |
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subsection {*atLeast*}
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lemma atLeast_iff [iff]: "(i: atLeast k) = (k<=i)" |
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by (simp add: atLeast_def) |
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lemma atLeast_0 [simp]: "atLeast (0::nat) = UNIV" |
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by (unfold atLeast_def UNIV_def, simp) |
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lemma atLeast_Suc: "atLeast (Suc k) = atLeast k - {k}"
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apply (simp add: atLeast_def) |
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apply (simp add: Suc_le_eq) |
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apply (simp add: order_le_less, blast) |
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done |
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lemma UN_atLeast_UNIV: "(UN m::nat. atLeast m) = UNIV" |
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by blast |
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lemma Compl_atLeast [simp]: |
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"!!k:: 'a::linorder. -atLeast k = lessThan k" |
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apply (simp add: lessThan_def atLeast_def le_def, auto) |
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done |
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subsection {*atMost*}
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lemma atMost_iff [iff]: "(i: atMost k) = (i<=k)" |
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by (simp add: atMost_def) |
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lemma atMost_0 [simp]: "atMost (0::nat) = {0}"
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by (simp add: atMost_def) |
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lemma atMost_Suc: "atMost (Suc k) = insert (Suc k) (atMost k)" |
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apply (simp add: atMost_def) |
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apply (simp add: less_Suc_eq order_le_less, blast) |
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done |
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lemma UN_atMost_UNIV: "(UN m::nat. atMost m) = UNIV" |
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by blast |
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subsection {*Logical Equivalences for Set Inclusion and Equality*}
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lemma atLeast_subset_iff [iff]: |
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"(atLeast x \<subseteq> atLeast y) = (y \<le> (x::'a::order))" |
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by (blast intro: order_trans) |
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lemma atLeast_eq_iff [iff]: |
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"(atLeast x = atLeast y) = (x = (y::'a::linorder))" |
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by (blast intro: order_antisym order_trans) |
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lemma greaterThan_subset_iff [iff]: |
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"(greaterThan x \<subseteq> greaterThan y) = (y \<le> (x::'a::linorder))" |
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apply (auto simp add: greaterThan_def) |
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apply (subst linorder_not_less [symmetric], blast) |
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done |
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lemma greaterThan_eq_iff [iff]: |
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"(greaterThan x = greaterThan y) = (x = (y::'a::linorder))" |
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apply (rule iffI) |
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apply (erule equalityE) |
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apply (simp add: greaterThan_subset_iff order_antisym, simp) |
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done |
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lemma atMost_subset_iff [iff]: "(atMost x \<subseteq> atMost y) = (x \<le> (y::'a::order))" |
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by (blast intro: order_trans) |
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lemma atMost_eq_iff [iff]: "(atMost x = atMost y) = (x = (y::'a::linorder))" |
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by (blast intro: order_antisym order_trans) |
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lemma lessThan_subset_iff [iff]: |
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"(lessThan x \<subseteq> lessThan y) = (x \<le> (y::'a::linorder))" |
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apply (auto simp add: lessThan_def) |
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apply (subst linorder_not_less [symmetric], blast) |
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done |
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lemma lessThan_eq_iff [iff]: |
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"(lessThan x = lessThan y) = (x = (y::'a::linorder))" |
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apply (rule iffI) |
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apply (erule equalityE) |
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apply (simp add: lessThan_subset_iff order_antisym, simp) |
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done |
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subsection {*Combined properties*}
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lemma atMost_Int_atLeast: "!!n:: 'a::order. atMost n Int atLeast n = {n}"
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by (blast intro: order_antisym) |
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subsection {*Two-sided intervals*}
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(* greaterThanLessThan *) |
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lemma greaterThanLessThan_iff [simp]: |
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"(i : {)l..u(}) = (l < i & i < u)"
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by (simp add: greaterThanLessThan_def) |
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lemma greaterThanLessThan_0 [simp]: "{)l..0::nat(} == {}"
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by (simp add: greaterThanLessThan_def) |
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lemma greaterThanLessThan_Suc_greaterThanAtMost: |
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"{)l..Suc n(} = {)l..n}"
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by (auto simp add: greaterThanLessThan_def greaterThanAtMost_def) |
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(* atLeastLessThan *) |
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lemma atLeastLessThan_iff [simp]: |
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"(i : {l..u(}) = (l <= i & i < u)"
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by (simp add: atLeastLessThan_def) |
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lemma atLeastLessThan_0 [simp]: "{l..0::nat(} == {}"
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by (simp add: atLeastLessThan_def) |
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lemma atLeastLessThan_Suc_atLeastAtMost: "{l..Suc n(} = {l..n}"
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by (auto simp add: atLeastLessThan_def atLeastAtMost_def) |
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(* greaterThanAtMost *) |
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lemma greaterThanAtMost_iff [simp]: |
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"(i : {)l..u}) = (l < i & i <= u)"
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by (simp add: greaterThanAtMost_def) |
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(* atLeastAtMost *) |
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lemma atLeastAtMost_iff [simp]: |
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"(i : {l..u}) = (l <= i & i <= u)"
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by (simp add: atLeastAtMost_def) |
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(* The above four lemmas could be declared as iffs. |
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If we do so, a call to blast in Hyperreal/Star.ML, lemma STAR_Int |
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seems to take forever (more than one hour). *) |
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subsection {*Lemmas useful with the summation operator setsum*}
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(* For examples, see Algebra/poly/UnivPoly.thy *) |
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(** Disjoint Unions **) |
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(* Singletons and open intervals *) |
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lemma ivl_disj_un_singleton: |
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"{l::'a::linorder} Un {)l..} = {l..}"
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"{..u(} Un {u::'a::linorder} = {..u}"
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"(l::'a::linorder) < u ==> {l} Un {)l..u(} = {l..u(}"
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"(l::'a::linorder) < u ==> {)l..u(} Un {u} = {)l..u}"
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"(l::'a::linorder) <= u ==> {l} Un {)l..u} = {l..u}"
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"(l::'a::linorder) <= u ==> {l..u(} Un {u} = {l..u}"
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14398
c5c47703f763
Efficient, graph-based reasoner for linear and partial orders.
ballarin
parents:
13850
diff
changeset
|
262 |
by auto |
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(* One- and two-sided intervals *) |
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lemma ivl_disj_un_one: |
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"(l::'a::linorder) < u ==> {..l} Un {)l..u(} = {..u(}"
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"(l::'a::linorder) <= u ==> {..l(} Un {l..u(} = {..u(}"
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"(l::'a::linorder) <= u ==> {..l} Un {)l..u} = {..u}"
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"(l::'a::linorder) <= u ==> {..l(} Un {l..u} = {..u}"
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"(l::'a::linorder) <= u ==> {)l..u} Un {)u..} = {)l..}"
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"(l::'a::linorder) < u ==> {)l..u(} Un {u..} = {)l..}"
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"(l::'a::linorder) <= u ==> {l..u} Un {)u..} = {l..}"
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"(l::'a::linorder) <= u ==> {l..u(} Un {u..} = {l..}"
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14398
c5c47703f763
Efficient, graph-based reasoner for linear and partial orders.
ballarin
parents:
13850
diff
changeset
|
275 |
by auto |
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(* Two- and two-sided intervals *) |
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lemma ivl_disj_un_two: |
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"[| (l::'a::linorder) < m; m <= u |] ==> {)l..m(} Un {m..u(} = {)l..u(}"
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"[| (l::'a::linorder) <= m; m < u |] ==> {)l..m} Un {)m..u(} = {)l..u(}"
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"[| (l::'a::linorder) <= m; m <= u |] ==> {l..m(} Un {m..u(} = {l..u(}"
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"[| (l::'a::linorder) <= m; m < u |] ==> {l..m} Un {)m..u(} = {l..u(}"
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"[| (l::'a::linorder) < m; m <= u |] ==> {)l..m(} Un {m..u} = {)l..u}"
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"[| (l::'a::linorder) <= m; m <= u |] ==> {)l..m} Un {)m..u} = {)l..u}"
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"[| (l::'a::linorder) <= m; m <= u |] ==> {l..m(} Un {m..u} = {l..u}"
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"[| (l::'a::linorder) <= m; m <= u |] ==> {l..m} Un {)m..u} = {l..u}"
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14398
c5c47703f763
Efficient, graph-based reasoner for linear and partial orders.
ballarin
parents:
13850
diff
changeset
|
288 |
by auto |
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290 |
lemmas ivl_disj_un = ivl_disj_un_singleton ivl_disj_un_one ivl_disj_un_two |
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(** Disjoint Intersections **) |
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(* Singletons and open intervals *) |
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lemma ivl_disj_int_singleton: |
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"{l::'a::order} Int {)l..} = {}"
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"{..u(} Int {u} = {}"
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"{l} Int {)l..u(} = {}"
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"{)l..u(} Int {u} = {}"
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"{l} Int {)l..u} = {}"
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"{l..u(} Int {u} = {}"
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by simp+ |
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(* One- and two-sided intervals *) |
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lemma ivl_disj_int_one: |
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"{..l::'a::order} Int {)l..u(} = {}"
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"{..l(} Int {l..u(} = {}"
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"{..l} Int {)l..u} = {}"
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"{..l(} Int {l..u} = {}"
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"{)l..u} Int {)u..} = {}"
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"{)l..u(} Int {u..} = {}"
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"{l..u} Int {)u..} = {}"
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"{l..u(} Int {u..} = {}"
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14398
c5c47703f763
Efficient, graph-based reasoner for linear and partial orders.
ballarin
parents:
13850
diff
changeset
|
316 |
by auto |
| 13735 | 317 |
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318 |
(* Two- and two-sided intervals *) |
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320 |
lemma ivl_disj_int_two: |
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"{)l::'a::order..m(} Int {m..u(} = {}"
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"{)l..m} Int {)m..u(} = {}"
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"{l..m(} Int {m..u(} = {}"
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"{l..m} Int {)m..u(} = {}"
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"{)l..m(} Int {m..u} = {}"
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326 |
"{)l..m} Int {)m..u} = {}"
|
|
327 |
"{l..m(} Int {m..u} = {}"
|
|
328 |
"{l..m} Int {)m..u} = {}"
|
|
|
14398
c5c47703f763
Efficient, graph-based reasoner for linear and partial orders.
ballarin
parents:
13850
diff
changeset
|
329 |
by auto |
| 13735 | 330 |
|
331 |
lemmas ivl_disj_int = ivl_disj_int_singleton ivl_disj_int_one ivl_disj_int_two |
|
332 |
||
| 8924 | 333 |
end |