| author | wenzelm |
| Wed, 03 Oct 2001 20:54:16 +0200 | |
| changeset 11655 | 923e4d0d36d5 |
| parent 11357 | 908b761cdfb0 |
| child 11701 | 3d51fbf81c17 |
| permissions | -rw-r--r-- |
| 11355 | 1 |
(* Title: HOL/Library/Nat_Infinity.thy |
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ID: $Id$ |
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Author: David von Oheimb, TU Muenchen |
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License: GPL (GNU GENERAL PUBLIC LICENSE) |
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*) |
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header {*
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\title{Natural numbers with infinity}
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\author{David von Oheimb}
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*} |
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theory Nat_Infinity = Main: |
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subsection "Definitions" |
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text {*
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We extend the standard natural numbers by a special value indicating |
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infinity. This includes extending the ordering relations @{term "op
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<"} and @{term "op \<le>"}.
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*} |
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datatype inat = Fin nat | Infty |
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instance inat :: ord .. |
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instance inat :: zero .. |
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consts |
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iSuc :: "inat => inat" |
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syntax (xsymbols) |
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Infty :: inat ("\<infinity>")
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defs |
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iZero_def: "0 == Fin 0" |
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iSuc_def: "iSuc i == case i of Fin n => Fin (Suc n) | \<infinity> => \<infinity>" |
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iless_def: "m < n == |
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case m of Fin m1 => (case n of Fin n1 => m1 < n1 | \<infinity> => True) |
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| \<infinity> => False" |
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ile_def: "(m::inat) \<le> n == \<not> (n < m)" |
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lemmas inat_defs = iZero_def iSuc_def iless_def ile_def |
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lemmas inat_splits = inat.split inat.split_asm |
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text {*
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Below is a not quite complete set of theorems. Use the method |
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@{text "(simp add: inat_defs split:inat_splits, arith?)"} to prove
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new theorems or solve arithmetic subgoals involving @{typ inat} on
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the fly. |
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*} |
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subsection "Constructors" |
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lemma Fin_0: "Fin 0 = 0" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma Infty_ne_i0 [simp]: "\<infinity> \<noteq> 0" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma i0_ne_Infty [simp]: "0 \<noteq> \<infinity>" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iSuc_Fin [simp]: "iSuc (Fin n) = Fin (Suc n)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iSuc_Infty [simp]: "iSuc \<infinity> = \<infinity>" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iSuc_ne_0 [simp]: "iSuc n \<noteq> 0" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iSuc_inject [simp]: "(iSuc x = iSuc y) = (x = y)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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subsection "Ordering relations" |
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lemma Infty_ilessE [elim!]: "\<infinity> < Fin m ==> R" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iless_linear: "m < n \<or> m = n \<or> n < (m::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iless_not_refl [simp]: "\<not> n < (n::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iless_trans: "i < j ==> j < k ==> i < (k::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iless_not_sym: "n < m ==> \<not> m < (n::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma Fin_iless_mono [simp]: "(Fin n < Fin m) = (n < m)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma Fin_iless_Infty [simp]: "Fin n < \<infinity>" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma Infty_eq [simp]: "(n < \<infinity>) = (n \<noteq> \<infinity>)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma i0_eq [simp]: "((0::inat) < n) = (n \<noteq> 0)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma i0_iless_iSuc [simp]: "0 < iSuc n" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma not_ilessi0 [simp]: "\<not> n < (0::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma Fin_iless: "n < Fin m ==> \<exists>k. n = Fin k" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iSuc_mono [simp]: "(iSuc n < iSuc m) = (n < m)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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(* ----------------------------------------------------------------------- *) |
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lemma ile_def2: "(m \<le> n) = (m < n \<or> m = (n::inat))" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma ile_refl [simp]: "n \<le> (n::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma ile_trans: "i \<le> j ==> j \<le> k ==> i \<le> (k::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma ile_iless_trans: "i \<le> j ==> j < k ==> i < (k::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iless_ile_trans: "i < j ==> j \<le> k ==> i < (k::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma Infty_ub [simp]: "n \<le> \<infinity>" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma i0_lb [simp]: "(0::inat) \<le> n" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma Infty_ileE [elim!]: "\<infinity> \<le> Fin m ==> R" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma Fin_ile_mono [simp]: "(Fin n \<le> Fin m) = (n \<le> m)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma ilessI1: "n \<le> m ==> n \<noteq> m ==> n < (m::inat)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma ileI1: "m < n ==> iSuc m \<le> n" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma Suc_ile_eq: "(Fin (Suc m) \<le> n) = (Fin m < n)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iSuc_ile_mono [simp]: "(iSuc n \<le> iSuc m) = (n \<le> m)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma iless_Suc_eq [simp]: "(Fin m < iSuc n) = (Fin m \<le> n)" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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lemma not_iSuc_ilei0 [simp]: "\<not> iSuc n \<le> 0" |
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by (simp add: inat_defs split:inat_splits, arith?) |
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added Library/Nat_Infinity.thy and Library/Continuity.thy
oheimb
parents:
diff
changeset
|
163 |
|
| 11355 | 164 |
lemma ile_iSuc [simp]: "n \<le> iSuc n" |
| 11357 | 165 |
by (simp add: inat_defs split:inat_splits, arith?) |
|
11351
c5c403d30c77
added Library/Nat_Infinity.thy and Library/Continuity.thy
oheimb
parents:
diff
changeset
|
166 |
|
| 11355 | 167 |
lemma Fin_ile: "n \<le> Fin m ==> \<exists>k. n = Fin k" |
| 11357 | 168 |
by (simp add: inat_defs split:inat_splits, arith?) |
|
11351
c5c403d30c77
added Library/Nat_Infinity.thy and Library/Continuity.thy
oheimb
parents:
diff
changeset
|
169 |
|
|
c5c403d30c77
added Library/Nat_Infinity.thy and Library/Continuity.thy
oheimb
parents:
diff
changeset
|
170 |
lemma chain_incr: "\<forall>i. \<exists>j. Y i < Y j ==> \<exists>j. Fin k < Y j" |
| 11355 | 171 |
apply (induct_tac k) |
172 |
apply (simp (no_asm) only: Fin_0) |
|
173 |
apply (fast intro: ile_iless_trans i0_lb) |
|
174 |
apply (erule exE) |
|
175 |
apply (drule spec) |
|
176 |
apply (erule exE) |
|
177 |
apply (drule ileI1) |
|
178 |
apply (rule iSuc_Fin [THEN subst]) |
|
179 |
apply (rule exI) |
|
180 |
apply (erule (1) ile_iless_trans) |
|
181 |
done |
|
|
11351
c5c403d30c77
added Library/Nat_Infinity.thy and Library/Continuity.thy
oheimb
parents:
diff
changeset
|
182 |
|
|
c5c403d30c77
added Library/Nat_Infinity.thy and Library/Continuity.thy
oheimb
parents:
diff
changeset
|
183 |
end |