src/HOL/HOL.thy
author wenzelm
Wed Sep 17 21:27:14 2008 +0200 (2008-09-17)
changeset 28263 69eaa97e7e96
parent 28227 77221ee0f7b9
child 28325 0b6b83ec8458
permissions -rw-r--r--
moved global ML bindings to global place;
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(*  Title:      HOL/HOL.thy
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    ID:         $Id$
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    Author:     Tobias Nipkow, Markus Wenzel, and Larry Paulson
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*)
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header {* The basis of Higher-Order Logic *}
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theory HOL
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imports Pure
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uses
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  ("hologic.ML")
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  "~~/src/Tools/IsaPlanner/zipper.ML"
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  "~~/src/Tools/IsaPlanner/isand.ML"
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  "~~/src/Tools/IsaPlanner/rw_tools.ML"
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  "~~/src/Tools/IsaPlanner/rw_inst.ML"
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  "~~/src/Provers/project_rule.ML"
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  "~~/src/Provers/hypsubst.ML"
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  "~~/src/Provers/splitter.ML"
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  "~~/src/Provers/classical.ML"
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  "~~/src/Provers/blast.ML"
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  "~~/src/Provers/clasimp.ML"
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  "~~/src/Provers/eqsubst.ML"
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  "~~/src/Provers/quantifier1.ML"
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  ("simpdata.ML")
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  "~~/src/Tools/random_word.ML"
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  "~~/src/Tools/atomize_elim.ML"
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  "~~/src/Tools/induct.ML"
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  ("~~/src/Tools/induct_tacs.ML")
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  "~~/src/Tools/code/code_name.ML"
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  "~~/src/Tools/code/code_funcgr.ML"
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  "~~/src/Tools/code/code_thingol.ML"
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  "~~/src/Tools/code/code_printer.ML"
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  "~~/src/Tools/code/code_target.ML"
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  "~~/src/Tools/code/code_ml.ML"
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  "~~/src/Tools/code/code_haskell.ML"
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  "~~/src/Tools/nbe.ML"
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begin
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subsection {* Primitive logic *}
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subsubsection {* Core syntax *}
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classes type
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defaultsort type
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setup {* ObjectLogic.add_base_sort @{sort type} *}
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arities
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  "fun" :: (type, type) type
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  itself :: (type) type
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global
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typedecl bool
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judgment
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  Trueprop      :: "bool => prop"                   ("(_)" 5)
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consts
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  Not           :: "bool => bool"                   ("~ _" [40] 40)
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  True          :: bool
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  False         :: bool
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  arbitrary     :: 'a
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  The           :: "('a => bool) => 'a"
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  All           :: "('a => bool) => bool"           (binder "ALL " 10)
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  Ex            :: "('a => bool) => bool"           (binder "EX " 10)
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  Ex1           :: "('a => bool) => bool"           (binder "EX! " 10)
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  Let           :: "['a, 'a => 'b] => 'b"
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  "op ="        :: "['a, 'a] => bool"               (infixl "=" 50)
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  "op &"        :: "[bool, bool] => bool"           (infixr "&" 35)
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  "op |"        :: "[bool, bool] => bool"           (infixr "|" 30)
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  "op -->"      :: "[bool, bool] => bool"           (infixr "-->" 25)
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local
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consts
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  If            :: "[bool, 'a, 'a] => 'a"           ("(if (_)/ then (_)/ else (_))" 10)
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subsubsection {* Additional concrete syntax *}
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notation (output)
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  "op ="  (infix "=" 50)
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abbreviation
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  not_equal :: "['a, 'a] => bool"  (infixl "~=" 50) where
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  "x ~= y == ~ (x = y)"
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notation (output)
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  not_equal  (infix "~=" 50)
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notation (xsymbols)
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  Not  ("\<not> _" [40] 40) and
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  "op &"  (infixr "\<and>" 35) and
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  "op |"  (infixr "\<or>" 30) and
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  "op -->"  (infixr "\<longrightarrow>" 25) and
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  not_equal  (infix "\<noteq>" 50)
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notation (HTML output)
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  Not  ("\<not> _" [40] 40) and
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  "op &"  (infixr "\<and>" 35) and
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  "op |"  (infixr "\<or>" 30) and
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  not_equal  (infix "\<noteq>" 50)
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abbreviation (iff)
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  iff :: "[bool, bool] => bool"  (infixr "<->" 25) where
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  "A <-> B == A = B"
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notation (xsymbols)
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  iff  (infixr "\<longleftrightarrow>" 25)
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nonterminals
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  letbinds  letbind
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  case_syn  cases_syn
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syntax
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  "_The"        :: "[pttrn, bool] => 'a"                 ("(3THE _./ _)" [0, 10] 10)
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  "_bind"       :: "[pttrn, 'a] => letbind"              ("(2_ =/ _)" 10)
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  ""            :: "letbind => letbinds"                 ("_")
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  "_binds"      :: "[letbind, letbinds] => letbinds"     ("_;/ _")
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  "_Let"        :: "[letbinds, 'a] => 'a"                ("(let (_)/ in (_))" 10)
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  "_case_syntax":: "['a, cases_syn] => 'b"               ("(case _ of/ _)" 10)
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  "_case1"      :: "['a, 'b] => case_syn"                ("(2_ =>/ _)" 10)
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  ""            :: "case_syn => cases_syn"               ("_")
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  "_case2"      :: "[case_syn, cases_syn] => cases_syn"  ("_/ | _")
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translations
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  "THE x. P"              == "The (%x. P)"
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  "_Let (_binds b bs) e"  == "_Let b (_Let bs e)"
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  "let x = a in e"        == "Let a (%x. e)"
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print_translation {*
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(* To avoid eta-contraction of body: *)
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[("The", fn [Abs abs] =>
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     let val (x,t) = atomic_abs_tr' abs
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     in Syntax.const "_The" $ x $ t end)]
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*}
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syntax (xsymbols)
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  "_case1"      :: "['a, 'b] => case_syn"                ("(2_ \<Rightarrow>/ _)" 10)
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notation (xsymbols)
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  All  (binder "\<forall>" 10) and
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  Ex  (binder "\<exists>" 10) and
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  Ex1  (binder "\<exists>!" 10)
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notation (HTML output)
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  All  (binder "\<forall>" 10) and
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  Ex  (binder "\<exists>" 10) and
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  Ex1  (binder "\<exists>!" 10)
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notation (HOL)
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  All  (binder "! " 10) and
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  Ex  (binder "? " 10) and
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  Ex1  (binder "?! " 10)
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subsubsection {* Axioms and basic definitions *}
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axioms
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  eq_reflection:  "(x=y) ==> (x==y)"
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  refl:           "t = (t::'a)"
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  ext:            "(!!x::'a. (f x ::'b) = g x) ==> (%x. f x) = (%x. g x)"
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    -- {*Extensionality is built into the meta-logic, and this rule expresses
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         a related property.  It is an eta-expanded version of the traditional
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         rule, and similar to the ABS rule of HOL*}
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  the_eq_trivial: "(THE x. x = a) = (a::'a)"
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  impI:           "(P ==> Q) ==> P-->Q"
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  mp:             "[| P-->Q;  P |] ==> Q"
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defs
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  True_def:     "True      == ((%x::bool. x) = (%x. x))"
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  All_def:      "All(P)    == (P = (%x. True))"
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  Ex_def:       "Ex(P)     == !Q. (!x. P x --> Q) --> Q"
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  False_def:    "False     == (!P. P)"
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  not_def:      "~ P       == P-->False"
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  and_def:      "P & Q     == !R. (P-->Q-->R) --> R"
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  or_def:       "P | Q     == !R. (P-->R) --> (Q-->R) --> R"
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  Ex1_def:      "Ex1(P)    == ? x. P(x) & (! y. P(y) --> y=x)"
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axioms
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  iff:          "(P-->Q) --> (Q-->P) --> (P=Q)"
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  True_or_False:  "(P=True) | (P=False)"
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defs
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  Let_def:      "Let s f == f(s)"
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  if_def:       "If P x y == THE z::'a. (P=True --> z=x) & (P=False --> z=y)"
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finalconsts
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  "op ="
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  "op -->"
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  The
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  arbitrary
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axiomatization
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  undefined :: 'a
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axiomatization where
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  undefined_fun: "undefined x = undefined"
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subsubsection {* Generic classes and algebraic operations *}
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class default = type +
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  fixes default :: 'a
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class zero = type + 
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  fixes zero :: 'a  ("0")
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class one = type +
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  fixes one  :: 'a  ("1")
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hide (open) const zero one
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class plus = type +
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  fixes plus :: "'a \<Rightarrow> 'a \<Rightarrow> 'a"  (infixl "+" 65)
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class minus = type +
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  fixes minus :: "'a \<Rightarrow> 'a \<Rightarrow> 'a"  (infixl "-" 65)
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class uminus = type +
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  fixes uminus :: "'a \<Rightarrow> 'a"  ("- _" [81] 80)
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class times = type +
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  fixes times :: "'a \<Rightarrow> 'a \<Rightarrow> 'a"  (infixl "*" 70)
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class inverse = type +
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  fixes inverse :: "'a \<Rightarrow> 'a"
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    and divide :: "'a \<Rightarrow> 'a \<Rightarrow> 'a"  (infixl "'/" 70)
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class abs = type +
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  fixes abs :: "'a \<Rightarrow> 'a"
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begin
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notation (xsymbols)
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  abs  ("\<bar>_\<bar>")
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notation (HTML output)
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  abs  ("\<bar>_\<bar>")
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end
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class sgn = type +
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  fixes sgn :: "'a \<Rightarrow> 'a"
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class ord = type +
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  fixes less_eq :: "'a \<Rightarrow> 'a \<Rightarrow> bool"
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    and less :: "'a \<Rightarrow> 'a \<Rightarrow> bool"
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begin
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notation
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  less_eq  ("op <=") and
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  less_eq  ("(_/ <= _)" [51, 51] 50) and
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  less  ("op <") and
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  less  ("(_/ < _)"  [51, 51] 50)
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notation (xsymbols)
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  less_eq  ("op \<le>") and
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  less_eq  ("(_/ \<le> _)"  [51, 51] 50)
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notation (HTML output)
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  less_eq  ("op \<le>") and
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  less_eq  ("(_/ \<le> _)"  [51, 51] 50)
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abbreviation (input)
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  greater_eq  (infix ">=" 50) where
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  "x >= y \<equiv> y <= x"
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notation (input)
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  greater_eq  (infix "\<ge>" 50)
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abbreviation (input)
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  greater  (infix ">" 50) where
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  "x > y \<equiv> y < x"
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end
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syntax
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  "_index1"  :: index    ("\<^sub>1")
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translations
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  (index) "\<^sub>1" => (index) "\<^bsub>\<struct>\<^esub>"
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typed_print_translation {*
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let
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  fun tr' c = (c, fn show_sorts => fn T => fn ts =>
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    if T = dummyT orelse not (! show_types) andalso can Term.dest_Type T then raise Match
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    else Syntax.const Syntax.constrainC $ Syntax.const c $ Syntax.term_of_typ show_sorts T);
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in map tr' [@{const_syntax HOL.one}, @{const_syntax HOL.zero}] end;
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*} -- {* show types that are presumably too general *}
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subsection {* Fundamental rules *}
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subsubsection {* Equality *}
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text {* Thanks to Stephan Merz *}
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lemma subst:
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  assumes eq: "s = t" and p: "P s"
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  shows "P t"
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proof -
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  from eq have meta: "s \<equiv> t"
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    by (rule eq_reflection)
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  from p show ?thesis
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    by (unfold meta)
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qed
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lemma sym: "s = t ==> t = s"
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  by (erule subst) (rule refl)
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lemma ssubst: "t = s ==> P s ==> P t"
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  by (drule sym) (erule subst)
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lemma trans: "[| r=s; s=t |] ==> r=t"
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  by (erule subst)
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lemma meta_eq_to_obj_eq: 
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  assumes meq: "A == B"
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  shows "A = B"
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  by (unfold meq) (rule refl)
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text {* Useful with @{text erule} for proving equalities from known equalities. *}
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     (* a = b
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        |   |
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        c = d   *)
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lemma box_equals: "[| a=b;  a=c;  b=d |] ==> c=d"
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apply (rule trans)
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apply (rule trans)
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apply (rule sym)
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apply assumption+
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done
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text {* For calculational reasoning: *}
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lemma forw_subst: "a = b ==> P b ==> P a"
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  by (rule ssubst)
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lemma back_subst: "P a ==> a = b ==> P b"
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  by (rule subst)
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subsubsection {*Congruence rules for application*}
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(*similar to AP_THM in Gordon's HOL*)
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lemma fun_cong: "(f::'a=>'b) = g ==> f(x)=g(x)"
paulson@15411
   354
apply (erule subst)
paulson@15411
   355
apply (rule refl)
paulson@15411
   356
done
paulson@15411
   357
paulson@15411
   358
(*similar to AP_TERM in Gordon's HOL and FOL's subst_context*)
paulson@15411
   359
lemma arg_cong: "x=y ==> f(x)=f(y)"
paulson@15411
   360
apply (erule subst)
paulson@15411
   361
apply (rule refl)
paulson@15411
   362
done
paulson@15411
   363
paulson@15655
   364
lemma arg_cong2: "\<lbrakk> a = b; c = d \<rbrakk> \<Longrightarrow> f a c = f b d"
paulson@15655
   365
apply (erule ssubst)+
paulson@15655
   366
apply (rule refl)
paulson@15655
   367
done
paulson@15655
   368
paulson@15411
   369
lemma cong: "[| f = g; (x::'a) = y |] ==> f(x) = g(y)"
paulson@15411
   370
apply (erule subst)+
paulson@15411
   371
apply (rule refl)
paulson@15411
   372
done
paulson@15411
   373
paulson@15411
   374
haftmann@20944
   375
subsubsection {*Equality of booleans -- iff*}
paulson@15411
   376
wenzelm@21504
   377
lemma iffI: assumes "P ==> Q" and "Q ==> P" shows "P=Q"
wenzelm@21504
   378
  by (iprover intro: iff [THEN mp, THEN mp] impI assms)
paulson@15411
   379
paulson@15411
   380
lemma iffD2: "[| P=Q; Q |] ==> P"
wenzelm@18457
   381
  by (erule ssubst)
paulson@15411
   382
paulson@15411
   383
lemma rev_iffD2: "[| Q; P=Q |] ==> P"
wenzelm@18457
   384
  by (erule iffD2)
paulson@15411
   385
wenzelm@21504
   386
lemma iffD1: "Q = P \<Longrightarrow> Q \<Longrightarrow> P"
wenzelm@21504
   387
  by (drule sym) (rule iffD2)
wenzelm@21504
   388
wenzelm@21504
   389
lemma rev_iffD1: "Q \<Longrightarrow> Q = P \<Longrightarrow> P"
wenzelm@21504
   390
  by (drule sym) (rule rev_iffD2)
paulson@15411
   391
paulson@15411
   392
lemma iffE:
paulson@15411
   393
  assumes major: "P=Q"
wenzelm@21504
   394
    and minor: "[| P --> Q; Q --> P |] ==> R"
wenzelm@18457
   395
  shows R
wenzelm@18457
   396
  by (iprover intro: minor impI major [THEN iffD2] major [THEN iffD1])
paulson@15411
   397
paulson@15411
   398
haftmann@20944
   399
subsubsection {*True*}
paulson@15411
   400
paulson@15411
   401
lemma TrueI: "True"
wenzelm@21504
   402
  unfolding True_def by (rule refl)
paulson@15411
   403
wenzelm@21504
   404
lemma eqTrueI: "P ==> P = True"
wenzelm@18457
   405
  by (iprover intro: iffI TrueI)
paulson@15411
   406
wenzelm@21504
   407
lemma eqTrueE: "P = True ==> P"
wenzelm@21504
   408
  by (erule iffD2) (rule TrueI)
paulson@15411
   409
paulson@15411
   410
haftmann@20944
   411
subsubsection {*Universal quantifier*}
paulson@15411
   412
wenzelm@21504
   413
lemma allI: assumes "!!x::'a. P(x)" shows "ALL x. P(x)"
wenzelm@21504
   414
  unfolding All_def by (iprover intro: ext eqTrueI assms)
paulson@15411
   415
paulson@15411
   416
lemma spec: "ALL x::'a. P(x) ==> P(x)"
paulson@15411
   417
apply (unfold All_def)
paulson@15411
   418
apply (rule eqTrueE)
paulson@15411
   419
apply (erule fun_cong)
paulson@15411
   420
done
paulson@15411
   421
paulson@15411
   422
lemma allE:
paulson@15411
   423
  assumes major: "ALL x. P(x)"
wenzelm@21504
   424
    and minor: "P(x) ==> R"
wenzelm@21504
   425
  shows R
wenzelm@21504
   426
  by (iprover intro: minor major [THEN spec])
paulson@15411
   427
paulson@15411
   428
lemma all_dupE:
paulson@15411
   429
  assumes major: "ALL x. P(x)"
wenzelm@21504
   430
    and minor: "[| P(x); ALL x. P(x) |] ==> R"
wenzelm@21504
   431
  shows R
wenzelm@21504
   432
  by (iprover intro: minor major major [THEN spec])
paulson@15411
   433
paulson@15411
   434
wenzelm@21504
   435
subsubsection {* False *}
wenzelm@21504
   436
wenzelm@21504
   437
text {*
wenzelm@21504
   438
  Depends upon @{text spec}; it is impossible to do propositional
wenzelm@21504
   439
  logic before quantifiers!
wenzelm@21504
   440
*}
paulson@15411
   441
paulson@15411
   442
lemma FalseE: "False ==> P"
wenzelm@21504
   443
  apply (unfold False_def)
wenzelm@21504
   444
  apply (erule spec)
wenzelm@21504
   445
  done
paulson@15411
   446
wenzelm@21504
   447
lemma False_neq_True: "False = True ==> P"
wenzelm@21504
   448
  by (erule eqTrueE [THEN FalseE])
paulson@15411
   449
paulson@15411
   450
wenzelm@21504
   451
subsubsection {* Negation *}
paulson@15411
   452
paulson@15411
   453
lemma notI:
wenzelm@21504
   454
  assumes "P ==> False"
paulson@15411
   455
  shows "~P"
wenzelm@21504
   456
  apply (unfold not_def)
wenzelm@21504
   457
  apply (iprover intro: impI assms)
wenzelm@21504
   458
  done
paulson@15411
   459
paulson@15411
   460
lemma False_not_True: "False ~= True"
wenzelm@21504
   461
  apply (rule notI)
wenzelm@21504
   462
  apply (erule False_neq_True)
wenzelm@21504
   463
  done
paulson@15411
   464
paulson@15411
   465
lemma True_not_False: "True ~= False"
wenzelm@21504
   466
  apply (rule notI)
wenzelm@21504
   467
  apply (drule sym)
wenzelm@21504
   468
  apply (erule False_neq_True)
wenzelm@21504
   469
  done
paulson@15411
   470
paulson@15411
   471
lemma notE: "[| ~P;  P |] ==> R"
wenzelm@21504
   472
  apply (unfold not_def)
wenzelm@21504
   473
  apply (erule mp [THEN FalseE])
wenzelm@21504
   474
  apply assumption
wenzelm@21504
   475
  done
paulson@15411
   476
wenzelm@21504
   477
lemma notI2: "(P \<Longrightarrow> \<not> Pa) \<Longrightarrow> (P \<Longrightarrow> Pa) \<Longrightarrow> \<not> P"
wenzelm@21504
   478
  by (erule notE [THEN notI]) (erule meta_mp)
paulson@15411
   479
paulson@15411
   480
haftmann@20944
   481
subsubsection {*Implication*}
paulson@15411
   482
paulson@15411
   483
lemma impE:
paulson@15411
   484
  assumes "P-->Q" "P" "Q ==> R"
paulson@15411
   485
  shows "R"
wenzelm@23553
   486
by (iprover intro: assms mp)
paulson@15411
   487
paulson@15411
   488
(* Reduces Q to P-->Q, allowing substitution in P. *)
paulson@15411
   489
lemma rev_mp: "[| P;  P --> Q |] ==> Q"
nipkow@17589
   490
by (iprover intro: mp)
paulson@15411
   491
paulson@15411
   492
lemma contrapos_nn:
paulson@15411
   493
  assumes major: "~Q"
paulson@15411
   494
      and minor: "P==>Q"
paulson@15411
   495
  shows "~P"
nipkow@17589
   496
by (iprover intro: notI minor major [THEN notE])
paulson@15411
   497
paulson@15411
   498
(*not used at all, but we already have the other 3 combinations *)
paulson@15411
   499
lemma contrapos_pn:
paulson@15411
   500
  assumes major: "Q"
paulson@15411
   501
      and minor: "P ==> ~Q"
paulson@15411
   502
  shows "~P"
nipkow@17589
   503
by (iprover intro: notI minor major notE)
paulson@15411
   504
paulson@15411
   505
lemma not_sym: "t ~= s ==> s ~= t"
haftmann@21250
   506
  by (erule contrapos_nn) (erule sym)
haftmann@21250
   507
haftmann@21250
   508
lemma eq_neq_eq_imp_neq: "[| x = a ; a ~= b; b = y |] ==> x ~= y"
haftmann@21250
   509
  by (erule subst, erule ssubst, assumption)
paulson@15411
   510
paulson@15411
   511
(*still used in HOLCF*)
paulson@15411
   512
lemma rev_contrapos:
paulson@15411
   513
  assumes pq: "P ==> Q"
paulson@15411
   514
      and nq: "~Q"
paulson@15411
   515
  shows "~P"
paulson@15411
   516
apply (rule nq [THEN contrapos_nn])
paulson@15411
   517
apply (erule pq)
paulson@15411
   518
done
paulson@15411
   519
haftmann@20944
   520
subsubsection {*Existential quantifier*}
paulson@15411
   521
paulson@15411
   522
lemma exI: "P x ==> EX x::'a. P x"
paulson@15411
   523
apply (unfold Ex_def)
nipkow@17589
   524
apply (iprover intro: allI allE impI mp)
paulson@15411
   525
done
paulson@15411
   526
paulson@15411
   527
lemma exE:
paulson@15411
   528
  assumes major: "EX x::'a. P(x)"
paulson@15411
   529
      and minor: "!!x. P(x) ==> Q"
paulson@15411
   530
  shows "Q"
paulson@15411
   531
apply (rule major [unfolded Ex_def, THEN spec, THEN mp])
nipkow@17589
   532
apply (iprover intro: impI [THEN allI] minor)
paulson@15411
   533
done
paulson@15411
   534
paulson@15411
   535
haftmann@20944
   536
subsubsection {*Conjunction*}
paulson@15411
   537
paulson@15411
   538
lemma conjI: "[| P; Q |] ==> P&Q"
paulson@15411
   539
apply (unfold and_def)
nipkow@17589
   540
apply (iprover intro: impI [THEN allI] mp)
paulson@15411
   541
done
paulson@15411
   542
paulson@15411
   543
lemma conjunct1: "[| P & Q |] ==> P"
paulson@15411
   544
apply (unfold and_def)
nipkow@17589
   545
apply (iprover intro: impI dest: spec mp)
paulson@15411
   546
done
paulson@15411
   547
paulson@15411
   548
lemma conjunct2: "[| P & Q |] ==> Q"
paulson@15411
   549
apply (unfold and_def)
nipkow@17589
   550
apply (iprover intro: impI dest: spec mp)
paulson@15411
   551
done
paulson@15411
   552
paulson@15411
   553
lemma conjE:
paulson@15411
   554
  assumes major: "P&Q"
paulson@15411
   555
      and minor: "[| P; Q |] ==> R"
paulson@15411
   556
  shows "R"
paulson@15411
   557
apply (rule minor)
paulson@15411
   558
apply (rule major [THEN conjunct1])
paulson@15411
   559
apply (rule major [THEN conjunct2])
paulson@15411
   560
done
paulson@15411
   561
paulson@15411
   562
lemma context_conjI:
wenzelm@23553
   563
  assumes "P" "P ==> Q" shows "P & Q"
wenzelm@23553
   564
by (iprover intro: conjI assms)
paulson@15411
   565
paulson@15411
   566
haftmann@20944
   567
subsubsection {*Disjunction*}
paulson@15411
   568
paulson@15411
   569
lemma disjI1: "P ==> P|Q"
paulson@15411
   570
apply (unfold or_def)
nipkow@17589
   571
apply (iprover intro: allI impI mp)
paulson@15411
   572
done
paulson@15411
   573
paulson@15411
   574
lemma disjI2: "Q ==> P|Q"
paulson@15411
   575
apply (unfold or_def)
nipkow@17589
   576
apply (iprover intro: allI impI mp)
paulson@15411
   577
done
paulson@15411
   578
paulson@15411
   579
lemma disjE:
paulson@15411
   580
  assumes major: "P|Q"
paulson@15411
   581
      and minorP: "P ==> R"
paulson@15411
   582
      and minorQ: "Q ==> R"
paulson@15411
   583
  shows "R"
nipkow@17589
   584
by (iprover intro: minorP minorQ impI
paulson@15411
   585
                 major [unfolded or_def, THEN spec, THEN mp, THEN mp])
paulson@15411
   586
paulson@15411
   587
haftmann@20944
   588
subsubsection {*Classical logic*}
paulson@15411
   589
paulson@15411
   590
lemma classical:
paulson@15411
   591
  assumes prem: "~P ==> P"
paulson@15411
   592
  shows "P"
paulson@15411
   593
apply (rule True_or_False [THEN disjE, THEN eqTrueE])
paulson@15411
   594
apply assumption
paulson@15411
   595
apply (rule notI [THEN prem, THEN eqTrueI])
paulson@15411
   596
apply (erule subst)
paulson@15411
   597
apply assumption
paulson@15411
   598
done
paulson@15411
   599
paulson@15411
   600
lemmas ccontr = FalseE [THEN classical, standard]
paulson@15411
   601
paulson@15411
   602
(*notE with premises exchanged; it discharges ~R so that it can be used to
paulson@15411
   603
  make elimination rules*)
paulson@15411
   604
lemma rev_notE:
paulson@15411
   605
  assumes premp: "P"
paulson@15411
   606
      and premnot: "~R ==> ~P"
paulson@15411
   607
  shows "R"
paulson@15411
   608
apply (rule ccontr)
paulson@15411
   609
apply (erule notE [OF premnot premp])
paulson@15411
   610
done
paulson@15411
   611
paulson@15411
   612
(*Double negation law*)
paulson@15411
   613
lemma notnotD: "~~P ==> P"
paulson@15411
   614
apply (rule classical)
paulson@15411
   615
apply (erule notE)
paulson@15411
   616
apply assumption
paulson@15411
   617
done
paulson@15411
   618
paulson@15411
   619
lemma contrapos_pp:
paulson@15411
   620
  assumes p1: "Q"
paulson@15411
   621
      and p2: "~P ==> ~Q"
paulson@15411
   622
  shows "P"
nipkow@17589
   623
by (iprover intro: classical p1 p2 notE)
paulson@15411
   624
paulson@15411
   625
haftmann@20944
   626
subsubsection {*Unique existence*}
paulson@15411
   627
paulson@15411
   628
lemma ex1I:
wenzelm@23553
   629
  assumes "P a" "!!x. P(x) ==> x=a"
paulson@15411
   630
  shows "EX! x. P(x)"
wenzelm@23553
   631
by (unfold Ex1_def, iprover intro: assms exI conjI allI impI)
paulson@15411
   632
paulson@15411
   633
text{*Sometimes easier to use: the premises have no shared variables.  Safe!*}
paulson@15411
   634
lemma ex_ex1I:
paulson@15411
   635
  assumes ex_prem: "EX x. P(x)"
paulson@15411
   636
      and eq: "!!x y. [| P(x); P(y) |] ==> x=y"
paulson@15411
   637
  shows "EX! x. P(x)"
nipkow@17589
   638
by (iprover intro: ex_prem [THEN exE] ex1I eq)
paulson@15411
   639
paulson@15411
   640
lemma ex1E:
paulson@15411
   641
  assumes major: "EX! x. P(x)"
paulson@15411
   642
      and minor: "!!x. [| P(x);  ALL y. P(y) --> y=x |] ==> R"
paulson@15411
   643
  shows "R"
paulson@15411
   644
apply (rule major [unfolded Ex1_def, THEN exE])
paulson@15411
   645
apply (erule conjE)
nipkow@17589
   646
apply (iprover intro: minor)
paulson@15411
   647
done
paulson@15411
   648
paulson@15411
   649
lemma ex1_implies_ex: "EX! x. P x ==> EX x. P x"
paulson@15411
   650
apply (erule ex1E)
paulson@15411
   651
apply (rule exI)
paulson@15411
   652
apply assumption
paulson@15411
   653
done
paulson@15411
   654
paulson@15411
   655
haftmann@20944
   656
subsubsection {*THE: definite description operator*}
paulson@15411
   657
paulson@15411
   658
lemma the_equality:
paulson@15411
   659
  assumes prema: "P a"
paulson@15411
   660
      and premx: "!!x. P x ==> x=a"
paulson@15411
   661
  shows "(THE x. P x) = a"
paulson@15411
   662
apply (rule trans [OF _ the_eq_trivial])
paulson@15411
   663
apply (rule_tac f = "The" in arg_cong)
paulson@15411
   664
apply (rule ext)
paulson@15411
   665
apply (rule iffI)
paulson@15411
   666
 apply (erule premx)
paulson@15411
   667
apply (erule ssubst, rule prema)
paulson@15411
   668
done
paulson@15411
   669
paulson@15411
   670
lemma theI:
paulson@15411
   671
  assumes "P a" and "!!x. P x ==> x=a"
paulson@15411
   672
  shows "P (THE x. P x)"
wenzelm@23553
   673
by (iprover intro: assms the_equality [THEN ssubst])
paulson@15411
   674
paulson@15411
   675
lemma theI': "EX! x. P x ==> P (THE x. P x)"
paulson@15411
   676
apply (erule ex1E)
paulson@15411
   677
apply (erule theI)
paulson@15411
   678
apply (erule allE)
paulson@15411
   679
apply (erule mp)
paulson@15411
   680
apply assumption
paulson@15411
   681
done
paulson@15411
   682
paulson@15411
   683
(*Easier to apply than theI: only one occurrence of P*)
paulson@15411
   684
lemma theI2:
paulson@15411
   685
  assumes "P a" "!!x. P x ==> x=a" "!!x. P x ==> Q x"
paulson@15411
   686
  shows "Q (THE x. P x)"
wenzelm@23553
   687
by (iprover intro: assms theI)
paulson@15411
   688
nipkow@24553
   689
lemma the1I2: assumes "EX! x. P x" "\<And>x. P x \<Longrightarrow> Q x" shows "Q (THE x. P x)"
nipkow@24553
   690
by(iprover intro:assms(2) theI2[where P=P and Q=Q] ex1E[OF assms(1)]
nipkow@24553
   691
           elim:allE impE)
nipkow@24553
   692
wenzelm@18697
   693
lemma the1_equality [elim?]: "[| EX!x. P x; P a |] ==> (THE x. P x) = a"
paulson@15411
   694
apply (rule the_equality)
paulson@15411
   695
apply  assumption
paulson@15411
   696
apply (erule ex1E)
paulson@15411
   697
apply (erule all_dupE)
paulson@15411
   698
apply (drule mp)
paulson@15411
   699
apply  assumption
paulson@15411
   700
apply (erule ssubst)
paulson@15411
   701
apply (erule allE)
paulson@15411
   702
apply (erule mp)
paulson@15411
   703
apply assumption
paulson@15411
   704
done
paulson@15411
   705
paulson@15411
   706
lemma the_sym_eq_trivial: "(THE y. x=y) = x"
paulson@15411
   707
apply (rule the_equality)
paulson@15411
   708
apply (rule refl)
paulson@15411
   709
apply (erule sym)
paulson@15411
   710
done
paulson@15411
   711
paulson@15411
   712
haftmann@20944
   713
subsubsection {*Classical intro rules for disjunction and existential quantifiers*}
paulson@15411
   714
paulson@15411
   715
lemma disjCI:
paulson@15411
   716
  assumes "~Q ==> P" shows "P|Q"
paulson@15411
   717
apply (rule classical)
wenzelm@23553
   718
apply (iprover intro: assms disjI1 disjI2 notI elim: notE)
paulson@15411
   719
done
paulson@15411
   720
paulson@15411
   721
lemma excluded_middle: "~P | P"
nipkow@17589
   722
by (iprover intro: disjCI)
paulson@15411
   723
haftmann@20944
   724
text {*
haftmann@20944
   725
  case distinction as a natural deduction rule.
haftmann@20944
   726
  Note that @{term "~P"} is the second case, not the first
haftmann@20944
   727
*}
wenzelm@27126
   728
lemma case_split [case_names True False]:
paulson@15411
   729
  assumes prem1: "P ==> Q"
paulson@15411
   730
      and prem2: "~P ==> Q"
paulson@15411
   731
  shows "Q"
paulson@15411
   732
apply (rule excluded_middle [THEN disjE])
paulson@15411
   733
apply (erule prem2)
paulson@15411
   734
apply (erule prem1)
paulson@15411
   735
done
wenzelm@27126
   736
paulson@15411
   737
(*Classical implies (-->) elimination. *)
paulson@15411
   738
lemma impCE:
paulson@15411
   739
  assumes major: "P-->Q"
paulson@15411
   740
      and minor: "~P ==> R" "Q ==> R"
paulson@15411
   741
  shows "R"
paulson@15411
   742
apply (rule excluded_middle [of P, THEN disjE])
nipkow@17589
   743
apply (iprover intro: minor major [THEN mp])+
paulson@15411
   744
done
paulson@15411
   745
paulson@15411
   746
(*This version of --> elimination works on Q before P.  It works best for
paulson@15411
   747
  those cases in which P holds "almost everywhere".  Can't install as
paulson@15411
   748
  default: would break old proofs.*)
paulson@15411
   749
lemma impCE':
paulson@15411
   750
  assumes major: "P-->Q"
paulson@15411
   751
      and minor: "Q ==> R" "~P ==> R"
paulson@15411
   752
  shows "R"
paulson@15411
   753
apply (rule excluded_middle [of P, THEN disjE])
nipkow@17589
   754
apply (iprover intro: minor major [THEN mp])+
paulson@15411
   755
done
paulson@15411
   756
paulson@15411
   757
(*Classical <-> elimination. *)
paulson@15411
   758
lemma iffCE:
paulson@15411
   759
  assumes major: "P=Q"
paulson@15411
   760
      and minor: "[| P; Q |] ==> R"  "[| ~P; ~Q |] ==> R"
paulson@15411
   761
  shows "R"
paulson@15411
   762
apply (rule major [THEN iffE])
nipkow@17589
   763
apply (iprover intro: minor elim: impCE notE)
paulson@15411
   764
done
paulson@15411
   765
paulson@15411
   766
lemma exCI:
paulson@15411
   767
  assumes "ALL x. ~P(x) ==> P(a)"
paulson@15411
   768
  shows "EX x. P(x)"
paulson@15411
   769
apply (rule ccontr)
wenzelm@23553
   770
apply (iprover intro: assms exI allI notI notE [of "\<exists>x. P x"])
paulson@15411
   771
done
paulson@15411
   772
paulson@15411
   773
wenzelm@12386
   774
subsubsection {* Intuitionistic Reasoning *}
wenzelm@12386
   775
wenzelm@12386
   776
lemma impE':
wenzelm@12937
   777
  assumes 1: "P --> Q"
wenzelm@12937
   778
    and 2: "Q ==> R"
wenzelm@12937
   779
    and 3: "P --> Q ==> P"
wenzelm@12937
   780
  shows R
wenzelm@12386
   781
proof -
wenzelm@12386
   782
  from 3 and 1 have P .
wenzelm@12386
   783
  with 1 have Q by (rule impE)
wenzelm@12386
   784
  with 2 show R .
wenzelm@12386
   785
qed
wenzelm@12386
   786
wenzelm@12386
   787
lemma allE':
wenzelm@12937
   788
  assumes 1: "ALL x. P x"
wenzelm@12937
   789
    and 2: "P x ==> ALL x. P x ==> Q"
wenzelm@12937
   790
  shows Q
wenzelm@12386
   791
proof -
wenzelm@12386
   792
  from 1 have "P x" by (rule spec)
wenzelm@12386
   793
  from this and 1 show Q by (rule 2)
wenzelm@12386
   794
qed
wenzelm@12386
   795
wenzelm@12937
   796
lemma notE':
wenzelm@12937
   797
  assumes 1: "~ P"
wenzelm@12937
   798
    and 2: "~ P ==> P"
wenzelm@12937
   799
  shows R
wenzelm@12386
   800
proof -
wenzelm@12386
   801
  from 2 and 1 have P .
wenzelm@12386
   802
  with 1 show R by (rule notE)
wenzelm@12386
   803
qed
wenzelm@12386
   804
dixon@22444
   805
lemma TrueE: "True ==> P ==> P" .
dixon@22444
   806
lemma notFalseE: "~ False ==> P ==> P" .
dixon@22444
   807
dixon@22467
   808
lemmas [Pure.elim!] = disjE iffE FalseE conjE exE TrueE notFalseE
wenzelm@15801
   809
  and [Pure.intro!] = iffI conjI impI TrueI notI allI refl
wenzelm@15801
   810
  and [Pure.elim 2] = allE notE' impE'
wenzelm@15801
   811
  and [Pure.intro] = exI disjI2 disjI1
wenzelm@12386
   812
wenzelm@12386
   813
lemmas [trans] = trans
wenzelm@12386
   814
  and [sym] = sym not_sym
wenzelm@15801
   815
  and [Pure.elim?] = iffD1 iffD2 impE
wenzelm@11750
   816
wenzelm@23553
   817
use "hologic.ML"
wenzelm@23553
   818
wenzelm@11438
   819
wenzelm@11750
   820
subsubsection {* Atomizing meta-level connectives *}
wenzelm@11750
   821
wenzelm@11750
   822
lemma atomize_all [atomize]: "(!!x. P x) == Trueprop (ALL x. P x)"
wenzelm@12003
   823
proof
wenzelm@9488
   824
  assume "!!x. P x"
wenzelm@23389
   825
  then show "ALL x. P x" ..
wenzelm@9488
   826
next
wenzelm@9488
   827
  assume "ALL x. P x"
wenzelm@23553
   828
  then show "!!x. P x" by (rule allE)
wenzelm@9488
   829
qed
wenzelm@9488
   830
wenzelm@11750
   831
lemma atomize_imp [atomize]: "(A ==> B) == Trueprop (A --> B)"
wenzelm@12003
   832
proof
wenzelm@9488
   833
  assume r: "A ==> B"
wenzelm@10383
   834
  show "A --> B" by (rule impI) (rule r)
wenzelm@9488
   835
next
wenzelm@9488
   836
  assume "A --> B" and A
wenzelm@23553
   837
  then show B by (rule mp)
wenzelm@9488
   838
qed
wenzelm@9488
   839
paulson@14749
   840
lemma atomize_not: "(A ==> False) == Trueprop (~A)"
paulson@14749
   841
proof
paulson@14749
   842
  assume r: "A ==> False"
paulson@14749
   843
  show "~A" by (rule notI) (rule r)
paulson@14749
   844
next
paulson@14749
   845
  assume "~A" and A
wenzelm@23553
   846
  then show False by (rule notE)
paulson@14749
   847
qed
paulson@14749
   848
wenzelm@11750
   849
lemma atomize_eq [atomize]: "(x == y) == Trueprop (x = y)"
wenzelm@12003
   850
proof
wenzelm@10432
   851
  assume "x == y"
wenzelm@23553
   852
  show "x = y" by (unfold `x == y`) (rule refl)
wenzelm@10432
   853
next
wenzelm@10432
   854
  assume "x = y"
wenzelm@23553
   855
  then show "x == y" by (rule eq_reflection)
wenzelm@10432
   856
qed
wenzelm@10432
   857
wenzelm@12023
   858
lemma atomize_conj [atomize]:
wenzelm@19121
   859
  includes meta_conjunction_syntax
wenzelm@19121
   860
  shows "(A && B) == Trueprop (A & B)"
wenzelm@12003
   861
proof
wenzelm@19121
   862
  assume conj: "A && B"
wenzelm@19121
   863
  show "A & B"
wenzelm@19121
   864
  proof (rule conjI)
wenzelm@19121
   865
    from conj show A by (rule conjunctionD1)
wenzelm@19121
   866
    from conj show B by (rule conjunctionD2)
wenzelm@19121
   867
  qed
wenzelm@11953
   868
next
wenzelm@19121
   869
  assume conj: "A & B"
wenzelm@19121
   870
  show "A && B"
wenzelm@19121
   871
  proof -
wenzelm@19121
   872
    from conj show A ..
wenzelm@19121
   873
    from conj show B ..
wenzelm@11953
   874
  qed
wenzelm@11953
   875
qed
wenzelm@11953
   876
wenzelm@12386
   877
lemmas [symmetric, rulify] = atomize_all atomize_imp
wenzelm@18832
   878
  and [symmetric, defn] = atomize_all atomize_imp atomize_eq
wenzelm@12386
   879
wenzelm@11750
   880
krauss@26580
   881
subsubsection {* Atomizing elimination rules *}
krauss@26580
   882
krauss@26580
   883
setup AtomizeElim.setup
krauss@26580
   884
krauss@26580
   885
lemma atomize_exL[atomize_elim]: "(!!x. P x ==> Q) == ((EX x. P x) ==> Q)"
krauss@26580
   886
  by rule iprover+
krauss@26580
   887
krauss@26580
   888
lemma atomize_conjL[atomize_elim]: "(A ==> B ==> C) == (A & B ==> C)"
krauss@26580
   889
  by rule iprover+
krauss@26580
   890
krauss@26580
   891
lemma atomize_disjL[atomize_elim]: "((A ==> C) ==> (B ==> C) ==> C) == ((A | B ==> C) ==> C)"
krauss@26580
   892
  by rule iprover+
krauss@26580
   893
krauss@26580
   894
lemma atomize_elimL[atomize_elim]: "(!!B. (A ==> B) ==> B) == Trueprop A" ..
krauss@26580
   895
krauss@26580
   896
haftmann@20944
   897
subsection {* Package setup *}
haftmann@20944
   898
wenzelm@11750
   899
subsubsection {* Classical Reasoner setup *}
wenzelm@9529
   900
wenzelm@26411
   901
lemma imp_elim: "P --> Q ==> (~ R ==> P) ==> (Q ==> R) ==> R"
wenzelm@26411
   902
  by (rule classical) iprover
wenzelm@26411
   903
wenzelm@26411
   904
lemma swap: "~ P ==> (~ R ==> P) ==> R"
wenzelm@26411
   905
  by (rule classical) iprover
wenzelm@26411
   906
haftmann@20944
   907
lemma thin_refl:
haftmann@20944
   908
  "\<And>X. \<lbrakk> x=x; PROP W \<rbrakk> \<Longrightarrow> PROP W" .
haftmann@20944
   909
haftmann@21151
   910
ML {*
haftmann@21151
   911
structure Hypsubst = HypsubstFun(
haftmann@21151
   912
struct
haftmann@21151
   913
  structure Simplifier = Simplifier
wenzelm@21218
   914
  val dest_eq = HOLogic.dest_eq
haftmann@21151
   915
  val dest_Trueprop = HOLogic.dest_Trueprop
haftmann@21151
   916
  val dest_imp = HOLogic.dest_imp
wenzelm@26411
   917
  val eq_reflection = @{thm eq_reflection}
wenzelm@26411
   918
  val rev_eq_reflection = @{thm meta_eq_to_obj_eq}
wenzelm@26411
   919
  val imp_intr = @{thm impI}
wenzelm@26411
   920
  val rev_mp = @{thm rev_mp}
wenzelm@26411
   921
  val subst = @{thm subst}
wenzelm@26411
   922
  val sym = @{thm sym}
wenzelm@22129
   923
  val thin_refl = @{thm thin_refl};
krauss@27572
   924
  val prop_subst = @{lemma "PROP P t ==> PROP prop (x = t ==> PROP P x)"
krauss@27572
   925
                     by (unfold prop_def) (drule eq_reflection, unfold)}
haftmann@21151
   926
end);
wenzelm@21671
   927
open Hypsubst;
haftmann@21151
   928
haftmann@21151
   929
structure Classical = ClassicalFun(
haftmann@21151
   930
struct
wenzelm@26411
   931
  val imp_elim = @{thm imp_elim}
wenzelm@26411
   932
  val not_elim = @{thm notE}
wenzelm@26411
   933
  val swap = @{thm swap}
wenzelm@26411
   934
  val classical = @{thm classical}
haftmann@21151
   935
  val sizef = Drule.size_of_thm
haftmann@21151
   936
  val hyp_subst_tacs = [Hypsubst.hyp_subst_tac]
haftmann@21151
   937
end);
haftmann@21151
   938
haftmann@21151
   939
structure BasicClassical: BASIC_CLASSICAL = Classical; 
wenzelm@21671
   940
open BasicClassical;
wenzelm@22129
   941
wenzelm@27338
   942
ML_Antiquote.value "claset"
wenzelm@27338
   943
  (Scan.succeed "Classical.local_claset_of (ML_Context.the_local_context ())");
wenzelm@24035
   944
wenzelm@24035
   945
structure ResAtpset = NamedThmsFun(val name = "atp" val description = "ATP rules");
paulson@24286
   946
paulson@24286
   947
structure ResBlacklist = NamedThmsFun(val name = "noatp" val description = "Theorems blacklisted for ATP");
haftmann@21151
   948
*}
haftmann@21151
   949
wenzelm@25388
   950
text {*ResBlacklist holds theorems blacklisted to sledgehammer. 
paulson@24286
   951
  These theorems typically produce clauses that are prolific (match too many equality or
wenzelm@25388
   952
  membership literals) and relate to seldom-used facts. Some duplicate other rules.*}
paulson@24286
   953
haftmann@21009
   954
setup {*
haftmann@21009
   955
let
haftmann@21009
   956
  (*prevent substitution on bool*)
haftmann@21009
   957
  fun hyp_subst_tac' i thm = if i <= Thm.nprems_of thm andalso
haftmann@21009
   958
    Term.exists_Const (fn ("op =", Type (_, [T, _])) => T <> Type ("bool", []) | _ => false)
haftmann@21009
   959
      (nth (Thm.prems_of thm) (i - 1)) then Hypsubst.hyp_subst_tac i thm else no_tac thm;
haftmann@21009
   960
in
haftmann@21151
   961
  Hypsubst.hypsubst_setup
haftmann@21151
   962
  #> ContextRules.addSWrapper (fn tac => hyp_subst_tac' ORELSE' tac)
haftmann@21151
   963
  #> Classical.setup
haftmann@21151
   964
  #> ResAtpset.setup
paulson@24286
   965
  #> ResBlacklist.setup
haftmann@21009
   966
end
haftmann@21009
   967
*}
haftmann@21009
   968
haftmann@21009
   969
declare iffI [intro!]
haftmann@21009
   970
  and notI [intro!]
haftmann@21009
   971
  and impI [intro!]
haftmann@21009
   972
  and disjCI [intro!]
haftmann@21009
   973
  and conjI [intro!]
haftmann@21009
   974
  and TrueI [intro!]
haftmann@21009
   975
  and refl [intro!]
haftmann@21009
   976
haftmann@21009
   977
declare iffCE [elim!]
haftmann@21009
   978
  and FalseE [elim!]
haftmann@21009
   979
  and impCE [elim!]
haftmann@21009
   980
  and disjE [elim!]
haftmann@21009
   981
  and conjE [elim!]
haftmann@21009
   982
  and conjE [elim!]
haftmann@21009
   983
haftmann@21009
   984
declare ex_ex1I [intro!]
haftmann@21009
   985
  and allI [intro!]
haftmann@21009
   986
  and the_equality [intro]
haftmann@21009
   987
  and exI [intro]
haftmann@21009
   988
haftmann@21009
   989
declare exE [elim!]
haftmann@21009
   990
  allE [elim]
haftmann@21009
   991
wenzelm@22377
   992
ML {* val HOL_cs = @{claset} *}
mengj@19162
   993
wenzelm@20223
   994
lemma contrapos_np: "~ Q ==> (~ P ==> Q) ==> P"
wenzelm@20223
   995
  apply (erule swap)
wenzelm@20223
   996
  apply (erule (1) meta_mp)
wenzelm@20223
   997
  done
wenzelm@10383
   998
wenzelm@18689
   999
declare ex_ex1I [rule del, intro! 2]
wenzelm@18689
  1000
  and ex1I [intro]
wenzelm@18689
  1001
wenzelm@12386
  1002
lemmas [intro?] = ext
wenzelm@12386
  1003
  and [elim?] = ex1_implies_ex
wenzelm@11977
  1004
haftmann@20944
  1005
(*Better then ex1E for classical reasoner: needs no quantifier duplication!*)
haftmann@20973
  1006
lemma alt_ex1E [elim!]:
haftmann@20944
  1007
  assumes major: "\<exists>!x. P x"
haftmann@20944
  1008
      and prem: "\<And>x. \<lbrakk> P x; \<forall>y y'. P y \<and> P y' \<longrightarrow> y = y' \<rbrakk> \<Longrightarrow> R"
haftmann@20944
  1009
  shows R
haftmann@20944
  1010
apply (rule ex1E [OF major])
haftmann@20944
  1011
apply (rule prem)
wenzelm@22129
  1012
apply (tactic {* ares_tac @{thms allI} 1 *})+
wenzelm@22129
  1013
apply (tactic {* etac (Classical.dup_elim @{thm allE}) 1 *})
wenzelm@22129
  1014
apply iprover
wenzelm@22129
  1015
done
haftmann@20944
  1016
haftmann@21151
  1017
ML {*
wenzelm@25388
  1018
structure Blast = BlastFun
wenzelm@25388
  1019
(
haftmann@21151
  1020
  type claset = Classical.claset
haftmann@22744
  1021
  val equality_name = @{const_name "op ="}
haftmann@22993
  1022
  val not_name = @{const_name Not}
wenzelm@26411
  1023
  val notE = @{thm notE}
wenzelm@26411
  1024
  val ccontr = @{thm ccontr}
haftmann@21151
  1025
  val contr_tac = Classical.contr_tac
haftmann@21151
  1026
  val dup_intr = Classical.dup_intr
haftmann@21151
  1027
  val hyp_subst_tac = Hypsubst.blast_hyp_subst_tac
wenzelm@21671
  1028
  val claset = Classical.claset
haftmann@21151
  1029
  val rep_cs = Classical.rep_cs
haftmann@21151
  1030
  val cla_modifiers = Classical.cla_modifiers
haftmann@21151
  1031
  val cla_meth' = Classical.cla_meth'
wenzelm@25388
  1032
);
wenzelm@21671
  1033
val Blast_tac = Blast.Blast_tac;
wenzelm@21671
  1034
val blast_tac = Blast.blast_tac;
haftmann@20944
  1035
*}
haftmann@20944
  1036
haftmann@21151
  1037
setup Blast.setup
haftmann@21151
  1038
haftmann@20944
  1039
haftmann@20944
  1040
subsubsection {* Simplifier *}
wenzelm@12281
  1041
wenzelm@12281
  1042
lemma eta_contract_eq: "(%s. f s) = f" ..
wenzelm@12281
  1043
wenzelm@12281
  1044
lemma simp_thms:
wenzelm@12937
  1045
  shows not_not: "(~ ~ P) = P"
nipkow@15354
  1046
  and Not_eq_iff: "((~P) = (~Q)) = (P = Q)"
wenzelm@12937
  1047
  and
berghofe@12436
  1048
    "(P ~= Q) = (P = (~Q))"
berghofe@12436
  1049
    "(P | ~P) = True"    "(~P | P) = True"
wenzelm@12281
  1050
    "(x = x) = True"
haftmann@20944
  1051
  and not_True_eq_False: "(\<not> True) = False"
haftmann@20944
  1052
  and not_False_eq_True: "(\<not> False) = True"
haftmann@20944
  1053
  and
berghofe@12436
  1054
    "(~P) ~= P"  "P ~= (~P)"
haftmann@20944
  1055
    "(True=P) = P"
haftmann@20944
  1056
  and eq_True: "(P = True) = P"
haftmann@20944
  1057
  and "(False=P) = (~P)"
haftmann@20944
  1058
  and eq_False: "(P = False) = (\<not> P)"
haftmann@20944
  1059
  and
wenzelm@12281
  1060
    "(True --> P) = P"  "(False --> P) = True"
wenzelm@12281
  1061
    "(P --> True) = True"  "(P --> P) = True"
wenzelm@12281
  1062
    "(P --> False) = (~P)"  "(P --> ~P) = (~P)"
wenzelm@12281
  1063
    "(P & True) = P"  "(True & P) = P"
wenzelm@12281
  1064
    "(P & False) = False"  "(False & P) = False"
wenzelm@12281
  1065
    "(P & P) = P"  "(P & (P & Q)) = (P & Q)"
wenzelm@12281
  1066
    "(P & ~P) = False"    "(~P & P) = False"
wenzelm@12281
  1067
    "(P | True) = True"  "(True | P) = True"
wenzelm@12281
  1068
    "(P | False) = P"  "(False | P) = P"
berghofe@12436
  1069
    "(P | P) = P"  "(P | (P | Q)) = (P | Q)" and
wenzelm@12281
  1070
    "(ALL x. P) = P"  "(EX x. P) = P"  "EX x. x=t"  "EX x. t=x"
wenzelm@12281
  1071
    -- {* needed for the one-point-rule quantifier simplification procs *}
wenzelm@12281
  1072
    -- {* essential for termination!! *} and
wenzelm@12281
  1073
    "!!P. (EX x. x=t & P(x)) = P(t)"
wenzelm@12281
  1074
    "!!P. (EX x. t=x & P(x)) = P(t)"
wenzelm@12281
  1075
    "!!P. (ALL x. x=t --> P(x)) = P(t)"
wenzelm@12937
  1076
    "!!P. (ALL x. t=x --> P(x)) = P(t)"
nipkow@17589
  1077
  by (blast, blast, blast, blast, blast, iprover+)
wenzelm@13421
  1078
paulson@14201
  1079
lemma disj_absorb: "(A | A) = A"
paulson@14201
  1080
  by blast
paulson@14201
  1081
paulson@14201
  1082
lemma disj_left_absorb: "(A | (A | B)) = (A | B)"
paulson@14201
  1083
  by blast
paulson@14201
  1084
paulson@14201
  1085
lemma conj_absorb: "(A & A) = A"
paulson@14201
  1086
  by blast
paulson@14201
  1087
paulson@14201
  1088
lemma conj_left_absorb: "(A & (A & B)) = (A & B)"
paulson@14201
  1089
  by blast
paulson@14201
  1090
wenzelm@12281
  1091
lemma eq_ac:
wenzelm@12937
  1092
  shows eq_commute: "(a=b) = (b=a)"
wenzelm@12937
  1093
    and eq_left_commute: "(P=(Q=R)) = (Q=(P=R))"
nipkow@17589
  1094
    and eq_assoc: "((P=Q)=R) = (P=(Q=R))" by (iprover, blast+)
nipkow@17589
  1095
lemma neq_commute: "(a~=b) = (b~=a)" by iprover
wenzelm@12281
  1096
wenzelm@12281
  1097
lemma conj_comms:
wenzelm@12937
  1098
  shows conj_commute: "(P&Q) = (Q&P)"
nipkow@17589
  1099
    and conj_left_commute: "(P&(Q&R)) = (Q&(P&R))" by iprover+
nipkow@17589
  1100
lemma conj_assoc: "((P&Q)&R) = (P&(Q&R))" by iprover
wenzelm@12281
  1101
paulson@19174
  1102
lemmas conj_ac = conj_commute conj_left_commute conj_assoc
paulson@19174
  1103
wenzelm@12281
  1104
lemma disj_comms:
wenzelm@12937
  1105
  shows disj_commute: "(P|Q) = (Q|P)"
nipkow@17589
  1106
    and disj_left_commute: "(P|(Q|R)) = (Q|(P|R))" by iprover+
nipkow@17589
  1107
lemma disj_assoc: "((P|Q)|R) = (P|(Q|R))" by iprover
wenzelm@12281
  1108
paulson@19174
  1109
lemmas disj_ac = disj_commute disj_left_commute disj_assoc
paulson@19174
  1110
nipkow@17589
  1111
lemma conj_disj_distribL: "(P&(Q|R)) = (P&Q | P&R)" by iprover
nipkow@17589
  1112
lemma conj_disj_distribR: "((P|Q)&R) = (P&R | Q&R)" by iprover
wenzelm@12281
  1113
nipkow@17589
  1114
lemma disj_conj_distribL: "(P|(Q&R)) = ((P|Q) & (P|R))" by iprover
nipkow@17589
  1115
lemma disj_conj_distribR: "((P&Q)|R) = ((P|R) & (Q|R))" by iprover
wenzelm@12281
  1116
nipkow@17589
  1117
lemma imp_conjR: "(P --> (Q&R)) = ((P-->Q) & (P-->R))" by iprover
nipkow@17589
  1118
lemma imp_conjL: "((P&Q) -->R)  = (P --> (Q --> R))" by iprover
nipkow@17589
  1119
lemma imp_disjL: "((P|Q) --> R) = ((P-->R)&(Q-->R))" by iprover
wenzelm@12281
  1120
wenzelm@12281
  1121
text {* These two are specialized, but @{text imp_disj_not1} is useful in @{text "Auth/Yahalom"}. *}
wenzelm@12281
  1122
lemma imp_disj_not1: "(P --> Q | R) = (~Q --> P --> R)" by blast
wenzelm@12281
  1123
lemma imp_disj_not2: "(P --> Q | R) = (~R --> P --> Q)" by blast
wenzelm@12281
  1124
wenzelm@12281
  1125
lemma imp_disj1: "((P-->Q)|R) = (P--> Q|R)" by blast
wenzelm@12281
  1126
lemma imp_disj2: "(Q|(P-->R)) = (P--> Q|R)" by blast
wenzelm@12281
  1127
haftmann@21151
  1128
lemma imp_cong: "(P = P') ==> (P' ==> (Q = Q')) ==> ((P --> Q) = (P' --> Q'))"
haftmann@21151
  1129
  by iprover
haftmann@21151
  1130
nipkow@17589
  1131
lemma de_Morgan_disj: "(~(P | Q)) = (~P & ~Q)" by iprover
wenzelm@12281
  1132
lemma de_Morgan_conj: "(~(P & Q)) = (~P | ~Q)" by blast
wenzelm@12281
  1133
lemma not_imp: "(~(P --> Q)) = (P & ~Q)" by blast
wenzelm@12281
  1134
lemma not_iff: "(P~=Q) = (P = (~Q))" by blast
wenzelm@12281
  1135
lemma disj_not1: "(~P | Q) = (P --> Q)" by blast
wenzelm@12281
  1136
lemma disj_not2: "(P | ~Q) = (Q --> P)"  -- {* changes orientation :-( *}
wenzelm@12281
  1137
  by blast
wenzelm@12281
  1138
lemma imp_conv_disj: "(P --> Q) = ((~P) | Q)" by blast
wenzelm@12281
  1139
nipkow@17589
  1140
lemma iff_conv_conj_imp: "(P = Q) = ((P --> Q) & (Q --> P))" by iprover
wenzelm@12281
  1141
wenzelm@12281
  1142
wenzelm@12281
  1143
lemma cases_simp: "((P --> Q) & (~P --> Q)) = Q"
wenzelm@12281
  1144
  -- {* Avoids duplication of subgoals after @{text split_if}, when the true and false *}
wenzelm@12281
  1145
  -- {* cases boil down to the same thing. *}
wenzelm@12281
  1146
  by blast
wenzelm@12281
  1147
wenzelm@12281
  1148
lemma not_all: "(~ (! x. P(x))) = (? x.~P(x))" by blast
wenzelm@12281
  1149
lemma imp_all: "((! x. P x) --> Q) = (? x. P x --> Q)" by blast
nipkow@17589
  1150
lemma not_ex: "(~ (? x. P(x))) = (! x.~P(x))" by iprover
nipkow@17589
  1151
lemma imp_ex: "((? x. P x) --> Q) = (! x. P x --> Q)" by iprover
chaieb@23403
  1152
lemma all_not_ex: "(ALL x. P x) = (~ (EX x. ~ P x ))" by blast
wenzelm@12281
  1153
paulson@24286
  1154
declare All_def [noatp]
paulson@24286
  1155
nipkow@17589
  1156
lemma ex_disj_distrib: "(? x. P(x) | Q(x)) = ((? x. P(x)) | (? x. Q(x)))" by iprover
nipkow@17589
  1157
lemma all_conj_distrib: "(!x. P(x) & Q(x)) = ((! x. P(x)) & (! x. Q(x)))" by iprover
wenzelm@12281
  1158
wenzelm@12281
  1159
text {*
wenzelm@12281
  1160
  \medskip The @{text "&"} congruence rule: not included by default!
wenzelm@12281
  1161
  May slow rewrite proofs down by as much as 50\% *}
wenzelm@12281
  1162
wenzelm@12281
  1163
lemma conj_cong:
wenzelm@12281
  1164
    "(P = P') ==> (P' ==> (Q = Q')) ==> ((P & Q) = (P' & Q'))"
nipkow@17589
  1165
  by iprover
wenzelm@12281
  1166
wenzelm@12281
  1167
lemma rev_conj_cong:
wenzelm@12281
  1168
    "(Q = Q') ==> (Q' ==> (P = P')) ==> ((P & Q) = (P' & Q'))"
nipkow@17589
  1169
  by iprover
wenzelm@12281
  1170
wenzelm@12281
  1171
text {* The @{text "|"} congruence rule: not included by default! *}
wenzelm@12281
  1172
wenzelm@12281
  1173
lemma disj_cong:
wenzelm@12281
  1174
    "(P = P') ==> (~P' ==> (Q = Q')) ==> ((P | Q) = (P' | Q'))"
wenzelm@12281
  1175
  by blast
wenzelm@12281
  1176
wenzelm@12281
  1177
wenzelm@12281
  1178
text {* \medskip if-then-else rules *}
wenzelm@12281
  1179
wenzelm@12281
  1180
lemma if_True: "(if True then x else y) = x"
wenzelm@12281
  1181
  by (unfold if_def) blast
wenzelm@12281
  1182
wenzelm@12281
  1183
lemma if_False: "(if False then x else y) = y"
wenzelm@12281
  1184
  by (unfold if_def) blast
wenzelm@12281
  1185
wenzelm@12281
  1186
lemma if_P: "P ==> (if P then x else y) = x"
wenzelm@12281
  1187
  by (unfold if_def) blast
wenzelm@12281
  1188
wenzelm@12281
  1189
lemma if_not_P: "~P ==> (if P then x else y) = y"
wenzelm@12281
  1190
  by (unfold if_def) blast
wenzelm@12281
  1191
wenzelm@12281
  1192
lemma split_if: "P (if Q then x else y) = ((Q --> P(x)) & (~Q --> P(y)))"
wenzelm@12281
  1193
  apply (rule case_split [of Q])
paulson@15481
  1194
   apply (simplesubst if_P)
paulson@15481
  1195
    prefer 3 apply (simplesubst if_not_P, blast+)
wenzelm@12281
  1196
  done
wenzelm@12281
  1197
wenzelm@12281
  1198
lemma split_if_asm: "P (if Q then x else y) = (~((Q & ~P x) | (~Q & ~P y)))"
paulson@15481
  1199
by (simplesubst split_if, blast)
wenzelm@12281
  1200
paulson@24286
  1201
lemmas if_splits [noatp] = split_if split_if_asm
wenzelm@12281
  1202
wenzelm@12281
  1203
lemma if_cancel: "(if c then x else x) = x"
paulson@15481
  1204
by (simplesubst split_if, blast)
wenzelm@12281
  1205
wenzelm@12281
  1206
lemma if_eq_cancel: "(if x = y then y else x) = x"
paulson@15481
  1207
by (simplesubst split_if, blast)
wenzelm@12281
  1208
wenzelm@12281
  1209
lemma if_bool_eq_conj: "(if P then Q else R) = ((P-->Q) & (~P-->R))"
wenzelm@19796
  1210
  -- {* This form is useful for expanding @{text "if"}s on the RIGHT of the @{text "==>"} symbol. *}
wenzelm@12281
  1211
  by (rule split_if)
wenzelm@12281
  1212
wenzelm@12281
  1213
lemma if_bool_eq_disj: "(if P then Q else R) = ((P&Q) | (~P&R))"
wenzelm@19796
  1214
  -- {* And this form is useful for expanding @{text "if"}s on the LEFT. *}
paulson@15481
  1215
  apply (simplesubst split_if, blast)
wenzelm@12281
  1216
  done
wenzelm@12281
  1217
nipkow@17589
  1218
lemma Eq_TrueI: "P ==> P == True" by (unfold atomize_eq) iprover
nipkow@17589
  1219
lemma Eq_FalseI: "~P ==> P == False" by (unfold atomize_eq) iprover
wenzelm@12281
  1220
schirmer@15423
  1221
text {* \medskip let rules for simproc *}
schirmer@15423
  1222
schirmer@15423
  1223
lemma Let_folded: "f x \<equiv> g x \<Longrightarrow>  Let x f \<equiv> Let x g"
schirmer@15423
  1224
  by (unfold Let_def)
schirmer@15423
  1225
schirmer@15423
  1226
lemma Let_unfold: "f x \<equiv> g \<Longrightarrow>  Let x f \<equiv> g"
schirmer@15423
  1227
  by (unfold Let_def)
schirmer@15423
  1228
berghofe@16633
  1229
text {*
ballarin@16999
  1230
  The following copy of the implication operator is useful for
ballarin@16999
  1231
  fine-tuning congruence rules.  It instructs the simplifier to simplify
ballarin@16999
  1232
  its premise.
berghofe@16633
  1233
*}
berghofe@16633
  1234
wenzelm@17197
  1235
constdefs
wenzelm@17197
  1236
  simp_implies :: "[prop, prop] => prop"  (infixr "=simp=>" 1)
haftmann@25966
  1237
  [code func del]: "simp_implies \<equiv> op ==>"
berghofe@16633
  1238
wenzelm@18457
  1239
lemma simp_impliesI:
berghofe@16633
  1240
  assumes PQ: "(PROP P \<Longrightarrow> PROP Q)"
berghofe@16633
  1241
  shows "PROP P =simp=> PROP Q"
berghofe@16633
  1242
  apply (unfold simp_implies_def)
berghofe@16633
  1243
  apply (rule PQ)
berghofe@16633
  1244
  apply assumption
berghofe@16633
  1245
  done
berghofe@16633
  1246
berghofe@16633
  1247
lemma simp_impliesE:
wenzelm@25388
  1248
  assumes PQ: "PROP P =simp=> PROP Q"
berghofe@16633
  1249
  and P: "PROP P"
berghofe@16633
  1250
  and QR: "PROP Q \<Longrightarrow> PROP R"
berghofe@16633
  1251
  shows "PROP R"
berghofe@16633
  1252
  apply (rule QR)
berghofe@16633
  1253
  apply (rule PQ [unfolded simp_implies_def])
berghofe@16633
  1254
  apply (rule P)
berghofe@16633
  1255
  done
berghofe@16633
  1256
berghofe@16633
  1257
lemma simp_implies_cong:
berghofe@16633
  1258
  assumes PP' :"PROP P == PROP P'"
berghofe@16633
  1259
  and P'QQ': "PROP P' ==> (PROP Q == PROP Q')"
berghofe@16633
  1260
  shows "(PROP P =simp=> PROP Q) == (PROP P' =simp=> PROP Q')"
berghofe@16633
  1261
proof (unfold simp_implies_def, rule equal_intr_rule)
berghofe@16633
  1262
  assume PQ: "PROP P \<Longrightarrow> PROP Q"
berghofe@16633
  1263
  and P': "PROP P'"
berghofe@16633
  1264
  from PP' [symmetric] and P' have "PROP P"
berghofe@16633
  1265
    by (rule equal_elim_rule1)
wenzelm@23553
  1266
  then have "PROP Q" by (rule PQ)
berghofe@16633
  1267
  with P'QQ' [OF P'] show "PROP Q'" by (rule equal_elim_rule1)
berghofe@16633
  1268
next
berghofe@16633
  1269
  assume P'Q': "PROP P' \<Longrightarrow> PROP Q'"
berghofe@16633
  1270
  and P: "PROP P"
berghofe@16633
  1271
  from PP' and P have P': "PROP P'" by (rule equal_elim_rule1)
wenzelm@23553
  1272
  then have "PROP Q'" by (rule P'Q')
berghofe@16633
  1273
  with P'QQ' [OF P', symmetric] show "PROP Q"
berghofe@16633
  1274
    by (rule equal_elim_rule1)
berghofe@16633
  1275
qed
berghofe@16633
  1276
haftmann@20944
  1277
lemma uncurry:
haftmann@20944
  1278
  assumes "P \<longrightarrow> Q \<longrightarrow> R"
haftmann@20944
  1279
  shows "P \<and> Q \<longrightarrow> R"
wenzelm@23553
  1280
  using assms by blast
haftmann@20944
  1281
haftmann@20944
  1282
lemma iff_allI:
haftmann@20944
  1283
  assumes "\<And>x. P x = Q x"
haftmann@20944
  1284
  shows "(\<forall>x. P x) = (\<forall>x. Q x)"
wenzelm@23553
  1285
  using assms by blast
haftmann@20944
  1286
haftmann@20944
  1287
lemma iff_exI:
haftmann@20944
  1288
  assumes "\<And>x. P x = Q x"
haftmann@20944
  1289
  shows "(\<exists>x. P x) = (\<exists>x. Q x)"
wenzelm@23553
  1290
  using assms by blast
haftmann@20944
  1291
haftmann@20944
  1292
lemma all_comm:
haftmann@20944
  1293
  "(\<forall>x y. P x y) = (\<forall>y x. P x y)"
haftmann@20944
  1294
  by blast
haftmann@20944
  1295
haftmann@20944
  1296
lemma ex_comm:
haftmann@20944
  1297
  "(\<exists>x y. P x y) = (\<exists>y x. P x y)"
haftmann@20944
  1298
  by blast
haftmann@20944
  1299
wenzelm@9869
  1300
use "simpdata.ML"
wenzelm@21671
  1301
ML {* open Simpdata *}
wenzelm@21671
  1302
haftmann@21151
  1303
setup {*
haftmann@21151
  1304
  Simplifier.method_setup Splitter.split_modifiers
wenzelm@26496
  1305
  #> Simplifier.map_simpset (K Simpdata.simpset_simprocs)
haftmann@21151
  1306
  #> Splitter.setup
wenzelm@26496
  1307
  #> clasimp_setup
haftmann@21151
  1308
  #> EqSubst.setup
haftmann@21151
  1309
*}
haftmann@21151
  1310
wenzelm@24035
  1311
text {* Simproc for proving @{text "(y = x) == False"} from premise @{text "~(x = y)"}: *}
wenzelm@24035
  1312
wenzelm@24035
  1313
simproc_setup neq ("x = y") = {* fn _ =>
wenzelm@24035
  1314
let
wenzelm@24035
  1315
  val neq_to_EQ_False = @{thm not_sym} RS @{thm Eq_FalseI};
wenzelm@24035
  1316
  fun is_neq eq lhs rhs thm =
wenzelm@24035
  1317
    (case Thm.prop_of thm of
wenzelm@24035
  1318
      _ $ (Not $ (eq' $ l' $ r')) =>
wenzelm@24035
  1319
        Not = HOLogic.Not andalso eq' = eq andalso
wenzelm@24035
  1320
        r' aconv lhs andalso l' aconv rhs
wenzelm@24035
  1321
    | _ => false);
wenzelm@24035
  1322
  fun proc ss ct =
wenzelm@24035
  1323
    (case Thm.term_of ct of
wenzelm@24035
  1324
      eq $ lhs $ rhs =>
wenzelm@24035
  1325
        (case find_first (is_neq eq lhs rhs) (Simplifier.prems_of_ss ss) of
wenzelm@24035
  1326
          SOME thm => SOME (thm RS neq_to_EQ_False)
wenzelm@24035
  1327
        | NONE => NONE)
wenzelm@24035
  1328
     | _ => NONE);
wenzelm@24035
  1329
in proc end;
wenzelm@24035
  1330
*}
wenzelm@24035
  1331
wenzelm@24035
  1332
simproc_setup let_simp ("Let x f") = {*
wenzelm@24035
  1333
let
wenzelm@24035
  1334
  val (f_Let_unfold, x_Let_unfold) =
wenzelm@24035
  1335
    let val [(_$(f$x)$_)] = prems_of @{thm Let_unfold}
wenzelm@24035
  1336
    in (cterm_of @{theory} f, cterm_of @{theory} x) end
wenzelm@24035
  1337
  val (f_Let_folded, x_Let_folded) =
wenzelm@24035
  1338
    let val [(_$(f$x)$_)] = prems_of @{thm Let_folded}
wenzelm@24035
  1339
    in (cterm_of @{theory} f, cterm_of @{theory} x) end;
wenzelm@24035
  1340
  val g_Let_folded =
wenzelm@24035
  1341
    let val [(_$_$(g$_))] = prems_of @{thm Let_folded} in cterm_of @{theory} g end;
wenzelm@24035
  1342
wenzelm@24035
  1343
  fun proc _ ss ct =
wenzelm@24035
  1344
    let
wenzelm@24035
  1345
      val ctxt = Simplifier.the_context ss;
wenzelm@24035
  1346
      val thy = ProofContext.theory_of ctxt;
wenzelm@24035
  1347
      val t = Thm.term_of ct;
wenzelm@24035
  1348
      val ([t'], ctxt') = Variable.import_terms false [t] ctxt;
wenzelm@24035
  1349
    in Option.map (hd o Variable.export ctxt' ctxt o single)
wenzelm@24035
  1350
      (case t' of Const ("Let",_) $ x $ f => (* x and f are already in normal form *)
wenzelm@24035
  1351
        if is_Free x orelse is_Bound x orelse is_Const x
wenzelm@24035
  1352
        then SOME @{thm Let_def}
wenzelm@24035
  1353
        else
wenzelm@24035
  1354
          let
wenzelm@24035
  1355
            val n = case f of (Abs (x,_,_)) => x | _ => "x";
wenzelm@24035
  1356
            val cx = cterm_of thy x;
wenzelm@24035
  1357
            val {T=xT,...} = rep_cterm cx;
wenzelm@24035
  1358
            val cf = cterm_of thy f;
wenzelm@24035
  1359
            val fx_g = Simplifier.rewrite ss (Thm.capply cf cx);
wenzelm@24035
  1360
            val (_$_$g) = prop_of fx_g;
wenzelm@24035
  1361
            val g' = abstract_over (x,g);
wenzelm@24035
  1362
          in (if (g aconv g')
wenzelm@24035
  1363
               then
wenzelm@24035
  1364
                  let
wenzelm@24035
  1365
                    val rl =
wenzelm@24035
  1366
                      cterm_instantiate [(f_Let_unfold,cf),(x_Let_unfold,cx)] @{thm Let_unfold};
wenzelm@24035
  1367
                  in SOME (rl OF [fx_g]) end
wenzelm@24035
  1368
               else if Term.betapply (f,x) aconv g then NONE (*avoid identity conversion*)
wenzelm@24035
  1369
               else let
wenzelm@24035
  1370
                     val abs_g'= Abs (n,xT,g');
wenzelm@24035
  1371
                     val g'x = abs_g'$x;
wenzelm@24035
  1372
                     val g_g'x = symmetric (beta_conversion false (cterm_of thy g'x));
wenzelm@24035
  1373
                     val rl = cterm_instantiate
wenzelm@24035
  1374
                               [(f_Let_folded,cterm_of thy f),(x_Let_folded,cx),
wenzelm@24035
  1375
                                (g_Let_folded,cterm_of thy abs_g')]
wenzelm@24035
  1376
                               @{thm Let_folded};
wenzelm@24035
  1377
                   in SOME (rl OF [transitive fx_g g_g'x])
wenzelm@24035
  1378
                   end)
wenzelm@24035
  1379
          end
wenzelm@24035
  1380
      | _ => NONE)
wenzelm@24035
  1381
    end
wenzelm@24035
  1382
in proc end *}
wenzelm@24035
  1383
wenzelm@24035
  1384
haftmann@21151
  1385
lemma True_implies_equals: "(True \<Longrightarrow> PROP P) \<equiv> PROP P"
haftmann@21151
  1386
proof
wenzelm@23389
  1387
  assume "True \<Longrightarrow> PROP P"
wenzelm@23389
  1388
  from this [OF TrueI] show "PROP P" .
haftmann@21151
  1389
next
haftmann@21151
  1390
  assume "PROP P"
wenzelm@23389
  1391
  then show "PROP P" .
haftmann@21151
  1392
qed
haftmann@21151
  1393
haftmann@21151
  1394
lemma ex_simps:
haftmann@21151
  1395
  "!!P Q. (EX x. P x & Q)   = ((EX x. P x) & Q)"
haftmann@21151
  1396
  "!!P Q. (EX x. P & Q x)   = (P & (EX x. Q x))"
haftmann@21151
  1397
  "!!P Q. (EX x. P x | Q)   = ((EX x. P x) | Q)"
haftmann@21151
  1398
  "!!P Q. (EX x. P | Q x)   = (P | (EX x. Q x))"
haftmann@21151
  1399
  "!!P Q. (EX x. P x --> Q) = ((ALL x. P x) --> Q)"
haftmann@21151
  1400
  "!!P Q. (EX x. P --> Q x) = (P --> (EX x. Q x))"
haftmann@21151
  1401
  -- {* Miniscoping: pushing in existential quantifiers. *}
haftmann@21151
  1402
  by (iprover | blast)+
haftmann@21151
  1403
haftmann@21151
  1404
lemma all_simps:
haftmann@21151
  1405
  "!!P Q. (ALL x. P x & Q)   = ((ALL x. P x) & Q)"
haftmann@21151
  1406
  "!!P Q. (ALL x. P & Q x)   = (P & (ALL x. Q x))"
haftmann@21151
  1407
  "!!P Q. (ALL x. P x | Q)   = ((ALL x. P x) | Q)"
haftmann@21151
  1408
  "!!P Q. (ALL x. P | Q x)   = (P | (ALL x. Q x))"
haftmann@21151
  1409
  "!!P Q. (ALL x. P x --> Q) = ((EX x. P x) --> Q)"
haftmann@21151
  1410
  "!!P Q. (ALL x. P --> Q x) = (P --> (ALL x. Q x))"
haftmann@21151
  1411
  -- {* Miniscoping: pushing in universal quantifiers. *}
haftmann@21151
  1412
  by (iprover | blast)+
paulson@15481
  1413
wenzelm@21671
  1414
lemmas [simp] =
wenzelm@21671
  1415
  triv_forall_equality (*prunes params*)
wenzelm@21671
  1416
  True_implies_equals  (*prune asms `True'*)
wenzelm@21671
  1417
  if_True
wenzelm@21671
  1418
  if_False
wenzelm@21671
  1419
  if_cancel
wenzelm@21671
  1420
  if_eq_cancel
wenzelm@21671
  1421
  imp_disjL
haftmann@20973
  1422
  (*In general it seems wrong to add distributive laws by default: they
haftmann@20973
  1423
    might cause exponential blow-up.  But imp_disjL has been in for a while
haftmann@20973
  1424
    and cannot be removed without affecting existing proofs.  Moreover,
haftmann@20973
  1425
    rewriting by "(P|Q --> R) = ((P-->R)&(Q-->R))" might be justified on the
haftmann@20973
  1426
    grounds that it allows simplification of R in the two cases.*)
wenzelm@21671
  1427
  conj_assoc
wenzelm@21671
  1428
  disj_assoc
wenzelm@21671
  1429
  de_Morgan_conj
wenzelm@21671
  1430
  de_Morgan_disj
wenzelm@21671
  1431
  imp_disj1
wenzelm@21671
  1432
  imp_disj2
wenzelm@21671
  1433
  not_imp
wenzelm@21671
  1434
  disj_not1
wenzelm@21671
  1435
  not_all
wenzelm@21671
  1436
  not_ex
wenzelm@21671
  1437
  cases_simp
wenzelm@21671
  1438
  the_eq_trivial
wenzelm@21671
  1439
  the_sym_eq_trivial
wenzelm@21671
  1440
  ex_simps
wenzelm@21671
  1441
  all_simps
wenzelm@21671
  1442
  simp_thms
wenzelm@21671
  1443
wenzelm@21671
  1444
lemmas [cong] = imp_cong simp_implies_cong
wenzelm@21671
  1445
lemmas [split] = split_if
haftmann@20973
  1446
wenzelm@22377
  1447
ML {* val HOL_ss = @{simpset} *}
haftmann@20973
  1448
haftmann@20944
  1449
text {* Simplifies x assuming c and y assuming ~c *}
haftmann@20944
  1450
lemma if_cong:
haftmann@20944
  1451
  assumes "b = c"
haftmann@20944
  1452
      and "c \<Longrightarrow> x = u"
haftmann@20944
  1453
      and "\<not> c \<Longrightarrow> y = v"
haftmann@20944
  1454
  shows "(if b then x else y) = (if c then u else v)"
wenzelm@23553
  1455
  unfolding if_def using assms by simp
haftmann@20944
  1456
haftmann@20944
  1457
text {* Prevents simplification of x and y:
haftmann@20944
  1458
  faster and allows the execution of functional programs. *}
haftmann@20944
  1459
lemma if_weak_cong [cong]:
haftmann@20944
  1460
  assumes "b = c"
haftmann@20944
  1461
  shows "(if b then x else y) = (if c then x else y)"
wenzelm@23553
  1462
  using assms by (rule arg_cong)
haftmann@20944
  1463
haftmann@20944
  1464
text {* Prevents simplification of t: much faster *}
haftmann@20944
  1465
lemma let_weak_cong:
haftmann@20944
  1466
  assumes "a = b"
haftmann@20944
  1467
  shows "(let x = a in t x) = (let x = b in t x)"
wenzelm@23553
  1468
  using assms by (rule arg_cong)
haftmann@20944
  1469
haftmann@20944
  1470
text {* To tidy up the result of a simproc.  Only the RHS will be simplified. *}
haftmann@20944
  1471
lemma eq_cong2:
haftmann@20944
  1472
  assumes "u = u'"
haftmann@20944
  1473
  shows "(t \<equiv> u) \<equiv> (t \<equiv> u')"
wenzelm@23553
  1474
  using assms by simp
haftmann@20944
  1475
haftmann@20944
  1476
lemma if_distrib:
haftmann@20944
  1477
  "f (if c then x else y) = (if c then f x else f y)"
haftmann@20944
  1478
  by simp
haftmann@20944
  1479
haftmann@20944
  1480
text {* This lemma restricts the effect of the rewrite rule u=v to the left-hand
wenzelm@21502
  1481
  side of an equality.  Used in @{text "{Integ,Real}/simproc.ML"} *}
haftmann@20944
  1482
lemma restrict_to_left:
haftmann@20944
  1483
  assumes "x = y"
haftmann@20944
  1484
  shows "(x = z) = (y = z)"
wenzelm@23553
  1485
  using assms by simp
haftmann@20944
  1486
wenzelm@17459
  1487
haftmann@20944
  1488
subsubsection {* Generic cases and induction *}
wenzelm@17459
  1489
haftmann@20944
  1490
text {* Rule projections: *}
berghofe@18887
  1491
haftmann@20944
  1492
ML {*
haftmann@20944
  1493
structure ProjectRule = ProjectRuleFun
wenzelm@25388
  1494
(
wenzelm@27126
  1495
  val conjunct1 = @{thm conjunct1}
wenzelm@27126
  1496
  val conjunct2 = @{thm conjunct2}
wenzelm@27126
  1497
  val mp = @{thm mp}
wenzelm@25388
  1498
)
wenzelm@17459
  1499
*}
wenzelm@17459
  1500
wenzelm@11824
  1501
constdefs
wenzelm@18457
  1502
  induct_forall where "induct_forall P == \<forall>x. P x"
wenzelm@18457
  1503
  induct_implies where "induct_implies A B == A \<longrightarrow> B"
wenzelm@18457
  1504
  induct_equal where "induct_equal x y == x = y"
wenzelm@18457
  1505
  induct_conj where "induct_conj A B == A \<and> B"
wenzelm@11824
  1506
wenzelm@11989
  1507
lemma induct_forall_eq: "(!!x. P x) == Trueprop (induct_forall (\<lambda>x. P x))"
wenzelm@18457
  1508
  by (unfold atomize_all induct_forall_def)
wenzelm@11824
  1509
wenzelm@11989
  1510
lemma induct_implies_eq: "(A ==> B) == Trueprop (induct_implies A B)"
wenzelm@18457
  1511
  by (unfold atomize_imp induct_implies_def)
wenzelm@11824
  1512
wenzelm@11989
  1513
lemma induct_equal_eq: "(x == y) == Trueprop (induct_equal x y)"
wenzelm@18457
  1514
  by (unfold atomize_eq induct_equal_def)
wenzelm@18457
  1515
wenzelm@18457
  1516
lemma induct_conj_eq:
wenzelm@18457
  1517
  includes meta_conjunction_syntax
wenzelm@18457
  1518
  shows "(A && B) == Trueprop (induct_conj A B)"
wenzelm@18457
  1519
  by (unfold atomize_conj induct_conj_def)
wenzelm@18457
  1520
wenzelm@18457
  1521
lemmas induct_atomize = induct_forall_eq induct_implies_eq induct_equal_eq induct_conj_eq
wenzelm@18457
  1522
lemmas induct_rulify [symmetric, standard] = induct_atomize
wenzelm@18457
  1523
lemmas induct_rulify_fallback =
wenzelm@18457
  1524
  induct_forall_def induct_implies_def induct_equal_def induct_conj_def
wenzelm@18457
  1525
wenzelm@11824
  1526
wenzelm@11989
  1527
lemma induct_forall_conj: "induct_forall (\<lambda>x. induct_conj (A x) (B x)) =
wenzelm@11989
  1528
    induct_conj (induct_forall A) (induct_forall B)"
nipkow@17589
  1529
  by (unfold induct_forall_def induct_conj_def) iprover
wenzelm@11824
  1530
wenzelm@11989
  1531
lemma induct_implies_conj: "induct_implies C (induct_conj A B) =
wenzelm@11989
  1532
    induct_conj (induct_implies C A) (induct_implies C B)"
nipkow@17589
  1533
  by (unfold induct_implies_def induct_conj_def) iprover
wenzelm@11989
  1534
berghofe@13598
  1535
lemma induct_conj_curry: "(induct_conj A B ==> PROP C) == (A ==> B ==> PROP C)"
berghofe@13598
  1536
proof
berghofe@13598
  1537
  assume r: "induct_conj A B ==> PROP C" and A B
wenzelm@18457
  1538
  show "PROP C" by (rule r) (simp add: induct_conj_def `A` `B`)
berghofe@13598
  1539
next
berghofe@13598
  1540
  assume r: "A ==> B ==> PROP C" and "induct_conj A B"
wenzelm@18457
  1541
  show "PROP C" by (rule r) (simp_all add: `induct_conj A B` [unfolded induct_conj_def])
berghofe@13598
  1542
qed
wenzelm@11824
  1543
wenzelm@11989
  1544
lemmas induct_conj = induct_forall_conj induct_implies_conj induct_conj_curry
wenzelm@11824
  1545
wenzelm@11989
  1546
hide const induct_forall induct_implies induct_equal induct_conj
wenzelm@11824
  1547
wenzelm@11824
  1548
text {* Method setup. *}
wenzelm@11824
  1549
wenzelm@11824
  1550
ML {*
wenzelm@27126
  1551
structure Induct = InductFun
wenzelm@27126
  1552
(
wenzelm@27126
  1553
  val cases_default = @{thm case_split}
wenzelm@27126
  1554
  val atomize = @{thms induct_atomize}
wenzelm@27126
  1555
  val rulify = @{thms induct_rulify}
wenzelm@27126
  1556
  val rulify_fallback = @{thms induct_rulify_fallback}
wenzelm@27126
  1557
)
wenzelm@11824
  1558
*}
wenzelm@11824
  1559
wenzelm@24830
  1560
setup Induct.setup
wenzelm@18457
  1561
wenzelm@27326
  1562
use "~~/src/Tools/induct_tacs.ML"
wenzelm@27126
  1563
setup InductTacs.setup
wenzelm@27126
  1564
haftmann@20944
  1565
haftmann@20944
  1566
subsection {* Other simple lemmas and lemma duplicates *}
haftmann@20944
  1567
haftmann@24166
  1568
lemma Let_0 [simp]: "Let 0 f = f 0"
haftmann@24166
  1569
  unfolding Let_def ..
haftmann@24166
  1570
haftmann@24166
  1571
lemma Let_1 [simp]: "Let 1 f = f 1"
haftmann@24166
  1572
  unfolding Let_def ..
haftmann@24166
  1573
haftmann@20944
  1574
lemma ex1_eq [iff]: "EX! x. x = t" "EX! x. t = x"
haftmann@20944
  1575
  by blast+
haftmann@20944
  1576
haftmann@20944
  1577
lemma choice_eq: "(ALL x. EX! y. P x y) = (EX! f. ALL x. P x (f x))"
haftmann@20944
  1578
  apply (rule iffI)
haftmann@20944
  1579
  apply (rule_tac a = "%x. THE y. P x y" in ex1I)
haftmann@20944
  1580
  apply (fast dest!: theI')
haftmann@20944
  1581
  apply (fast intro: ext the1_equality [symmetric])
haftmann@20944
  1582
  apply (erule ex1E)
haftmann@20944
  1583
  apply (rule allI)
haftmann@20944
  1584
  apply (rule ex1I)
haftmann@20944
  1585
  apply (erule spec)
haftmann@20944
  1586
  apply (erule_tac x = "%z. if z = x then y else f z" in allE)
haftmann@20944
  1587
  apply (erule impE)
haftmann@20944
  1588
  apply (rule allI)
wenzelm@27126
  1589
  apply (case_tac "xa = x")
haftmann@20944
  1590
  apply (drule_tac [3] x = x in fun_cong, simp_all)
haftmann@20944
  1591
  done
haftmann@20944
  1592
haftmann@20944
  1593
lemma mk_left_commute:
haftmann@21547
  1594
  fixes f (infix "\<otimes>" 60)
haftmann@21547
  1595
  assumes a: "\<And>x y z. (x \<otimes> y) \<otimes> z = x \<otimes> (y \<otimes> z)" and
haftmann@21547
  1596
          c: "\<And>x y. x \<otimes> y = y \<otimes> x"
haftmann@21547
  1597
  shows "x \<otimes> (y \<otimes> z) = y \<otimes> (x \<otimes> z)"
haftmann@20944
  1598
  by (rule trans [OF trans [OF c a] arg_cong [OF c, of "f y"]])
haftmann@20944
  1599
haftmann@22218
  1600
lemmas eq_sym_conv = eq_commute
haftmann@22218
  1601
chaieb@23037
  1602
lemma nnf_simps:
chaieb@23037
  1603
  "(\<not>(P \<and> Q)) = (\<not> P \<or> \<not> Q)" "(\<not> (P \<or> Q)) = (\<not> P \<and> \<not>Q)" "(P \<longrightarrow> Q) = (\<not>P \<or> Q)" 
chaieb@23037
  1604
  "(P = Q) = ((P \<and> Q) \<or> (\<not>P \<and> \<not> Q))" "(\<not>(P = Q)) = ((P \<and> \<not> Q) \<or> (\<not>P \<and> Q))" 
chaieb@23037
  1605
  "(\<not> \<not>(P)) = P"
chaieb@23037
  1606
by blast+
chaieb@23037
  1607
wenzelm@21671
  1608
wenzelm@21671
  1609
subsection {* Basic ML bindings *}
wenzelm@21671
  1610
wenzelm@21671
  1611
ML {*
wenzelm@22129
  1612
val FalseE = @{thm FalseE}
wenzelm@22129
  1613
val Let_def = @{thm Let_def}
wenzelm@22129
  1614
val TrueI = @{thm TrueI}
wenzelm@22129
  1615
val allE = @{thm allE}
wenzelm@22129
  1616
val allI = @{thm allI}
wenzelm@22129
  1617
val all_dupE = @{thm all_dupE}
wenzelm@22129
  1618
val arg_cong = @{thm arg_cong}
wenzelm@22129
  1619
val box_equals = @{thm box_equals}
wenzelm@22129
  1620
val ccontr = @{thm ccontr}
wenzelm@22129
  1621
val classical = @{thm classical}
wenzelm@22129
  1622
val conjE = @{thm conjE}
wenzelm@22129
  1623
val conjI = @{thm conjI}
wenzelm@22129
  1624
val conjunct1 = @{thm conjunct1}
wenzelm@22129
  1625
val conjunct2 = @{thm conjunct2}
wenzelm@22129
  1626
val disjCI = @{thm disjCI}
wenzelm@22129
  1627
val disjE = @{thm disjE}
wenzelm@22129
  1628
val disjI1 = @{thm disjI1}
wenzelm@22129
  1629
val disjI2 = @{thm disjI2}
wenzelm@22129
  1630
val eq_reflection = @{thm eq_reflection}
wenzelm@22129
  1631
val ex1E = @{thm ex1E}
wenzelm@22129
  1632
val ex1I = @{thm ex1I}
wenzelm@22129
  1633
val ex1_implies_ex = @{thm ex1_implies_ex}
wenzelm@22129
  1634
val exE = @{thm exE}
wenzelm@22129
  1635
val exI = @{thm exI}
wenzelm@22129
  1636
val excluded_middle = @{thm excluded_middle}
wenzelm@22129
  1637
val ext = @{thm ext}
wenzelm@22129
  1638
val fun_cong = @{thm fun_cong}
wenzelm@22129
  1639
val iffD1 = @{thm iffD1}
wenzelm@22129
  1640
val iffD2 = @{thm iffD2}
wenzelm@22129
  1641
val iffI = @{thm iffI}
wenzelm@22129
  1642
val impE = @{thm impE}
wenzelm@22129
  1643
val impI = @{thm impI}
wenzelm@22129
  1644
val meta_eq_to_obj_eq = @{thm meta_eq_to_obj_eq}
wenzelm@22129
  1645
val mp = @{thm mp}
wenzelm@22129
  1646
val notE = @{thm notE}
wenzelm@22129
  1647
val notI = @{thm notI}
wenzelm@22129
  1648
val not_all = @{thm not_all}
wenzelm@22129
  1649
val not_ex = @{thm not_ex}
wenzelm@22129
  1650
val not_iff = @{thm not_iff}
wenzelm@22129
  1651
val not_not = @{thm not_not}
wenzelm@22129
  1652
val not_sym = @{thm not_sym}
wenzelm@22129
  1653
val refl = @{thm refl}
wenzelm@22129
  1654
val rev_mp = @{thm rev_mp}
wenzelm@22129
  1655
val spec = @{thm spec}
wenzelm@22129
  1656
val ssubst = @{thm ssubst}
wenzelm@22129
  1657
val subst = @{thm subst}
wenzelm@22129
  1658
val sym = @{thm sym}
wenzelm@22129
  1659
val trans = @{thm trans}
wenzelm@21671
  1660
*}
wenzelm@21671
  1661
wenzelm@21671
  1662
haftmann@24280
  1663
subsection {* Code generator basic setup -- see further @{text Code_Setup.thy} *}
haftmann@23247
  1664
haftmann@28012
  1665
setup {*
haftmann@28012
  1666
  Code.map_pre (K HOL_basic_ss)
haftmann@28012
  1667
  #> Code.map_post (K HOL_basic_ss)
haftmann@28012
  1668
*}
haftmann@28012
  1669
haftmann@28012
  1670
code_datatype True False
haftmann@23247
  1671
haftmann@25534
  1672
code_datatype "TYPE('a\<Colon>{})"
haftmann@23247
  1673
haftmann@28012
  1674
code_datatype Trueprop "prop"
haftmann@28012
  1675
haftmann@24844
  1676
lemma Let_case_cert:
haftmann@24844
  1677
  assumes "CASE \<equiv> (\<lambda>x. Let x f)"
haftmann@24844
  1678
  shows "CASE x \<equiv> f x"
haftmann@24844
  1679
  using assms by simp_all
haftmann@24844
  1680
haftmann@24844
  1681
lemma If_case_cert:
haftmann@24844
  1682
  includes meta_conjunction_syntax
haftmann@24844
  1683
  assumes "CASE \<equiv> (\<lambda>b. If b f g)"
haftmann@24844
  1684
  shows "(CASE True \<equiv> f) && (CASE False \<equiv> g)"
haftmann@24844
  1685
  using assms by simp_all
haftmann@24844
  1686
haftmann@24844
  1687
setup {*
haftmann@24844
  1688
  Code.add_case @{thm Let_case_cert}
haftmann@24844
  1689
  #> Code.add_case @{thm If_case_cert}
haftmann@24844
  1690
  #> Code.add_undefined @{const_name undefined}
haftmann@24844
  1691
*}
haftmann@24844
  1692
haftmann@26513
  1693
class eq = type +
haftmann@26513
  1694
  fixes eq :: "'a \<Rightarrow> 'a \<Rightarrow> bool"
haftmann@26513
  1695
  assumes eq: "eq x y \<longleftrightarrow> x = y "
haftmann@26513
  1696
begin
haftmann@26513
  1697
haftmann@26513
  1698
lemma equals_eq [code inline, code func]: "op = \<equiv> eq"
haftmann@26513
  1699
  by (rule eq_reflection) (rule ext, rule ext, rule sym, rule eq)
haftmann@26513
  1700
haftmann@26555
  1701
declare equals_eq [symmetric, code post]
haftmann@26555
  1702
haftmann@26513
  1703
end
haftmann@26513
  1704
haftmann@26732
  1705
hide (open) const eq
haftmann@26732
  1706
hide const eq
haftmann@26732
  1707
haftmann@26513
  1708
setup {*
haftmann@28054
  1709
  Code_Unit.add_const_alias @{thm equals_eq}
haftmann@28054
  1710
  #> Code_Name.setup
haftmann@28054
  1711
  #> Code_ML.setup
haftmann@28054
  1712
  #> Code_Haskell.setup
haftmann@26747
  1713
  #> Nbe.setup
haftmann@28227
  1714
  #> Codegen.setup
haftmann@26513
  1715
*}
haftmann@26513
  1716
haftmann@26513
  1717
lemma [code func]:
haftmann@26513
  1718
  shows "False \<and> x \<longleftrightarrow> False"
haftmann@26513
  1719
    and "True \<and> x \<longleftrightarrow> x"
haftmann@26513
  1720
    and "x \<and> False \<longleftrightarrow> False"
haftmann@26513
  1721
    and "x \<and> True \<longleftrightarrow> x" by simp_all
haftmann@26513
  1722
haftmann@26513
  1723
lemma [code func]:
haftmann@26513
  1724
  shows "False \<or> x \<longleftrightarrow> x"
haftmann@26513
  1725
    and "True \<or> x \<longleftrightarrow> True"
haftmann@26513
  1726
    and "x \<or> False \<longleftrightarrow> x"
haftmann@26513
  1727
    and "x \<or> True \<longleftrightarrow> True" by simp_all
haftmann@26513
  1728
haftmann@26513
  1729
lemma [code func]:
haftmann@26513
  1730
  shows "\<not> True \<longleftrightarrow> False"
haftmann@26513
  1731
    and "\<not> False \<longleftrightarrow> True" by (rule HOL.simp_thms)+
haftmann@26513
  1732
haftmann@28012
  1733
lemmas [code func] = Let_def if_True if_False
haftmann@28012
  1734
haftmann@28012
  1735
lemmas [code func, code unfold, symmetric, code post] = imp_conv_disj
haftmann@26513
  1736
haftmann@23247
  1737
haftmann@22839
  1738
subsection {* Legacy tactics and ML bindings *}
wenzelm@21671
  1739
wenzelm@21671
  1740
ML {*
wenzelm@21671
  1741
fun strip_tac i = REPEAT (resolve_tac [impI, allI] i);
wenzelm@21671
  1742
wenzelm@21671
  1743
(* combination of (spec RS spec RS ...(j times) ... spec RS mp) *)
wenzelm@21671
  1744
local
wenzelm@21671
  1745
  fun wrong_prem (Const ("All", _) $ (Abs (_, _, t))) = wrong_prem t
wenzelm@21671
  1746
    | wrong_prem (Bound _) = true
wenzelm@21671
  1747
    | wrong_prem _ = false;
wenzelm@21671
  1748
  val filter_right = filter (not o wrong_prem o HOLogic.dest_Trueprop o hd o Thm.prems_of);
wenzelm@21671
  1749
in
wenzelm@21671
  1750
  fun smp i = funpow i (fn m => filter_right ([spec] RL m)) ([mp]);
wenzelm@21671
  1751
  fun smp_tac j = EVERY'[dresolve_tac (smp j), atac];
wenzelm@21671
  1752
end;
haftmann@22839
  1753
haftmann@22839
  1754
val all_conj_distrib = thm "all_conj_distrib";
haftmann@22839
  1755
val all_simps = thms "all_simps";
haftmann@22839
  1756
val atomize_not = thm "atomize_not";
wenzelm@24830
  1757
val case_split = thm "case_split";
haftmann@22839
  1758
val cases_simp = thm "cases_simp";
haftmann@22839
  1759
val choice_eq = thm "choice_eq"
haftmann@22839
  1760
val cong = thm "cong"
haftmann@22839
  1761
val conj_comms = thms "conj_comms";
haftmann@22839
  1762
val conj_cong = thm "conj_cong";
haftmann@22839
  1763
val de_Morgan_conj = thm "de_Morgan_conj";
haftmann@22839
  1764
val de_Morgan_disj = thm "de_Morgan_disj";
haftmann@22839
  1765
val disj_assoc = thm "disj_assoc";
haftmann@22839
  1766
val disj_comms = thms "disj_comms";
haftmann@22839
  1767
val disj_cong = thm "disj_cong";
haftmann@22839
  1768
val eq_ac = thms "eq_ac";
haftmann@22839
  1769
val eq_cong2 = thm "eq_cong2"
haftmann@22839
  1770
val Eq_FalseI = thm "Eq_FalseI";
haftmann@22839
  1771
val Eq_TrueI = thm "Eq_TrueI";
haftmann@22839
  1772
val Ex1_def = thm "Ex1_def"
haftmann@22839
  1773
val ex_disj_distrib = thm "ex_disj_distrib";
haftmann@22839
  1774
val ex_simps = thms "ex_simps";
haftmann@22839
  1775
val if_cancel = thm "if_cancel";
haftmann@22839
  1776
val if_eq_cancel = thm "if_eq_cancel";
haftmann@22839
  1777
val if_False = thm "if_False";
haftmann@22839
  1778
val iff_conv_conj_imp = thm "iff_conv_conj_imp";
haftmann@22839
  1779
val iff = thm "iff"
haftmann@22839
  1780
val if_splits = thms "if_splits";
haftmann@22839
  1781
val if_True = thm "if_True";
haftmann@22839
  1782
val if_weak_cong = thm "if_weak_cong"
haftmann@22839
  1783
val imp_all = thm "imp_all";
haftmann@22839
  1784
val imp_cong = thm "imp_cong";
haftmann@22839
  1785
val imp_conjL = thm "imp_conjL";
haftmann@22839
  1786
val imp_conjR = thm "imp_conjR";
haftmann@22839
  1787
val imp_conv_disj = thm "imp_conv_disj";
haftmann@22839
  1788
val simp_implies_def = thm "simp_implies_def";
haftmann@22839
  1789
val simp_thms = thms "simp_thms";
haftmann@22839
  1790
val split_if = thm "split_if";
haftmann@22839
  1791
val the1_equality = thm "the1_equality"
haftmann@22839
  1792
val theI = thm "theI"
haftmann@22839
  1793
val theI' = thm "theI'"
haftmann@22839
  1794
val True_implies_equals = thm "True_implies_equals";
chaieb@23037
  1795
val nnf_conv = Simplifier.rewrite (HOL_basic_ss addsimps simp_thms @ @{thms "nnf_simps"})
chaieb@23037
  1796
wenzelm@21671
  1797
*}
wenzelm@21671
  1798
kleing@14357
  1799
end