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(* Title: HOL/Fun.thy
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ID: $Id$
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Author: Tobias Nipkow, Cambridge University Computer Laboratory
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Copyright 1994 University of Cambridge
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Notions about functions.
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*)
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Fun = Set +
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consts
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inj, surj :: ('a => 'b) => bool (*inj/surjective*)
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inj_onto :: ['a => 'b, 'a set] => bool
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inv :: ('a => 'b) => ('b => 'a)
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defs
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inj_def "inj f == ! x y. f(x)=f(y) --> x=y"
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inj_onto_def "inj_onto f A == ! x:A. ! y:A. f(x)=f(y) --> x=y"
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surj_def "surj f == ! y. ? x. y=f(x)"
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inv_def "inv(f::'a=>'b) == (% y. @x. f(x)=y)"
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end
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