(* Title: HOL/ex/Comb.thy
ID: $Id$
Author: Lawrence C Paulson
Copyright 1996 University of Cambridge
Combinatory Logic example: the Church-Rosser Theorem
Curiously, combinators do not include free variables.
Example taken from
J. Camilleri and T. F. Melham.
Reasoning with Inductively Defined Relations in the HOL Theorem Prover.
Report 265, University of Cambridge Computer Laboratory, 1992.
*)
Comb = Trancl +
(** Datatype definition of combinators S and K, with infixed application **)
datatype comb = K
| S
| "#" comb comb (infixl 90)
(** Inductive definition of contractions, -1->
and (multi-step) reductions, --->
**)
consts
contract :: "(comb*comb) set"
"-1->" :: [comb,comb] => bool (infixl 50)
"--->" :: [comb,comb] => bool (infixl 50)
translations
"x -1-> y" == "(x,y) : contract"
"x ---> y" == "(x,y) : contract^*"
inductive "contract"
intrs
K "K#x#y -1-> x"
S "S#x#y#z -1-> (x#z)#(y#z)"
Ap1 "x-1->y ==> x#z -1-> y#z"
Ap2 "x-1->y ==> z#x -1-> z#y"
(** Inductive definition of parallel contractions, =1=>
and (multi-step) parallel reductions, ===>
**)
consts
parcontract :: "(comb*comb) set"
"=1=>" :: [comb,comb] => bool (infixl 50)
"===>" :: [comb,comb] => bool (infixl 50)
translations
"x =1=> y" == "(x,y) : parcontract"
"x ===> y" == "(x,y) : parcontract^*"
inductive "parcontract"
intrs
refl "x =1=> x"
K "K#x#y =1=> x"
S "S#x#y#z =1=> (x#z)#(y#z)"
Ap "[| x=1=>y; z=1=>w |] ==> x#z =1=> y#w"
(*Misc definitions*)
constdefs
I :: comb
"I == S#K#K"
(*confluence; Lambda/Commutation treats this more abstractly*)
diamond :: "('a * 'a)set => bool"
"diamond(r) == ALL x y. (x,y):r -->
(ALL y'. (x,y'):r -->
(EX z. (y,z):r & (y',z) : r))"
end