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I am new to lambda calculus and struggling to prove the following.

SKK and II are beta equivalent.


S = lambda xyz.xz(yz) K = lambda xy.x I = lambda x.x

I tried to beta reduce SKK by opening it up, but got nowhere, it becomes to messy. Dont think SKK can be reduced further without expanding S, K.

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up vote 4 down vote accepted
= (λxyz.xz(yz))KK
→ λz.Kz(Kz)        (in two steps actually, for the two parameters)

= (λxy.x)z
→ λy.z

→ λz.(λy.z)(λy.z)  (again, several steps)
→ λz.z
= I

(You should be able to prove that II → I)

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thanks, didnt strike at all to do this way – khrist safalhai Apr 26 '11 at 8:13

;another approach with fewer steps, first reduce SK to λyz.z;

= (λxyz.xz(yz))KK
→ λyz.Kz(yz) K
→ λyz.(λxy.x)z(yz) K
→ λyz.(λy.z)(yz) K
→ λyz.z K
→ λz.z
= I
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