I found Mike Gordon's Introduction to Functional Programming Notes on the web and I'm trying to work through it. On page 9 there's this question:
Find an example to show that if V1 = V2 , then even if V2 is not free in E1, it is not necessarily the case that: (λ V1 V2 . E ) E1 E2 = E [E1/V1][E2/V2]
I'm guessing that I could say that since V1 and V2 are equal, we could redo it thus:
(λ V2 V1 . E ) E1 E2
and therefore say
(λ V1 . E[E1/V2] ) E2
given the stipulation that V2 is not free in E1. But then we cannot say
because E2 would necessarily have V1 free. Or am I missing something?