1

How do I apply just one beta-reduction to λy.(λx.λy.yx)yz?

The correct answer is λy.(λw.wy)z.

Renaming is allowed only if necessary, and from the answer it is obvious renaming was used.

1 Answer 1

3

Let's first add some parentheses do make the structure more apparent, because maybe that's the reason you got confused:

λy.(λx.λy.yx)yz = λy.(((λx.λy.(yx))y)z)

On the outermost level, there is nothing to be done. But we can do a beta-reduction inside the λy, but first we need to an alpha renaming to avoid capturing the y:

    (λx.λy.(yx))y
--> (λx.λw.(wx))y   (alpha renaming y to w)
--> λw.wy           (beta)

Now putting this into the whole context:

    λy.(λx.λy.yx)yz
--> λy.(λx.λw.(wx))yz   (alpha renaming y to w)
--> λy.(λw.wy)z         (beta)
1
  • 1
    Thank you! Therefore, the key is to assign parenthesis following Left-Left & λx.(as far as possible) rules, before starting beta reduction. Nov 18, 2020 at 21:49

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

Not the answer you're looking for? Browse other questions tagged or ask your own question.