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I´m quite new to lambda-calculus and I´m trying to do the following exercise, but I´m not able to resolve it.

uncurry(curry E) = E

Could anyone help me?

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closed as not a real question by Jan Dvorak, Eng.Fouad, Peter DeWeese, jv42, jadarnel27 Feb 14 '13 at 15:26

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

up vote 2 down vote accepted

assuming the following definions (you need to check if those match you definitions)

// creates a pair of two values
pair    := λx.λy.λf. fxy
// selects the first element of the pair     
first   := λp. p(λx.λy. x)
// selects the second element of the pair                     
second  := λp. p(λx.λy. y)
// currys f
curry   := λf.λx.λy . f (pair x y)
// uncurrys f
uncurry := λf.λp . f (first p) (second p)

you show

uncurry(curry E) = E

by inserting the definitions above into curry and uncurry in

uncurry(curry E)

which leads to

(λf.λp . f (first p) (second p)) ( (λf.λx.λy . f (pair x y)) E)

Then you reduce the term above using the reduction rules of the lambda-caluclus, namely using:

  • α-conversion: changing bound variables
  • β-reduction: applying functions to their arguments

which should lead to


if you write down each reduction step, you have proven that

uncurry(curry E) = E

here a sketch how it should look like:

uncurry(curry E) = // by curry-, uncurry-definion
(λf.λp . f (first p) (second p)) ( (λf.λx.λy . f (pair x y)) E) = // by pair-definiton
(λf.λp . f (first p) (second p)) ( (λf.λx.λy . f (λx.λy.λf. fxy x y)) E) = // 2 alpha-conversions
(λf.λp . f (first p) (second p)) ( (λf.λx.λy . f (λa.λb.λf. fab x y)) E) = // 2 beta-reductions
(λf.λp . f (first p) (second p)) ( (λf.λx.λy . f (λf. fxy)) E) = // ...

... = // β-reduction
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the definitions match but I think that I´m failing on some reduction step. could you write down all the steps? thank you! – ikerexxe Feb 14 '13 at 16:23
I think that's the point of the exercise. – Marco Träger Feb 14 '13 at 17:11
Is it well that way? uncurry (curry E) = λf.λp . f (first p) (second p) ( λf.λx.λy . f (pair xy) E) = λf.λp . f (first p) (second p) ( λx.λy.E (pair xy) ) = λf.λp . f (first p) (second p) E = λp . E (first p) (second p) = E – ikerexxe Feb 14 '13 at 20:22
first of all: I had some bracket misses around the 'functions', I added them. They were the reasons of your odd reductions. theirfore: uncurry (curry E) = (λf.λp . f (first p) (second p)) ( λf.λx.λy . f (pair xy) E) = (λf.λp . f (first p) (second p)) ( λx.λy.E (pair xy) ) = λp . ( λx.λy.E (pair xy) ) (first p) (second p) = λp . E (pair (first p) (second p) ) = **then insert the definition of pair, first and second and the rest should cancel – Marco Träger Feb 15 '13 at 0:34
I think I´m doing it the wrong way λp . E (λxyf . fxy ((λo . oT) p) ((λo . oF) p) ) = λp . E (λxyf . fxy ((λo . o(λx.λy . x)) p) ((λo . o(λx.λy . y)) p) ) = λp . E (λxyf . fxy (p (λx.λy . x)) (p (λx.λy . y))) = λp . E (λf . f(p (λx.λy . x))(p (λx.λy . y))) = λp . E (λf . fpp) and now what? – ikerexxe Feb 15 '13 at 10:56

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