Tagged Questions

The Y combinator is a higher-order function that allows a function that does not know its own name to call itself. It is the fundamental basis of recursion.

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Y combinator discussion in “The Little Schemer”

So I've spent a lot of time reading and re-reading the ending of chapter 9 in The Little Schemer, where the applicative Y combinator is developed for the "length" function. I think my confusion boils ...
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Can a lambda function call itself recursively in Python?

A regular function can contain a call to itself in its definition, no problem. I can't figure out how to do it with a lambda function though for the simple reason that the lambda function has no name ...
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How do I define y-combinator without “let rec”?

In almost all examples, a y-combinator in ML-type languages is written like this: let rec y f x = f (y f) x let factorial = y (fun f -> function 0 -> 1 | n -> n * f(n - 1)) This works as ...
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How do I use fix, and how does it work?

I was a bit confused by the documentation for fix (although I think I understand what it's supposed to do now), so I looked at the source code. That left me more confused: fix :: (a -> a) -> a ...
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Have I implemented Y-combinator using C# dynamic, and if I haven't, what is it?

My brain seems to be in masochistic mode, so after being drowned in this, this and this, it wanted to mess around with some DIY in C#. I came up with the following, which I don't think is the ...
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Y-Combinator Practical Example

I've been reading a bit lately about functional programming and I am trying to grok the Y-Combinator. I understand that you can use the Y-Combinator to effectively implement recursion in a language ...
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I couldn't understand the Y-Combinator, so I tried to implement it and ended up with something shorter, which worked. How is that possible?

I couldn't understand the Y-combinator, so I tried to implement a function that enabled recursion without native implementation. After some thinking, I ended up with this: Y = λx.(λv.(x x) v) Which ...
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Defining a stack data structure and its main operations in lambda calculus

I'm trying to define a stack data structure in lambda calculus, using fixed point combinators. I am trying to define two operations, insertion and removal of elements, so, push and pop, but the only ...
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Is it possible to write the Y Combinator in Haskell? It seems like it would have an infinitely recursive type. Y :: f -> b -> c where f :: (f -> b -> c) or something. Even a simple ...
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Fixed point combinators in C++

I'm interested in actual examples of using fixed point combinators (such as the y-combinator in C++. Have you ever used a fixed point combinator with egg or bind in real live code? I found this ...
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Alternative Y combinator definition

I've spent some time wrapping my head around the Y combinator lately, and I've found that it is usually defined (more or less) as follows (this is in C#, but the language of choice isn't important): ...
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Two-layer “Y-style” combinator. Is this common? Does this have an official name?

I've been looking into how languages that forbid use-before-def and don't have mutable cells (no set! or setq) can nonetheless provide recursion. I of course ran across the (famous? infamous?) Y ...
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fixed point combinator in lisp

;; compute the max of a list of integers (define Y (lambda (w) ((lambda (f) (f f)) (lambda (f) (w (lambda (x) ((f f) x))))))) ((Y (lambda (max) (lambda (l) ...