# Knights of the Lambda Calculus infinity written as lisp code

Knights of the Lambda Calculus logo have infinity written as `(Y F) = (F (Y F))`

is this lisp code the same and is it represent infinity too?

(Y (λ (F) (Y F)))

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in your code, you show `Y` used but not defined. What is its definition? –  Will Ness Oct 19 '13 at 13:23
@WillNess it's Y Combinator. –  jcubic Oct 19 '13 at 15:04
and what is its definition please? do you mean it's the same as in `Y F = F (Y F)`? Because that is not a lambda expression, and you use it inside a lambda expression. Lambda calculus has no definitions, that's why they use capital letter Y to mean it should be substituted with a lambda expression for Y. That also means you shouldn't use capital `F` there, but a regular `f`. –  Will Ness Oct 19 '13 at 15:04
Look at scheme implementation in Rosetta Code in @dsm answer. And my code is not lambda calculus it's lisp code `λ` can be written as `lambda`. –  jcubic Oct 19 '13 at 15:09
@WillNess I didn't define `Y` because it's well known the same as if I write `(! 10)` and didn't define factorial function. –  jcubic Oct 19 '13 at 15:14

by eta contraction your expression `Y (λ f. Y f)` is `Y Y`. Since `Y f` reduces to `f (Y f)`, we get

``````Y Y --> Y (Y Y) --> Y Y (Y (Y Y)) --> Y (Y Y) (Y (Y Y)) --> ...
``````

so it is a divergent lambda term.

`Y f` is not a divergent term in itself. It reduces to `f (Y f)`, where `f` now takes over. If `f` ever uses its argument, and is forced to do so by its caller, only then the chain will continue.

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Y here is a fixed-point combinator. Given a function f, it returns a value x for which x = f(x). When, instead of writing x, we write Y(f), we have Y(f) = f(Y(f)). In the traditional lambda calculus notation, this is (F (Y F)) = (Y F), which is what you see in the image.

Some numerical functions have one or more fixed points. E.g., fixed point of the (positive) square root function, as well as the square function are 1 and 0.. Some numerical functions, e.g., f(x) → x+1 doesn't have a fixed point. In some formalisms, including the untyped lambda calculus, every function has a fixed point.

This particular fixed-point operator is the Y-combinator, and is described in more detail in various places, including the Wikipedia article linked above. Fixed point operators are important because, among other things, they allow recursive functions to be defined in formalisms such as the untyped lambda calculus.

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