Fixed-point combinator

In combinatory logic for computer science, a fixed-point combinator (or fixpoint combinator),^[1]^: p.26 is a higher-order function (i.e. a function which takes a function as argument) that returns some fixed point (a value that is mapped to itself) of its argument function, if one exists.

Formally, if ${\textrm {fix}}$ is a fixed-point combinator and the function $f$ has one or more fixed points, then ${\textrm {fix}}\ f$ is one of these fixed points, i.e.

f\ ({\textrm {fix}}\ f)={\textrm {fix}}\ f\ .

Fixed-point combinators can be defined in the lambda calculus and in functional programming languages and provide a means to allow for recursive definitions.

^ Peyton Jones, Simon L. (1987). The Implementation of Functional Programming (PDF). Prentice Hall International.

[SPJ1987-1] Peyton Jones, Simon L. (1987). The Implementation of Functional Programming (PDF). Prentice Hall International.

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