A representation of integers as functions invented by Alonzo Church, inventor of lambda-calculus. The integer N is represented as a higher-order function which applies a given function N times to a given expression. In the pure lambda-calculus there are no constants but numbers can be represented by Church integers.
church n = c where c f x = if n == 0 then x else c' f (f x) where c' = church (n-1)
unchurch c = c (+1) 0