FP is formally defined as follows:

A binary relation ${\displaystyle P(x,y)}$  is in FP if and only if there is a deterministic polynomial time algorithm that, given ${\displaystyle x}$ , either finds some ${\displaystyle y}$  such that ${\displaystyle P(x,y)}$  holds, or signals that no such ${\displaystyle y}$  exists.

• FNP is the set of binary relations for which there is a polynomial time algorithm that, given x and y, checks whether P(x,y) holds. Just as P and FP are closely related, NP is closely related to FNP. FP = FNP if and only if P = NP.
• Because a machine that uses logarithmic space has at most polynomially many configurations, FL, the set of function problems which can be calculated in logspace, is contained in FP. It is not known whether FL = FP; this is analogous to the problem of determining whether the decision classes P and L are equal.

• Complexity Zoo: FP