This simultaneously captures the concept of a product of sets, posets, groups, topological spaces etc. In addition, like any universal construction, this characterization does not differentiate between isomorphic versions of the product, thus allowing one to abstract away from an arbitrary, specific construction.
Given a pair of objects and in a category , the product of and is an object along with a pair of morphisms and satisfying the following universal condition:
Given any other object and morphisms and there is a unique morphism such that and .