ASL STEM

Definition

Let (Y, d) be a metric space; let X be a topological space. Given an element f of Y^X, a compact subspace C of X, and a number epsilon greater than 0, let B_C(f, epsilon) denote the set of all elements g of Y^X for which sup{d(f(x), g(x))|x in C} is less than epsilon. The sets B_C(f, epsilon) form a basis for a topology on Y^X. It is called the topology of compact convergence (or sometimes the "topology of uniform convergence on compact sets").

Source: Topology (second edition) by James R. Munkres