In mathematics, particularly topology, a G<sub>ô</sub> space is a topological space in which closed sets are in a way âÂÂseparatedâ from their complements using only countably many open sets. A G<sub>ô</sub> space may thus be regarded as a space satisfying a different kind of separation axiom. In fact normal G<sub>ô</sub> spaces are referred to as perfectly normal spaces, and satisfy the strongest of separation axioms.
G<sub>ô</sub> spaces are also called perfect spaces. The term perfect is also used, incompatibly, to refer to a space with no isolated points; see Perfect set.
A countable intersection of open sets in a topological space is called a G<sub>ô</sub> set. Trivially, every open set is a G<sub>ô</sub> set. Dually, a countable union of closed sets is called an F<sub>ÃÂ</sub> set. Trivially, every closed set is an F<sub>ÃÂ</sub> set.
A topological space X is called a G<sub>ô</sub> space if every closed subset of X is a G<sub>ô</sub> set. Dually and equivalently, a G<sub>ô</sub> space is a space in which every open set is an F<sub>ÃÂ</sub> set.