Sequential space

In topology and related fields of mathematics, a sequential space is a topological space that satisfies a very weak axiom of countability. Sequential spaces are the most general class of spaces for which sequences suffice to determine the topology.

Every sequential space has countable tightness.

Definitions

Let X be a topological space.

A subset U of X is sequentially open if each sequence (x_n) in X converging to a point of U is eventually in U (i.e. there exists N such that x_n is in U for all n ≥ N.)

A subset F of X is sequentially closed if, whenever (x_n) is a sequence in F converging to x, then x must also be in F.

The complement of a sequentially open set is a sequentially closed set, and vice versa. Every open subset of X is sequentially open and every closed set is sequentially closed. The converses are not generally true.

A sequential space is a space X satisfying one of the following equivalent conditions:

Every sequentially open subset of X is open.

Every sequentially closed subset of X is closed.

This page contains text from Wikipedia, the Free Encyclopedia - https://wn.com/Sequential_space

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Sequential space

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