Strong topology

In mathematics, a strong topology is a topology which is stronger than some other "default" topology. This term is used to describe different topologies depending on context, and it may refer to:

the final topology on the disjoint union
the topology arising from a norm
the strong operator topology
the strong topology (polar topology), which subsumes all topologies above.

A topology τ is stronger than a topology σ (is a finer topology) if τ contains all the open sets of σ.^[1]

In algebraic geometry, it usually means the topology of an algebraic variety as complex manifold or subspace of complex projective space, as opposed to the Zariski topology (which is rarely even a Hausdorff space).

References

^ Bourbaki, N. (3 August 1998). General Topology: Chapters 1-4. Springer Science & Business Media. p. 29. ISBN 978-3-540-64241-1. Retrieved 20 February 2026.

[Bourbaki1998-1] Bourbaki, N. (3 August 1998). General Topology: Chapters 1-4. Springer Science & Business Media. p. 29. ISBN 978-3-540-64241-1. Retrieved 20 February 2026.

[1]

See also

References