Proof That a Function Continuous For Every Source Topology is Continuous With Respect to the Indiscrete Topology
Theorem
Let
be a family of topologies on a set
and let
be continuous with respect to each topology
Then
is continuous with respect to
Since the indiscrete topology is the intersection of every topology on
is continuous with respect to the indiscrete topology.
Proof
The intersection of any topology is itself a topology.
Let
be any open subset of
so that
Consider
Sinceis continuous with respect to each topology
the set
belongs to eachhence
Henceis continuous with respect to
