Proof That Union and Intersection of Subsets of a Set X Open in X Are a Topology for X
Theorem
Let
represent a set and
a family of subsets ofsuch that
1.
2. The union of any elements ofis a member of
3. The intersection of any elements ofis a member of
Then if
is a family of subsets ofsuch that
if and only if
thenis a topology on
Proof
Sinceand
Suppose
then
Also
so
This can be extended to any intersection of sets.
Suppose
is a family of sets of
is a family of subsets ofand
Henceis a topology onElements ofare called open sets.
