The discussion revolves around proving a relationship between two topologies on a set X, specifically that if (X,t) is Hausdorff and (X,T) is Compact with t a subset of T, then t must equal T. Participants explore the implications of compactness and the Hausdorff property in topology.
The discussion is active, with participants providing insights and clarifications regarding the properties of compact and Hausdorff spaces. Some have made progress in their reasoning, while others are still seeking key observations to advance their understanding of the proof.
There are mentions of specific examples and theorems that relate to the properties of compact and Hausdorff spaces, as well as the need to establish relationships between open and closed sets under the given topologies. Participants note the importance of proving that t equals T without assuming additional properties of the topologies beyond what is given.
This is certainly not true. Every compact subset of a Hausdorff space is closed but the converse is not true. For example, in the real numbers with the usual topology, [0,\infty) is a closed set but is not compact.economist13 said:Homework Statement
Let X be a set and t & T be two topologies on X. Prove that if (X,t) is Hausdorff and (X, T) is Compact with t a subset of T, then t=T. (i.e., T is a subset of t).
The Attempt at a Solution
potentially useful theorem: (X,t) Hausdorff implies that each subset F is compact iff it is closed.
I don't really know which direction to go from here...
HallsofIvy said:This is certainly not true. Every compact subset of a Hausdorff space is closed but the converse is not true. For example, in the real numbers with the usual topology, [0,\infty) is a closed set but is not compact.
economist13 said:My bad, I forgot to mention that X is Hausdorff and compact.
economist13 said:actually it is enough to know that if t is a subset of T and X is compact with T, then it is compact with t.
Choose any open covering for (X, t), {Ui} for i in some index I, then it is also and open of (X,T), since t a subset of T. Since (X,T) compact, there is a finite open cover, {Ui} i=1,...,n. But each of those Ui is also in (X,t) thus (X,t) is compact.
It is also not too difficult to show that (X,T) is Hausdorff. Choose x and y not equal in X. Then since (X, t) is Hausdorff, there exist M and N, both open, such that they are disjoint and contain x and y, respectively. Since t a subset of T, then M and N are in T, thus (X,T) also has the Hausdorff property.
So in neither case do we need T=t.
additionally, my edit was simply w.r.t the theorem that X compact and Hausdorff then subset F is compact iff F is closed.
Dick said:Now you are getting someplace. You are actually proving things. But what you are supposed to prove is that t=T. How do you prove that? You want to show an open set O in T is also in t.
economist13 said:I know what I need to show to prove that T=t. i.e., O in T => O in t, since we are given t a subset of T. I just don't see how to do this with the information given.
I guess I should have been more clear with what I need help with. I just am missing whatever key observation I need to make to achieve any useful progress.
EDIT: How's this, since (X,t) compact & Hausdorff (shown above) and (X,T) compact & Hausdorff, then i:(X,T)->(X,t), where i(x)=x, is a homeomorphism. Thus for each open set O in T, i(O) is in t. But i(O)=O since i is the identity function. Thus T=t.
Thanks VeeEight, Dick and HallsofIvy