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Continuum theory, point-set topology, spaces with algebraic structure, foundations, dimension theory, local and global properties.

2 votes

Under what general conditions is the set $S := \left\{\int_{X}v(x)\pi(x)\,\mathrm{d}P(x) \mi...

I guess that if $v$ is $P$-integrable then the answer is positive, and actually the set is compact. Indeed, what you are looking for in this case is the compactness of the Aumann integral of the measu …
Martin Väth's user avatar
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2 votes

What is your favorite proof of Tychonoff's Theorem?

Late to the party, but I think still worth mentioning as it seems to be relatively unknown: The “simple proof” given by D, G. Wright is particularly nice, because It uses only the definition of compa …
8 votes
Accepted

Homotopy type of the Hausdorff metric

In J. Andres, M. Väth, Calculation of Lefschetz and Nielsen Numbers in Hyperspaces for Fractals and Dynamical Systems, Proc. Amer. Math. Soc. 135 (2007), 479-487, it was shown (esssentially, the resul …
Martin Väth's user avatar
  • 1,869
1 vote
Accepted

Continuity of Kakutani fixed points

I assume that you mean that $F$ is upper semicontinuous on the product space. Then in particular (since $X$ is compact, Hausdorff and $F$ has closed values), $F$ has a closed graph. This implies that …
Martin Väth's user avatar
  • 1,869
1 vote

Relative compactness in topological spaces (reference request)

My guess is that even $T_3$ is already sufficient. I do not have access to the monograph Fletcher, Peter and Lindgren, William F., Quasi-uniform spaces, M. Dekker, New York, Basel 1982, in the moment, …
Martin Väth's user avatar
  • 1,869
5 votes

BCT equivalent to DC

Yet another formulation of Blair's proof is in M. Väth, Topological Analysis, DeGruyter 2012.
Martin Väth's user avatar
  • 1,869
2 votes

What do absolute neighborhood retracts look like?

For Euclidean neighborhood retracts, there is the nice characterization of being locally connected (and locally compact). Unfortunately, in the infinite-dimensional case, locally connectedness is nece …
Martin Väth's user avatar
  • 1,869
1 vote
Accepted

Proving neighborhood of a compact product space contains a sub-neighborhood formed by taking...

Algernon's argument seems to need a special case of Tychonoff's theorem to get to the finiteness of the union. Here is an argument which avoids that. Lemma: Let $A\subseteq X$ be compact and $B\subset …
Martin Väth's user avatar
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1 vote

Axiom of Countable Choice and meager sets

What is your definition of meager in (ZF)? Being a countable union of nowhere dense sets? In that case, the given argument about the failure of (UMM) in (ZF) is not clear: It is not obvious (to me) th …
Martin Väth's user avatar
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