I m interested in measures on non-Hausdorff spaces but have not been able to find anything specific beyond the general standard measure theory.
Can anyone please point me to references that focus on non-Hausdorff topological spaces.
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6$\begingroup$ I think your question is too broad. What exactly do you want to study when it comes to (Borel?) measures on not necessarily Hausdorff spaces? $\endgroup$– JakobianCommented Jul 13 at 11:30
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3$\begingroup$ Possibly of interest is the following, but I don't remember whether non-Hausdorff spaces are considered: Richard Curtis Willmott, Hausdorff Measures in Topological Spaces, Ph.D. Dissertation (under Maurice Sion), University of British Columbia, June 1965, vii + 119 pages. See also the end of my answer to the Mathematics Stack Exchange question Metric dimensions properties not in $\mathbb{R}^d$. $\endgroup$– Dave L RenfroCommented Jul 13 at 11:55
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$\begingroup$ @DaveLRenfro Many thanks, I will look it up. $\endgroup$– user3879995Commented Jul 14 at 11:34
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$\begingroup$ @Jakobian I am interested in integration theory and whether some sort of differential calculus is possible on a non-Hausdorff space. $\endgroup$– user3879995Commented Jul 14 at 11:35
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