Abstract view
Published:1999-09-01
Printed: Sep 1999
Abstract
We give a direct proof that the space of Baire quasi-measures on a
completely regular space (or the space of Borel quasi-measures on a
normal space) is compact Hausdorff. We show that it is possible for
the space of Borel quasi-measures on a non-normal space to be
non-compact. This result also provides an example of a Baire
quasi-measure that has no extension to a Borel quasi-measure. Finally,
we give a concise proof of the Wheeler-Shakmatov theorem, which states
that if $X$ is normal and $\dim(X) \le 1$, then every
quasi-measure on $X$ extends to a measure.
