Regular capacities on metrizable spaces
Keywords:
regular capacity, $\omega$-smoothness, $\tau$-smoothness, Hausdorff metric, complete metric space, separable space
Published online:
2014-07-15
Abstract
It is proved that for a (not necessarily compact) metric space: the metrics on the space of capacities in the sense of Zarichnyi and Prokhorov are equal; completeness of the space of capacities is equivalent to completeness of the original space. It is shown that for the capacities on metrizable spaces the properties of $\omega$-smoothness and of $\tau$-smoothness are equivalent precisely on the separable spaces, and the properties of $\omega$-smoothness and of regularity w.r.t. some (then w.r.t. any) admissible metric are equivalent precisely on the compact spaces.
How to Cite
(1)
Cherkovskyi T. Regular Capacities on Metrizable Spaces. Carpathian Math. Publ. 2014, 6 (1), 166-176.
