A selection theorem for set-valued maps into normally supercompact spaces
Abstract
The following selection theorem is established:\\ Let be a compactum possessing a binary normal subbase for its closed subsets. Then every set-valued -continuous map with closed -convex values, where is an arbitrary space, has a continuous single-valued selection. More generally, if is closed and any map from to is continuously extendable to a map from to , then every selection for can be extended to a selection for . This theorem implies that if is a -metrizable (resp., -metrizable and connected) compactum with a normal binary closed subbase , then every open -convex surjection is a zero-soft (resp., soft) map. Our results provide some generalizations and specifications of Ivanov's results (see \cite{i1}, \cite{i2}, \cite{i3}) concerning superextensions of -metrizable compacta.
Cite
@article{arxiv.1311.0476,
title = {A selection theorem for set-valued maps into normally supercompact spaces},
author = {Vesko Valov},
journal= {arXiv preprint arXiv:1311.0476},
year = {2013}
}
Comments
8 pages