Sequence-covering maps on generalized metric spaces
Abstract
Let be a map. is a {\it sequence-covering map}\cite{Si1} if whenever is a convergent sequence in there is a convergent sequence in with each ; is an {\it 1-sequence-covering map}\cite{Ls2} if for each there is such that whenever is a sequence converging to in there is a sequence converging to in with each . In this paper, we mainly discuss the sequence-covering maps on generalized metric spaces, and give an affirmative answer for a question in \cite{LL1} and some related questions, which improve some results in \cite{LL1, Ls4, YP}, respectively. Moreover, we also prove that open and closed maps preserve strongly monotonically monolithity, and closed sequence-covering maps preserve spaces with a -point-discrete -network. Some questions about sequence-covering maps on generalized metric spaces are posed.
Keywords
Cite
@article{arxiv.1106.3806,
title = {Sequence-covering maps on generalized metric spaces},
author = {Fucai Lin and Shou Lin},
journal= {arXiv preprint arXiv:1106.3806},
year = {2011}
}
Comments
13 pages