English

Pseudocovering and digital covering spaces

General Topology 2023-09-06 v1

Abstract

The notions of a local (k0,k1)(k_0,k_1)-isomorphism and a weakly local (k0,k1)(k_0,k_1)-isomorphism play crucial roles in developing a digital (k0,k1)(k_0,k_1)-covering space and a pseudo-(k0,k1)(k_0,k_1)-covering space, respectively. In relation to the study of pseudo-(k0,k1)(k_0,k_1)-covering spaces, since there are some works to be refined and improved in the literature, the recent paper \cite{H10} improved and corrected some mistakes occurred in the literature. One of the important things is that the notion of a pseudo-(k0,k1)(k_0,k_1)-covering map in \cite{H6,H9} was revised to be more broadened in \cite{H10}. Thus this new version is proved to be equivalent to a weakly local (k0,k1)(k_0,k_1)-isomorphic surjection \cite{H10}. The present paper contains some works in \cite{H10} and we only deals with kk-connected digital images (X,k)(X, k).

Cite

@article{arxiv.2306.01235,
  title  = {Pseudocovering and digital covering spaces},
  author = {Sang-Eon Han},
  journal= {arXiv preprint arXiv:2306.01235},
  year   = {2023}
}

Comments

Since the paper contains some improvements on covering spaces and pseudocovering spaces, some people can be interesting

R2 v1 2026-06-28T10:54:09.699Z