Fucai Lin, Yufan Xie, Ting Wu, Meng Bao
Published 2022-03-21Version 1
In this paper, we introduce the notions of pre-uniform spaces and pre-proximities and investigate some basic properties about them. First, we prove that each pre-uniform pre-topology is regular, and give an example to show that there exists a pre-uniform structure on a finite set such that the pre-uniform pre-topology is not discrete. Moreover, we give three methods of generating (strongly) pre-uniformities, that is, the definition of a pre-base, a family of strongly pre-uniform covers, or a family of strongly pre-uniform pseudometrics. As an application, we show that each strongly pre-topological group is completely regular. Finally, we pose the concept of the pre-proximity on a set and discuss some properties of the pre-proximity.
Basic properties of $X$ for which spaces $C_p(X)$ are distinguished
Some properties of Pre-topological groups
A Generalization of the notion of a $P$-space to proximity spaces
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