Abstract
In this paper, we define uniformities and topologies as relators and show the equivalences of these definitions with the classical ones. For this, we summarize the essential properties of relators, using their theory from earlier works of Á. Száz.Moreover, we prove implications between important topological properties of relators and disprove others. Finally, we show that our earlier analogous definition [G. Pataki, Investigation of proximal spaces using relators, Axioms 10, no. 3 (2021): 143.] for uniformly and proximally filtered property is equivalent to the topological one.At the end of this paper, uniformities and topologies are defined in the same way. This will give us new possibilities to compare these and other topological structures.
Publisher
Universitat Politecnica de Valencia
Reference17 articles.
1. N. Bourbaki, Topologie Générale, Herman, Paris (1953).
2. S. A. Davis, Indexed systems of neighborhoods for general topological spaces, Amer. Math. Monthly 68 (1961), 886-893.
3. https://doi.org/10.1080/00029890.1961.11989785
4. L. Nachbin, Topology and order, D. Van Nostrand (Princetown, 1965).
5. H. Nakano and K. Nakano, Connector theory, Pacific J. Math. 56 (1975), 195-213.
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