Affiliation:
1. Anhui Normal University
2. Henan University of Science and Technology
Abstract
This paper is to characterize $L$-concavities and $L$-convexities via some derived forms of relations and operators. Specifically, notions of $L$-concave derived internal relation space and $L$-concave derived hull space are introduced. It is proved that the category of $L$-concave derived internal relation spaces and the category of $L$-concave derived hull spaces are isomorphic to the category of $L$-concave spaces. Also, notions of $L$-convex derived enclosed relation space and $L$-convex derived hull space are introduced. It is proved that the category of $L$-convex derived enclosed relation spaces and the category of $L$-convex derived hull spaces are isomorphic to the category of $L$-convex spaces.
Funder
Anhui Educational committee; Anhui Normal University; Henan University of Science and Technology
Subject
Geometry and Topology,Statistics and Probability,Algebra and Number Theory,Analysis
Reference39 articles.
1. [1] S.Z. Bai, Q-convergence of ideas in fuzzy lattices and its applications, Fuzzy Sets Syst.
92 (3), 357-363, 1997.
2. [2] S.Z. Bai, Pre-semi-closed sets and PS-convergence in L-fuzzy topological spaces, J.
Fuzzy Math. 9, 497-509, 2001.
3. [3] F.H. Chen, Y. Zhong and F.G. Shi, M-fuzzifying derived spaces, J. Intel. Fuzzy Syst.
36 (1), 79-89, 2019.
4. [4] J.L. Kelly, General topology, Van Nastrand, New York, 1955.
5. [5] E.Q. Li and F.G. Shi, Some properties of M-fuzzifying convexities induced by Morders,
Fuzzy Sets Syst. 350 (1), 41-54, 2018.
Cited by
1 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献