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
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