$L^M$-valued equalities, $L^M$-rough approximation operators and $ML$-graded ditopologies

Year 2017, Volume: 46 Issue: 1, 15 - 32, 01.02.2017

Alexander \v{s}ostak Aleksandrs Elkins

https://izlik.org/JA58LK35ZZ

Abstract

We introduce a certain many-valued generalization of the concept of an $L$-valued equality called an $L^M$-valued equality. Properties of $L^M$-valued equalities are studied and a construction of an $L^M$-valued equality from a pseudo-metric is presented. $L^M$-valued equalities are applied to introduce upper and lower $L^M$-rough approximation operators, which are essentially many-valued generalizations of Z. Pawlak's rough approximation operators and of their fuzzy counterparts. We study properties of these operators and their mutual interrelations. In its turn, $L^M$-rough approximation operators are used to induce topological-type structures, called here $ML$-graded ditopologies.

Keywords

$L^M$-valued equalities , $L^M$-rough approximation operators , $ML$-graded ditopologies

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