A Fuzzy Geometric Study of Equidistant Sets in Fuzzy Metric Space

TL;DR

This paper explores fuzzy equidistant sets in fuzzy metric spaces by redefining fuzzy geometry, analyzing various cases, and providing examples that connect fuzzy and classical concepts.

Contribution

It introduces a new approach to fuzzy equidistant sets using fuzzy geometry, extending classical notions to fuzzy metric spaces with detailed case analysis.

Findings

Fuzzy Hausdorff distance is studied.

Various configurations of fuzzy equidistant sets are analyzed.

Numerical and pictorial examples illustrate the concepts.

Abstract

In this paper, the fuzzy Hausdorff distance is studied, and also the fuzzy equidistant set for two points of a fuzzy metric space is introduced. Here, the fuzzy metric space has been redefined using recently developed fuzzy geometry, and the equidistant sets have been constructed for two different fuzzy points. Different cases for the equidistant sets have been studied, considering two fuzzy points with separate spreads, externally tangent spreads, partially overlapping spreads, internally tangent spreads, fully overlapping spreads, and sets that coincide with the cores of fuzzy points. The proposed construction provides a graded equidistant set that aligns with the classical midset when the metric is precise. Suitable numerical and pictorial examples are given to support the discussions and studies.