Scale-valued sets: a minimal framework for generalized set models
Abstract
Many generalized set models have the same basic form: they assign a value to each object, and the main difference lies in the kind of values that are allowed. This paper studies that common form through scale-valued sets (SV-sets), defined as maps , where is a universe, is a parameter set, and is a bounded De Morgan lattice. With a suitable choice of scale, SV-sets include ordinary sets, fuzzy sets, soft sets, bounded multisets, intuitionistic fuzzy sets, -fuzzy sets, and Type-2 fuzzy sets. We study the basic structure of SV-sets. The relation between SV-sets and lattice-valued interval soft sets is also discussed. For complete chains, the SV setting gives a natural topological construction, and for groups, it gives an algebraic structure through SV-subgroups. The applications show how graded suitability and supporting evidence can be kept together in a single model, whereas one-coordinate reductions lose information.
Cite
@article{arxiv.2604.13094,
title = {Scale-valued sets: a minimal framework for generalized set models},
author = {S. Ray},
journal= {arXiv preprint arXiv:2604.13094},
year = {2026}
}
Comments
16 pages 1 figure