Abstract
AbstractComputability theorists have introduced multiple hierarchies to measure the complexity of sets of natural numbers. The Kleene Hierarchy classifies sets according to the first-order complexity of their defining formulas. The Ershov Hierarchy classifies limit computable sets with respect to the number of mistakes that are needed to approximate them. Biacino and Gerla extended the Kleene Hierarchy to the realm of fuzzy sets, whose membership functions range in a complete lattice. In this paper, we combine the Ershov Hierarchy and fuzzy set theory, by introducing and investigating the Fuzzy Ershov Hierarchy.
Funder
Ministry of Science and Higher Education of the Russian Federation
Nazarbayev University Faculty Development Competitive Research Grants
Austrian Science Fund
Publisher
Springer Science and Business Media LLC
Subject
General Social Sciences,Philosophy