ABSTRACT This study introduces a novel fuzzy algebraic structure, termed “convex ordered fuzzy subrings” (), within the framework of “ordered fuzzy rings” (). We provide a rigorous formalization of ‐subrings, ‐ideals, and ‐convex substructures, where denotes a complete lattice equipped with a binary, order‐compatible t‐norm, integrating concepts from convexity theory, fuzzy set theory, and Heyting algebra. We investigate the preservation of convexity and order under ordered fuzzy ring homomorphisms () and their kernels, focusing on convex ‐subrings that are closed under fuzzy addition, multiplication, and additive inverses. These substructures induce ‐convex structures with closure properties under Cartesian products and infima, and their behavior under homomorphisms highlights their algebraic and topological significance. Using an axiomatic framework, we establish conditions on lattice‐valued binary operations necessary to maintain convexity in fuzzy substructures. Illustrative examples, structural analyses, and interconnections are provided to substantiate these results. This work addresses existing theoretical gaps in fuzzification, ordering, convexity, and homomorphic mappings, offering a unified foundation for the study of with potential applications in algebraic analysis, logic, information theory, and soft computing.
Mehmood et al. (Sun,) studied this question.