On a generalization of fuzzy algebras and congruences

In this paper, ÿrst, we prove that the set of all fuzzy congruences on a regular semigroup contained in H forms a modular lattice, where H is the characteristic function of H and H is the H -equivalent relation on the semigroup. Secondly, we introduce idempotent separating fuzzy congruence on a semi

The definition of a fuzzy reflexive relation )~ on a set S is generalized by demanding that )4x, y) <<. )~(z, z) > 0 for all x ¢ y, z ~ S. Fuzzy equivalence relations on a given set and fuzzy congruences on a given groupoid are studied under this generalized setting.

We show that it is decidable for any given ground term rewrite systems R and S if there is a ground term rewrite system U such that If the answer is yes, then we can e ectively construct such a ground term rewrite system U . In other words, for any given ÿnitely generated congruences and over the t

The aim of this paper is to introduce fuzzy submodule and fuzzy congruence of an R-module (Near-ring module), to obtain the correspondence between fuzzy congruences and fuzzy submodules of an R-module, to deÿne quotient R-module of an R-module over a fuzzy submodule and to obtain correspondence betw