Fundamental Functor on Hypergroups

Abstract

For a hypergroup (H,) we consider γ, as the smallest equivalence relation on H such that the quotion (H/γ,) is an abelian group. We study some more properties of γ. Initially, it is investigated which subhypergroup the congruence relation modulo is strongly regular on, and its quotient results in an abelian group? This is directly related to the fundamental relation γ, since such subhypergroups must contain Sγ. Then, we examine the functor γ from a categorical perspective and investigate properties such as continuity and cocontinuity concerning it using the decomposition γ=δβ. For this purpose, we define the reduced words on strongly regular hypergroups. This has a direct application in studying how the functor γ affects on the stalks of the sheaves of hypergroups.

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