Right groups, left quasigroups, and right heaps

Abstract

A right group is a semigroup (S,·) in which, for every a,b∈ S, there is a unique x∈ S such that a· x=b. In this article, we develop the theory of heaps starting not from groups, but from right groups. We thus get a natural definition of right heap. It is even possible to develop part of the theory starting from a left quasigroup, which is the non-associative analogue of a right group. Our motivation for this study is the investigation of left non-degenerate set-theoretic solutions of the Yang--Baxter equation. Thus, we are led to an analogue of the skew left trusses introduced by T.~Brzeziński.