Half-isomorphisms whose inverses are also half-isomorphisms

Abstract

Let (G,*) and (G',·) be groupoids. A bijection f: G → G' is called a half-isomorphism if f(x*y)∈\f(x)· f(y),f(y)· f(x)\, for any x, y ∈ G. A half-isomorphism of a groupoid onto itself is a half-automorphism. A half-isomorphism f is called special if f-1 is also a half-isomorphism. In this paper, necessary and sufficient conditions for the existence of special half-isomorphisms on groupoids and quasigroups are obtained. Furthermore, some examples of non-special half-automorphisms for loops of infinite order are provided.