Automorphism groups of quandles arising from groups

Abstract

Let G be a group and ∈ (G). Then the set G equipped with the binary operation a*b=(ab-1)b gives a quandle structure on G, denoted by (G, ) and called the generalised Alexander quandle. When G is additive abelian and = -G, then (G, ) is the well-known Takasaki quandle. In this paper, we determine the group of automorphisms and inner automorphisms of Takasaki quandles of abelian groups with no 2-torsion, and Alexander quandles of finite abelian groups with respect to fixed-point free automorphisms. As an application, we prove that if G (Z/p Z)n and is multiplication by a non-trivial unit of Z/p Z, then ((G, )) acts doubly transitively on (G, ). This generalises a recent result of Ferman for quandles of prime order.