Automorphism groups of quandles and related groups

Abstract

In this paper we study different questions concerning automorphisms of quandles. For a conjugation quandle Q= Conj(G) of a group G we determine several subgroups of Aut(Q) and find necessary and sufficient conditions when these subgroups coincide with the whole group Aut(Q). In particular, we prove that Aut( Conj(G))= Z(G) Aut(G) if and only if either Z(G)=1 or G is one of the groups Z2, Z22 or Z3. For a big list of Takasaki quandles T(G) of an abelian group G with 2-torsion we prove that the group of inner automorphisms Inn(T(G)) is a Coxeter group. We study automorphisms of certain extensions of quandles and determine some interesting subgroups of the automorphism groups of these quandles. Also we classify finite quandles Q with 3≤ k-transitive action of Aut(Q).