Automorphisms of dihedral-like automorphic loops

Abstract

Automorphic loops are loops in which all inner mappings are automorphisms. A large class of automorphic loops is obtained as follows: Let m be a positive even integer, G an abelian group, and α an automorphism of G that satisfies α2=1 if m>2. Then the dihedral-like automorphic loop Dih(m,G,α) is defined on Zm× G by (i,u)(j,v)=(i+j, ((-1)ju+v)αij). We prove that two finite dihedral-like automorphic loops Dih(m,G,α), Dih(m,G,α) are isomorphic if and only if m=m, G=G, and α is conjugate to α in the automorphism group of G. Moreover, for a finite dihedral-like automorphic loop Q we describe the structure of the automorphism group of Q and its subgroup consisting of inner mappings of Q.