Subrack lattices of finite solvable and metacyclic groups

Abstract

A group G with conjugation operation is a rack. We call such racks group racks. In this paper we study finite group racks via their subrack lattices. Heckenberger, Shareshian, and Welker proved that the isomorphism type of the subrack lattice of a finite group determines whether the group is solvable. Our first result shows that if G is a finite solvable group and H is a finite group whose subrack lattice is isomorphic to that of G, then H is solvable and the derived length of H has the same derived length as G. Our second result is that if G is a finite metacyclic group and H is a group whose subrack lattice is isomorphic to that of G, then H/Z(H) is metacyclic. As a further application of our analysis of finite metacyclic groups, we answer a question of Heckenberger, Shareshian, and Welker in the affirmative by constructing two finite groups with isomorphic subrack lattices that are not isomorphic as racks.

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