Some behaviors of FSZ groups under central products, central quotients, and regular wreath products

Abstract

We show that any group G with a non-FSZm quotient by a central cyclic subgroup also provides a non-FSZm group of order m|G| obtained as a central product of G with a cyclic group. We then construct, for every prime p>3 and j∈N, an FSZpj group F such that there is a central cyclic subgroup A with F/A not FSZpj. We apply these results to regular wreath products to construct an FSZ p-group which is not FSZ+ for any prime p>3. These give the first known examples of FSZ groups that are not FSZ+. We are also able to prove a few partial results concerning the FSZ properties for the Sylow subgroups of symmetric groups. In the appendix we enumerate all non-FSZ groups of order 57.