The Hopfian Property of n-Periodic Products of Groups

Abstract

Let H be a subgroup of a group G. A normal subgroup NH of H is said to be inheritably normal if there is a normal subgroup NG of G such that NH=NG H. It is proved in the paper that a subgroup NGi of a factor Gi of the n-periodic product Πi∈ InGi with nontrivial factors Gi is an inheritably normal subgroup if and only if NGi contains the subgroup Gin. It is also proved that for odd n 665 every nontrivial normal subgroup in a given n-periodic product G=Πi∈ InGi contains the subgroup Gn. It follows that almost all n-periodic products G=G1nG2 are Hopfian, i.e., they are not isomorphic to any of their proper quotient groups. This allows one to construct nonsimple and not residually finite Hopfian groups of bounded exponents.