The Hopfian property for a class of fundamental groups

Utilizing results of Nekrasov and Berkovich we investigate Hadamard property of a certain class of finite groups ᮊ 1998 Academic Press 666

Partially supported by the research funds of Ministero dell'Uni¨ersita e della Ricerca Scientifica e Tecnologica and by Grant 9300856.CT01 of Consiglio Nazionale delle Ricerche.

We prove that if A ª G ª Q is a short exact sequence of groups where G is finitely generated, A and Q are abelian, A is a ‫-ޚ‬torsion Krull dimension one ‫ޚ‬Q-module via conjugation then the FP -Conjecture holds. In general if G is of m type FP and either the extension is split or A is ‫-ޚ‬torsion w

We describe the upper and lower Lie nilpotency index of a modular group algebra ‫ކ‬G of some metabelian group G and apply these results to determine the nilpotency class of the group of units, extending certain results of Shalev without restriction to finite groups. A characterization of modular gro

## dedicated to k. doerk on his 60th birthday Given two subgroups U V of a finite group which are subnormal subgroups of their join U V and a formation , in general it is not true that U V = U V . A formation is said to have the Wielandt property if this equality holds universally. A formation wit