Verbal Subgroups of Absolutely Free Groups of Different Ranks

A sufficient condition is obtained for the residual torsion-free nilpotence of certain finitely presented metabelian groups that arise from a matrix representa-Ž . tion developed by Magnus 1939, Ann. of Math. 40, 764᎐768 for metabelian Ž groups. Using this condition and a construction due to Baumsla

We re-cast in a more combinatorial and computational form the topological approach of J. Stallings to the study of subgroups of free groups.  2002 Elsevier Science (USA) Convention 2.6 (Reduced Words and Reduced Paths). Recall that a word w in the alphabet = X ∪ X -1 is said to be freely reduced if

We introduce the notion of a multiplicity-free subgroup of a reductive algebraic group in arbitrary characteristic. This concept already exists in the work of Kramer for compact connected Lie groups. We give a classification of reductive multiplicity-free subgroups, and as a consequence obtain a sim

Let F be a free group of rank n. Denote by Out F its outer automorphism n n group, that is, its automorphism group modulo its inner automorphism group. For arbitrary n, by considering group actions on finite connected graphs, we derived the maximum order of finite abelian subgroups in Out F . Moreov