A residual property of free groups

We prove that a free product of infinitely many finitely generated, torsion free, nilpotent groups amalgamating isolated cycles is residually finite-p for all primes p so long as the number of generators and nilpotency class of the factors are both bounded. Examples illustrate that if we remove any

We derive necessary and sufficient conditions for generalized free products of free groups or finitely generated torsion-free nilpotent groups, amalgamating a cycle, to be residually finite p-groups. Using this, we characterize the residually finite p-group property of tree products of finitely gene

Given a pseudovariety C, it is proved that a residually-C superstable group G has a finite series In particular, a residually finite superstable group is solvable-by-finite, and if it is ω-stable, then it is nilpotent-by-finite. Given a finitely generated group G, we show that if G is ω-stable and

We find a necessary and sufficient condition for an amalgamated free product of arbitrarily many isomorphic residually \(p\)-finite groups to be residually \(p\)-finite. We also prove that this condition is sufficient for a free product of any finite number of residually \(p\)-finite groups, amalgam

## Ä 4 A group G is fully residually free provided to every finite set S ; G \_ 1 of non-trivial elements of G there is a free group F and an epimorphism h : G is n-free provided every subgroup of G generated by n or fewer distinct