Large Abelian Subgroups of Groups of Prime Exponent

Given an abelian variety over a field with a discrete valuation, Grothendieck defined a certain open normal subgroup of the absolute inertia group. This subgroup encodes information on the extensions over which the abelian variety acquires semistable reduction. We study this subgroup, and use it to

The following basic results on infinite locally finite subgroups of a free m-gener-Ž . ## 48 ator Burnside group B m, n of even exponent n, where m ) 1 and n G 2 , n is divisible by 2 9 , are obtained: A clear complete description of all infinite groups that Ž . Ž . are embeddable in B m, n as ma

The paper classifies (up to isomorphism) those groups of prime power order whose derived subgroups have prime order.

In the present paper we give a complete characterisation of subgroup separability of HNN-extensions with finitely generated abelian base group. We are also able to characterise subgroup separability for some families of free-by-cyclic groups and thus answer partially a question of Scott (1987, "Comb