Classes of free group extensions

Abstract

In this paper we identify different classes of free group extension using core graphs. We show that every free group extension H≤ K≤ F has a base B such that the associated pointed graph morphism B(H)B(H) is onto. But if we examine graphs without base points, there is an extension b ≤ b,aba-1 <F\ a,b\ such that for every base of F\ a,b\ the associated graph morphisms are injective.