Conjugacy in fibre products, distortion, and the geometry of cyclic subgroups

Abstract

We investigate the complexity of the conjugacy problem for fibre products in torsion-free hyperbolic groups. Let G be a torsion-free hyperbolic group and let P<G× G be the fibre product associated to an epimorphism G Q. We establish inequalities that relate the conjugator length function of P to the geometry of cyclic subgroups in Q, the Dehn function of Q, the rel-cyclics Dehn function of Q, and the distortion of P in G× G. These estimates provide tools for extending the library of (large) functions that are known to arise as the conjugator length functions of finitely generated and finitely presented groups.