Quadratic Equations in Hyperbolic Groups are NP-complete

Abstract

We prove that in a torsion-free hyperbolic group , the length of the value of each variable in a minimal solution of a quadratic equation Q=1 is bounded by N|Q|3 for an orientable equation, and by N|Q|4 for a non-orientable equation, where |Q| is the length of the equation, and the constant N can be computed. We show that the problem, whether a quadratic equation in has a solution, is in NP, and that there is a PSpace algorithm for solving arbitrary equations in . If additionally is non-cyclic, then this problem (of deciding existence of a solution) is NP-complete. We also give a slightly larger bound for minimal solutions of quadratic equations in a toral relatively hyperbolic group.