English

Quadratic Equations in Hyperbolic Groups are NP-complete

Group Theory 2018-08-16 v4

Abstract

We prove that in a torsion-free hyperbolic group Γ\Gamma, the length of the value of each variable in a minimal solution of a quadratic equation Q=1Q=1 is bounded by NQ3N|Q|^3 for an orientable equation, and by NQ4N|Q|^{4} for a non-orientable equation, where Q|Q| is the length of the equation, and the constant NN can be computed. We show that the problem, whether a quadratic equation in Γ\Gamma has a solution, is in NP, and that there is a PSpace algorithm for solving arbitrary equations in Γ\Gamma. If additionally Γ\Gamma 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.

Keywords

Cite

@article{arxiv.1306.0941,
  title  = {Quadratic Equations in Hyperbolic Groups are NP-complete},
  author = {Olga Kharlampovich and Atefeh Mohajeri and Alex Taam and Alina Vdovina},
  journal= {arXiv preprint arXiv:1306.0941},
  year   = {2018}
}

Comments

the paper will appear in the Transactions of the AMS, 2016

R2 v1 2026-06-22T00:28:08.728Z