English

The Power Word Problem in Graph Products

Group Theory 2023-01-13 v3 Computational Complexity

Abstract

The power word problem for a group GG asks whether an expression u1x1unxnu_1^{x_1} \cdots u_n^{x_n}, where the uiu_i are words over a finite set of generators of GG and the xix_i binary encoded integers, is equal to the identity of GG. It is a restriction of the compressed word problem, where the input word is represented by a straight-line program (i.e., an algebraic circuit over GG). We start by showing some easy results concerning the power word problem. In particular, the power word problem for a group GG is NC1NC^1-many-one reducible to the power word problem for a finite-index subgroup of GG. For our main result, we consider graph products of groups that do not have elements of order two. We show that the power word problem in a fixed such graph product is AC0AC^0-Turing-reducible to the word problem for the free group F2F_2 and the power word problems of the base groups. Furthermore, we look into the uniform power word problem in a graph product, where the dependence graph and the base groups are part of the input. Given a class of finitely generated groups C\mathcal{C} without order two elements, the uniform power word problem in a graph product can be solved in AC0(C=LUPowWP(C))\mathsf{AC^0(C_=L^{UPowWP(\mathcal{C})})}, where UPowWP(C)UPowWP(\mathcal{C}) denotes the uniform power word problem for groups from the class C\mathcal{C}. As a consequence of our results, the uniform knapsack problem in right-angled Artin groups is NP-complete. The present paper is a combination of the two conference papers. In [StoberW22] and previous iterations of this paper our results on graph products were wrongly stated without the additional assumption that the base groups do not have elements of order two. In the present work we correct this mistake. While we strongly conjecture that the result as stated previously is true, our proof relies on this additional assumption.

Keywords

Cite

@article{arxiv.2201.06543,
  title  = {The Power Word Problem in Graph Products},
  author = {Markus Lohrey and Florian Stober and Armin Weiß},
  journal= {arXiv preprint arXiv:2201.06543},
  year   = {2023}
}

Comments

Version 3 fixes a mistake in the previous versions. There our results on graph products were wrongly stated without the additional assumption that the base groups do not have elements of order two. Version 3 also includes some content from arXiv:1904.08343

R2 v1 2026-06-24T08:52:40.404Z