English

The intersection of subgroups in free groups and linear programming

Group Theory 2018-01-03 v2 Discrete Mathematics Optimization and Control

Abstract

We study the intersection of finitely generated subgroups of free groups by utilizing the method of linear programming. We prove that if H1H_1 is a finitely generated subgroup of a free group FF, then the WN-coefficient σ(H1)\sigma(H_1) of H1H_1 is rational and can be computed in deterministic exponential time in the size of H1H_1. This coefficient σ(H1)\sigma(H_1) is the minimal nonnegative real number such that, for every finitely generated subgroup H2H_2 of FF, it is true that rˉ(H1,H2)σ(H1)rˉ(H1)rˉ(H2)\bar {\rm r}(H_1, H_2) \le \sigma(H_1) \bar {\rm r}(H_1) \bar {\rm r}(H_2), where rˉ(H):=max(r(H)1,0)\bar{ {\rm r}} (H) := \max ( {\rm r} (H)-1,0) is the reduced rank of HH, r(H){\rm r} (H) is the rank of HH, and rˉ(H1,H2)\bar {\rm r}(H_1, H_2) is the reduced rank of the generalized intersection of H1H_1 and H2H_2. We also show the existence of a subgroup H2=H2(H1)H_2^* = H_2^*(H_1) of FF such that rˉ(H1,H2)=σ(H1)rˉ(H1)rˉ(H2)\bar {\rm r}(H_1, H_2^*) = \sigma(H_1) \bar {\rm r}(H_1) \bar {\rm r}(H_2^*), the Stallings graph Γ(H2)\Gamma(H_2^*) of H2H_2^* has at most doubly exponential size in the size of H1H_1 and Γ(H2)\Gamma(H_2^*) can be constructed in exponential time in the size of H1H_1.

Keywords

Cite

@article{arxiv.1607.08303,
  title  = {The intersection of subgroups in free groups and linear programming},
  author = {Sergei V. Ivanov},
  journal= {arXiv preprint arXiv:1607.08303},
  year   = {2018}
}

Comments

27 pages, 2 figures. arXiv admin note: text overlap with arXiv:1607.03052

R2 v1 2026-06-22T15:06:14.341Z