Linear programming and the intersection of free subgroups in free products of groups

TL;DR

This paper applies linear programming to analyze intersections of finitely generated subgroups in free products of finite groups, establishing rational coefficients and algorithms for their computation.

Contribution

It introduces a method to compute the WN-coefficient for subgroup intersections in free products using linear programming, with complexity bounds and explicit subgroup constructions.

Findings

WN-coefficient is rational and computable in exponential time

Existence of a subgroup achieving the maximal intersection ratio

Explicit construction of subgroups with size bounds

Abstract

We study the intersection of finitely generated factor-free subgroups of free products of groups by utilizing the method of linear programming. For example, we prove that if $H_1$ is a finitely generated factor-free noncyclic subgroup of the free product $G_1 * G_2$ of two finite groups $G_1$, $G_2$, then the WN-coefficient $\sigma(H_1)$ of $H_1$ is rational and can be computed in exponential time in the size of $H_1$. This coefficient $\sigma(H_1)$ is the minimal positive real number such that, for every finitely generated factor-free subgroup $H_2$ of $G_1 * G_2$, it is true that $\bar {\rm r} (H_1, H_2) \le \sigma(H_1) \bar {\rm r}(H_1) \bar {\rm r}(H_2)$, where $\bar{ {\rm r}} (H) = \max ( {\rm r} (H)-1,0)$ is the reduced rank of $H$, ${\rm r}(H)$ is the rank of $H$, and $\bar {\rm r}(H_1, H_2)$ is the reduced rank of the generalized intersection of $H_1$ and $H_2$. In the case of the free product $G_1 * G_2$ of two finite groups $G_1$, $G_2$, it is also proved that there exists a factor-free subgroup $H_2^* = H_2^*(H_1)$ such that $\bar {\rm r}(H_1, H_2^*) = \sigma(H_1) \bar {\rm r}(H_1) \bar {\rm r}(H_2^*)$, $H_2^*$ has at most doubly exponential size in the size of $H_1$, and $H_2^*$ can be constructed in exponential time in the size of $H_1$.