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

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 H1 is a finitely generated factor-free noncyclic subgroup of the free product G1 * G2 of two finite groups G1, G2, then the WN-coefficient σ(H1) of H1 is rational and can be computed in exponential time in the size of H1. This coefficient σ(H1) is the minimal positive real number such that, for every finitely generated factor-free subgroup H2 of G1 * G2, it is true that r (H1, H2) σ(H1) r(H1) r(H2), where r (H) = ( r (H)-1,0) is the reduced rank of H, r(H) is the rank of H, and r(H1, H2) is the reduced rank of the generalized intersection of H1 and H2. In the case of the free product G1 * G2 of two finite groups G1, G2, it is also proved that there exists a factor-free subgroup H2* = H2*(H1) such that r(H1, H2*) = σ(H1) r(H1) r(H2*), H2* has at most doubly exponential size in the size of H1, and H2* can be constructed in exponential time in the size of H1.