On the intersection of free subgroups in free products of groups
Abstract
Let (Gi | i in I) be a family of groups, let F be a free group, and let G = F *(*I Gi), the free product of F and all the Gi. Let FF denote the set of all finitely generated subgroups H of G which have the property that, for each g in G and each i in I, H Gig = 1. By the Kurosh Subgroup Theorem, every element of FF is a free group. For each free group H, the reduced rank of H is defined as r(H) = maxrank(H) -1, 0 in ∞ ⊂eq [0,∞]. To avoid the vacuous case, we make the additional assumption that FF contains a non-cyclic group, and we define sigma := supr(H K)/(r(H)r(K)) : H, K in FF and r(H)r(K) 0, sigma in [1,∞]. We are interested in precise bounds for sigma. In the special case where I is empty, Hanna Neumann proved that sigma in [1,2], and conjectured that sigma = 1; almost fifty years later, this interval has not been reduced. With the understanding that ∞/(∞ -2) = 1, we define theta := max|L|/(|L|-2) : L is a subgroup of G and |L| > 2, theta in [1,3]. Generalizing Hanna Neumann's theorem, we prove that sigma in [theta, 2 theta], and, moreover, sigma = 2 theta if G has 2-torsion. Since sigma is finite, FF is closed under finite intersections. Generalizing Hanna Neumann's conjecture, we conjecture that sigma = theta whenever G does not have 2-torsion.
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