An intersection functional on the space of subset currents on a free group

Abstract

Kapovich and Nagnibeda introduced the space S Curr(FN) of subset currents on a free group FN of rank N≥ 2, which can be thought of as a measure-theoretic completion of the set of all conjugacy classes of finitely generated subgroups of FN. We define a product N (H,K) of two finitely generated subgroups H and K of FN by the sum of the reduced rank rk(H gKg-1) over all double cosets HgK\ (g∈ FN), and extend the product N to a continuous symmetric R≥ 0-bilinear functional N S Curr (FN)× S Curr (FN) R≥ 0. We also give an answer to a question presented by Kapovich and Nagnibeda. The definition of N originates in the Strengthened Hanna Neumann Conjecture, which has been proven by Mineyev and can be stated as follows: N (H,K)≤ rk (H) rk (K) holds for any finitely generated subgroups H and K of FN. As a corollary to our theorem, this inequality is generalized to the inequality for subset currents.