An integral weight realization theorem for subset currents on free groups

Abstract

We prove that if N 2 and α: FN π1() is a marking on FN, then for any integer r 2 and any FN-invariant collection of non-negative integral "weights" associated to all subtrees K of of radius r satisfying some natural "switch" conditions, there exists a finite cyclically reduced folded -graph realizing these weights as numbers of "occurrences" of K in . As an application, we give a new, more direct and explicit, proof of one of the main results of our paper with Nagnibeda KN3 stating that for any N 2 the set of all rational subset currents is dense in the space of subset currents on FN. We also answer one of the questions (Problem 10.11) posed in KN3. Thus we prove that if a nonzero μ∈ has all weights with respect to some marking being integers, then μ is the sum of finitely many "counting" currents corresponding to nontrivial finitely generated subgroups of FN.