Index realization for automorphisms of free groups

Abstract

For any surface of genus g ≥ 1 and (essentially) any collection of positive integers i1, i2, …, i with i1+·s +i = 4g-4 Masur and Smillie have shown that there exists a pseudo-Anosov homeomorphism h: with precisely singularities S1, …, S in its stable foliation L, such that L has precisely ik+2 separatrices raying out from each Sk. In this paper we prove the analogue of this result for automorphisms of a free group FN, where "pseudo-Anosov homeomorphism" is replaced by "fully irreducible automorphism" and the Gauss-Bonnet equality i1+·s +i = 4g-4 is replaced by the index inequality i1+·s +i ≤ 2N-2 from Gaboriau, Jaeger, Levitt and Lustig.