Rips Induction: Index of the dual lamination of an -tree

Abstract

Let T be a -tree in the boundary of the Outer Space CVN, with dense orbits. The Q-index of T is defined by means of the dual lamination of T. It is a generalisation of the Euler-Poincar\'e index of a foliation on a surface. We prove that the Q-index of T is bounded above by 2N-2, and we study the case of equality. The main tool is to develop the Rips Machine in order to deal with systems of isometries on compact -trees. Combining our results on the -index with results on the classical geometric index of a tree, we obtain a beginning of classification of trees. As a consequence, we give a classification of iwip outer automorphisms of the free group, by discussing the properties of their attracting and repelling trees.