Counting curves, and the stable length of currents

Abstract

Let γ0 be a curve on a surface of genus g and with r boundary components and let π1() X be a discrete and cocompact action on some metric space. We study the asymptotic behavior of the number of curves γ of type γ0 with translation length at most L on X. For example, as an application, we derive that for any finite generating set S of π1() the limit L∞ 1L6g-6+2r\γ of type γ0 with S-translation length L\ exists and is positive. The main new technical tool is that the function which associates to each curve its stable length with respect to the action on X extends to a (unique) continuous and homogenous function on the space of currents. We prove that this is indeed the case for any action of a torsion free hyperbolic group.