Statistical regularities of self-intersection counts for geodesics on negatively curved surfaces

Abstract

Let be a compact, negatively curved surface. From the (finite) set of all closed geodesics on of length ≤ L, choose one, say γL, at random and let N (γL) be the number of its self-intersections. It is known that there is a positive constant depending on the metric such that N (γL)/L2 → in probability as L→ ∞. The main results of this paper concern the size of typical fluctuations of N (γL) about L2. It is proved that if the metric has constant curvature -1 then typical fluctuations are of order L, in particular, (N (γL)- L2)/L converges weakly to a nondegenerate probability distribution. In contrast, it is also proved that if the metric has variable negative curvature then fluctuations of N (γL) are of order L3/2, in particular, (N (γL)- L2)/L3/2 converges weakly to a Gaussian distribution. Similar results are proved for generic geodesics, that is, geodesics whose initial tangent vectors are chosen randomly according to normalized Liouville measure.