On the almost sure spiraling of geodesics in negatively curved manifolds

Abstract

Given a negatively curved geodesic metric space M, we study the statistical asymptotic penetration behavior of (locally) geodesic lines of M in small neighborhoods of points, of closed geodesics, and of other compact (locally) convex subsets of M. We prove Khintchine-type and logarithme law-type results for the spiraling of geodesic lines around these objets. As a consequence in the tree setting, we obtain Diophantine approximation results of elements of non-archimedian local fields by quadratic irrational ones.