Khintchine's theorem and Diophantine approximation on manifolds

Abstract

In this paper we initiate a new approach to studying approximations by rational points to points on smooth submanifolds of Rn. Our main result is a convergence Khintchine type theorem for arbitrary nondegenerate submanifolds of Rn, which resolves a longstanding problem in the theory of Diophantine approximation. Furthermore, we refine this result using Hausdorff s-measures and consequently obtain the exact value of the Hausdorff dimension of τ-well approximable points lying on any nondegenerate submanifold for a range of Diophantine exponents τ close to 1/n. Our approach uses geometric and dynamical ideas together with a new technique of `generic and special parts'. In particular, we establish sharp upper bounds for the number of rational points of bounded height lying near the generic part of a non-degenerate manifold. In turn, we give an explicit exponentially small bound for the measure of the special part of the manifold. The latter uses a result of Bernik, Kleinbock and Margulis.