Simultaneous inhomogeneous Diophantine approximation on manifolds

Abstract

In 1998, Kleinbock & Margulis established a conjecture of V.G. Sprindzuk in metrical Diophantine approximation (and indeed the stronger Baker-Sprindzuk conjecture). In essence the conjecture stated that the simultaneous homogeneous Diophantine exponent w0( x) = 1/n for almost every point x on a non-degenerate submanifold of n. In this paper the simultaneous inhomogeneous analogue of Sprindzuk's conjecture is established. More precisely, for any `inhomogeneous' vector θ∈n we prove that the simultaneous inhomogeneous Diophantine exponent w0( x, θ)= 1/n for almost every point x on M. The key result is an inhomogeneous transference principle which enables us to deduce that the homogeneous exponent w0( x)=1/n for almost all x∈ if and only if for any θ∈n the inhomogeneous exponent w0( x,θ)=1/n for almost all x∈ . The inhomogeneous transference principle introduced in this paper is an extremely simplified version of that recently discovered in Beresnevich-Velani-new-inhom. Nevertheless, it should be emphasised that the simplified version has the great advantage of bringing to the forefront the main ideas of Beresnevich-Velani-new-inhom while omitting the abstract and technical notions that come with describing the inhomogeneous transference principle in all its glory.