Directional p-Adic Littlewood Conjecture for Algebraic Vectors

Abstract

For every vector α∈ n and for every rational approximation ( p,q)∈ n× we can associate the displacement vector qα- p. We focus on algebraic vectors, namely α=(α1,…,αn) such that 1, α1, …, αn span a rank n number field. For these vectors, we investigate the size of their displacements as well as the distribution of their directions. We give a new proof to the result of Bugeaud in YannPAdic saying that algebraic vectors α satisfy the p-adic Littlewood Conjecture. Namely, we prove that equation k ∞ ( k kp )1/n \| k (α1, …, αn) \|∞ = 0. equation Our new proof lets us classify all limiting distributions, with a special weighting, of the sequence of directions of the defects in the -approximations of (α1, …, αn). Each such limiting measure is expressed as the pushforward of an algebraic measure on Xn to the sphere.