On simultaneous rational approximation to a p-adic number and its integral powers, II

Abstract

Let p be a prime number. For a positive integer n and a real number , let λn () denote the supremum of the real numbers λ for which there are infinitely many integer tuples (x0, x1, … , xn) such that | x0 - x1|p, … , | x0 n - xn|p are all less than X-λ - 1, where X is the maximum of |x0|, |x1|, … , |xn|. We establish new results on the Hausdorff dimension of the set of real numbers for which λn () is equal to (or greater than or equal to) a given value.