Powers in prime bases and a problem on central binomial coefficients

Abstract

It is an open problem whether 2nn is divisible by 4 or 9 for all n>256. In connection with this, we prove that for a fixed uneven m the asymptotic density of k's such that m 2k+12k is 0. To do so we examine numbers of the form αk in base p, where p is a prime and (α, p)=1. For every n and a we find an upper bound on the number of k's less than a such that (αk)p contains less than n digits greater than p2. This is done by showing that every sequence of the form σt, …, σ1,σ0 , where 0≤ σi<p for i≥ 1 and σ0 is in the residue class generated by α modulo p, occurs at specific places in the representation (αk)p as k varies.