For which 2-adic integers x can Σk xk-1 be defined?

Abstract

Let f(n)=Σk nk-1. In a previous paper, we defined for a p-adic integer x that f(x) is p-definable if lim f(xj) exists in Qp, where xj denotes the mod pj reduction of x. We proved that if p is odd, then -1 is the only element of Zp-N for which f(x) is p-definable. For p=2, we proved that if the 1's in the binary expansion of x are eventually extraordinarily sparse, then f(x) is 2-definable. Here we present some conjectures that f(x) is 2-definable for many more 2-adic integers. We discuss the extent to which we can prove these conjectures.