Asymptotic expansions of weighted prime power counting functions

Abstract

We prove several asymptotic continued fraction expansions of π(x), (x), li(x), Ri(x), and related functions, where π(x) is the prime counting function, (x) = Σk = 1∞ 1kπ([k]x) is the Riemann prime counting function, and Ri(x) = Σk=1∞ μ(k)k li([k]x) is Riemann's approximation to the prime counting function. We also determine asymptotic continued fraction expansions of the function Σp ≤ x ps for all s ∈ C with Re(s) > -1, and of the functions Σax < p ≤ ax+1 1p and Πax < p ≤ ax+1 (1 -1/p)-1 for all real numbers a > 1. We also determine the first few terms of an asymptotic continued fraction expansion of the function π(ax)-π(bx) for a > b > 0. As a corollary of these results, we determine the best rational approximations of the "linearized" verions of these various functions.