On the series expansion of k-free Dirichlet series and its analytical continuation

Abstract

In this article, we develop a k-free zeta Dirichlet series into a Laurent series with a simple pole, and prove a Stieltjes like formula for the expansion coefficients of the regular part. We also investigate another analytical continuation of these series and develop a formula for ζ(1k) for positive integer k≥ 2 in terms of the k-free indicator function.

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