On a certain divisor function in Number fields

Abstract

The main aim of this paper is to study an analogue of the generalized divisor function in a number field K, namely, σK,α(n). The Dirichlet series associated to this function is ζK(s)ζK(s-α). We give an expression for the Riesz sum associated to σK,α(n), and also extend the validity of this formula by using convergence theorems. As a special case, when K=Q, the Riesz sum formula for the generalized divisor function is obtained, which, in turn, for α=0, gives the Vorono\" summation formula associated to the divisor counting function d(n). We also obtain a big O-estimate for the Riesz sum associated to σK,α(n).

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