On some generalizations of mean value theorems for arithmetic functions of two variables
Abstract
Let f: N2 C be an arithmetic function of two variables. We study the existence of the limit: \[ x ∞ 1x2 ( x)k-1 Σn1 , n2 x f (n1, n2) \] where k is a fixed positive integer. Moreover, we express this limit as an infinite product over all prime numbers in the case that f is a multiplicative function of two variables. This study is a generalization of Cohen-van der Corput's results to the case of two variables.
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