Let G (g; x ):= Sigma(n <= x) g(n) be the summatory function of an arithmetical function g (n) . In this paper, we prove that we can write weighted averages of an arbitrary fixed number N of arithmetical functions g(j) (n), j is an element of {1 , ..., N } as an integral involving the convolution (in the sense of Laplace) of G(j)(x) , j is an element of{1, ... , N} . Furthermore, we prove an identity that allows us to obtain known results about averages of arithmetical functions in a very simple and natural way, and overcome some technical limitations for some well-known problems.
Laplace convolutions of weighted averages of arithmetical functions / Cantarini, M.; Gambini, A.; Zaccagnini, A.. - In: FORUM MATHEMATICUM. - ISSN 0933-7741. - 37:2(2025), pp. 515-533. [10.1515/forum-2023-0259]
Laplace convolutions of weighted averages of arithmetical functions
Cantarini M.;Gambini A.
;Zaccagnini A.
2025-01-01
Abstract
Let G (g; x ):= Sigma(n <= x) g(n) be the summatory function of an arithmetical function g (n) . In this paper, we prove that we can write weighted averages of an arbitrary fixed number N of arithmetical functions g(j) (n), j is an element of {1 , ..., N } as an integral involving the convolution (in the sense of Laplace) of G(j)(x) , j is an element of{1, ... , N} . Furthermore, we prove an identity that allows us to obtain known results about averages of arithmetical functions in a very simple and natural way, and overcome some technical limitations for some well-known problems.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
