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Autori principali: Banerjee, Debika, Khurana, Khyati
Natura: Preprint
Pubblicazione: 2023
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Accesso online:https://arxiv.org/abs/2306.12877
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author Banerjee, Debika
Khurana, Khyati
author_facet Banerjee, Debika
Khurana, Khyati
contents Inspired by two entries published in Ramanujan's lost notebook on Page 355, B. C. Berndt et al.\cite{MR3351542} presented Riesz sum identities for Ramanujan entries by introducing the twisted divisor sums. Later, S. Kim \cite{MR3541702} derived analogous results by replacing twisted divisor sums with twisted sums of divisor functions. Recently, the authors \cite{devika2023} of the present paper deduced the Cohen-type identities as well as Voronoï summation formulas associated with these twisted sums of divisor functions. The present paper aims to derive an equivalent version of the results in the previous paper in terms of identities involving finite sums of trigonometric functions and the doubly infinite series. As an application, the authors provide an identity for $r_6(n)$, which is analogous to Hardy's famous result where $r_6(n)$ denotes the number of representations of natural number $n$ as a sum of six squares.
format Preprint
id arxiv_https___arxiv_org_abs_2306_12877
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Trigonometric analogue of the identities associated with twisted sums of divisor functions
Banerjee, Debika
Khurana, Khyati
Number Theory
11M06, 11T24
Inspired by two entries published in Ramanujan's lost notebook on Page 355, B. C. Berndt et al.\cite{MR3351542} presented Riesz sum identities for Ramanujan entries by introducing the twisted divisor sums. Later, S. Kim \cite{MR3541702} derived analogous results by replacing twisted divisor sums with twisted sums of divisor functions. Recently, the authors \cite{devika2023} of the present paper deduced the Cohen-type identities as well as Voronoï summation formulas associated with these twisted sums of divisor functions. The present paper aims to derive an equivalent version of the results in the previous paper in terms of identities involving finite sums of trigonometric functions and the doubly infinite series. As an application, the authors provide an identity for $r_6(n)$, which is analogous to Hardy's famous result where $r_6(n)$ denotes the number of representations of natural number $n$ as a sum of six squares.
title Trigonometric analogue of the identities associated with twisted sums of divisor functions
topic Number Theory
11M06, 11T24
url https://arxiv.org/abs/2306.12877