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Main Authors: Kadyan, Monu, Priya, Singh, Sanjay Kumar
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2504.20916
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author Kadyan, Monu
Priya
Singh, Sanjay Kumar
author_facet Kadyan, Monu
Priya
Singh, Sanjay Kumar
contents Let $G$ be a finite group, and let $x \in G$. Define $[x^G] := \{ y \in G : \langle x^G \rangle = \langle y^G \rangle \}$, where $\langle x^G \rangle$ denotes the normal subgroup of $G$ generated by the conjugacy class of $x$. In this paper, we determine an explicit formula for the eigenvalues of the normal Cayley graph $\text{Cay}(G, [x^G])$. These eigenvalues can be viewed as a generalization of classical Ramanujan's sum in the setting of finite groups. Surprisingly, the formula we derive for the eigenvalues of $\text{Cay}(G, [x^G])$ extends the known formula of classical Ramanujan's sum to the context of finite groups. This generalization not only enrich the theory of Ramanujan's sum but also provide new tools in spectral graph theory, representation theory, and algebraic number theory.
format Preprint
id arxiv_https___arxiv_org_abs_2504_20916
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A generalization of Ramanujan's sum over finite groups
Kadyan, Monu
Priya
Singh, Sanjay Kumar
Number Theory
Combinatorics
20C15, 05C25, 05C50
Let $G$ be a finite group, and let $x \in G$. Define $[x^G] := \{ y \in G : \langle x^G \rangle = \langle y^G \rangle \}$, where $\langle x^G \rangle$ denotes the normal subgroup of $G$ generated by the conjugacy class of $x$. In this paper, we determine an explicit formula for the eigenvalues of the normal Cayley graph $\text{Cay}(G, [x^G])$. These eigenvalues can be viewed as a generalization of classical Ramanujan's sum in the setting of finite groups. Surprisingly, the formula we derive for the eigenvalues of $\text{Cay}(G, [x^G])$ extends the known formula of classical Ramanujan's sum to the context of finite groups. This generalization not only enrich the theory of Ramanujan's sum but also provide new tools in spectral graph theory, representation theory, and algebraic number theory.
title A generalization of Ramanujan's sum over finite groups
topic Number Theory
Combinatorics
20C15, 05C25, 05C50
url https://arxiv.org/abs/2504.20916