A generalization of T\'oth identity in the ring of algebraic integers involving a Dirichlet Character

Abstract

The k-dimensional generalized Euler function k(n) is defined to be the number of ordered k-tuples (a1,a2,…, ak) ∈ Nk with 1≤ a1,a2,…, ak ≤ n such that both the product a1a2·s ak and the sum a1+a2+·s+ak are co-prime to n. T\'oth proved that the identity equation* Σa1,a2,…, ak=1 \\ (a1a2·s ak,n)=1\\ (a1+a2+·s+ak,n)=1n (a1+a2+·s+ak-1,n) =k(n)σ0(n), \;\; where σs(n) = Σd nds \;\; holds. equation* This identity can also be viewed as a generalization of Menon's identity. In this article, we generalize this identity to the ring of algebraic integers involving arithmetical functions and Dirichlet characters.

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