A generalization of Menon's identity with Dirichlet characters

Abstract

The classical Menon's identity [7] states that equation*oldbegin1 Σa∈ Zn (a -1,n)=(n) σ0 (n), equation* where for a positive integer n, Zn is the group of units of the ring Zn= Z/n Z, (\ ,\ ) represents the greatest common divisor, (n) is the Euler's totient function and σk (n) =Σd|n dk is the divisor function. In this paper, we generalize Menon's identity with Dirichlet characters in the following way: equation* Σa∈ Zn b1, ..., bk∈ Zn (a-1,b1, ..., bk, n)(a)=(n)σk(nd), equation* where k is a non-negative integer and is a Dirichlet character modulo n whose conductor is d. Our result can be viewed as an extension of Zhao and Cao's result [16] to k>0. It can also be viewed as an extension of Sury's result [12] to Dirichlet characters.