Farkas' identities with quartic characters

Abstract

Farkas in Farkas introduced an arithmetic function δ and found an identity involving δ and a sum of divisor function σ'. The first-named author and Raji in Guerzhoy discussed a natural generalization of the identity by introducing a quadratic character modulo a prime p 3 4. In particular, it turns out that, besides the original case p=3 considered by Farkas, an exact analog (in a certain precise sense) of Farkas' identity happens only for p=7. Recently, for quadratic characters of small composite moduli, Williams in Williams found a finite list of identities of similar flavor using different methods. Clearly, if p 3 4, the character is either not quadratic or even. In this paper, we prove that, under certain conditions, no analogs of Farkas' identity exist for even characters. Assuming to be odd quartic, we produce something surprisingly similar to the results from Guerzhoy: exact analogs of Farkas' identity happen exactly for p=5 and 13.