Counting subrings of the ring Zm × Zn

Abstract

Let m,n∈ N. We represent the additive subgroups of the ring Zm × Zn, which are also (unital) subrings, and deduce explicit formulas for N(s)(m,n) and N(us)(m,n), denoting the number of subrings of the ring Zm × Zn and its unital subrings, respectively. We show that the functions (m,n) N(s)(m,n) and (m,n) N(us)(m,n) are multiplicative, viewed as functions of two variables, and their Dirichlet series can be expressed in terms of the Riemann zeta function. We also establish an asymptotic formula for the sum Σm,n x N(s)(m,n), the error term of which is closely related to the Dirichlet divisor problem.