Is the number of subrings of index pe in Zn polynomial in p?

Abstract

It is well-known that for each fixed n and e, the number of subgroups of index pe in Zn is a polynomial in p. Is this true for subrings in Zn of index pe? Let fn(k) denote the number of subrings of index k in Zn. We can define the subring zeta function over Zn to be ζZnR(s) = Σk 1 fn(k)k-s. Is this zeta function uniform? These two questions are closely related. In this paper, we describe what is known about these questions, and we make progress toward answering them in a couple ways. First, we describe the connection between counting subrings of index pe in Zn and counting the solutions to a corresponding set of equations modulo various powers of p. We then show that the number of solutions to certain subsets of these equations is a polynomial in p for any fixed n. On the other hand, we give an example for which the number of solutions to a certain subset of equations is not polynomial. Finally, we give an explicit polynomial formula for the number of `irreducible' subrings of index pn+2 in Zn.