Genus growth in Zp-towers of function fields

Abstract

Let K be a function field over a finite field k of characteristic p and let K∞/K be a geometric extension with Galois group Zp. Let Kn be the corresponding subextension with Galois group Z/pnZ and genus gn. In this paper, we give a simple explicit formula gn in terms of an explicit Witt vector construction of the Zp-tower. This formula leads to a tight lower bound on gn which is quadratic in pn. Furthermore, we determine all Zp-towers for which the genus sequence is stable, in the sense that there are a,b,c ∈ Q such that gn=a p2n+b pn +c for n large enough. Such genus stable towers are expected to have strong stable arithmetic properties for their zeta functions. A key technical contribution of this work is a new simplified formula for the Schmid-Witt symbol coming from local class field theory.