Realizing Artin-Schreier Covers with Minimal a-numbers in Positive Characteristic

Abstract

Suppose X is a smooth projective connected curve defined over an algebraically closed field of characteristic p>0 and B ⊂ X is a finite, possibly empty, set of points. Booher and Cais determined a lower bound for the a-number of a Z/p Z-cover of X with branch locus B. For odd primes p, in most cases it is not known if this lower bound is realized. In this note, when X is ordinary, we use formal patching to reduce that question to a computational question about a-numbers of Z/pZ-covers of the affine line. As an application, when p=3 or p=5, for any ordinary curve X and any choice of B, we prove that the lower bound is realized for Artin-Schreier covers of X with branch locus B.