Moments of Artin-Schreier L-functions

We compute moments of $L$-functions associated to the polynomial, odd polynomial and ordinary families of Artin-Schreier covers over $\mathbb{F}_q$, where $q$ is a power of a prime $p$, when the size of the finite field is fixed and the genus of the family goes to infinity. In the polynomial family we compute the $k^{\text{th}}$ moment for a large range of values of $k$, depending on the sizes of $p$ and $q$. We also compute the second moment in absolute value of the polynomial family, obtaining an exact formula with a lower order term, and confirming the unitary symmetry type of the family. For the odd polynomial family, we obtain asymptotic formulas for the first two moments, in agreement with the symplectic random matrix theory model, and identifying a lower order term in the case of the first moment. We finally obtain an asymptotic formula for the first moment in the ordinary family of Artin-Schreier $L$-functions, again explicitly computing a lower order term.