A refined random matrix model for function field L-functions

We propose a refinement of the random matrix model for a certain family of L-functions over Fqu, using techniques that we hope will eventually apply to an arbitrary family of L-functions. This consists of a probability distribution on power series in q^-s which combines properties of the characteristic polynomials of Haar-random unitary matrices and random Euler products over Fqu. The support of our distribution is contained in the intersection of the supports of the two original distributions. The expectations of low-degree polynomials in the coefficients of our series approximate the expectations of the same polynomials in the coefficients of random Euler products, while the expectations of high-degree polynomials approximate the expectations of the same polynomials in the coefficients of the characteristic polynomials of random matrices. Furthermore, the expectations of absolute powers of our series approximate the Conrey-Farmer-Keating-Rubinstein-Snaith/Andrade-Keating prediction for the moments of our family of L-functions.