Densities of eigenspaces of Frobenius and distributions of R-modules

Abstract

For any polynomial p(x) over Fl we determine the asymptotic density of hyperelliptic curves over Fq of genus g for which p(x) divides the characteristic polynomial of Frobenius acting on the l-torsion of the Jacobian, and give an explicit formula for this density. We prove this result as a consequence of more general density theorems for quotients of Tate modules of such curves, viewed as modules over the Frobenius. The proof involves the study of measures on R-modules over arbitrary rings R which are finite Zl-algebras. In particular we prove a result on the convergence of sequences of such measures, which can be applied to the moments computed in recent work of Lipnowski-Tsimerman to obtain the above results. We also extend the random model for finite R-modules proposed in that work to such rings R, and prove several of its properties. Notably the measure obtained is in general not inversely proportional to the size of the automorphism group.