Iwasawa Theory for p-torsion Class Group Schemes in Characteristic p

Abstract

We investigate a novel geometric Iwasawa theory for Zp-extensions of function fields over a perfect field k of characteristic p>0 by replacing the usual study of p-torsion in class groups with the study of p-torsion class group schemes. That is, if ·s X2 X1 X0 is the tower of curves over k associated to a Zp-extension of function fields totally ramified over a finite non-empty set of places, we investigate the growth of the p-torsion group scheme in the Jacobian of Xn as n→ ∞. By Dieudonn\'e theory, this amounts to studying the first de Rham cohomology groups of Xn equipped with natural actions of Frobenius and of the Cartier operator V. We formulate and test a number of conjectures which predict striking regularity in the k[V]-module structure of the space Mn:=H0(Xn, 1Xn/k) of global regular differential forms as n→ ∞. For example, for each tower in a basic class of Zp-towers we conjecture that the dimension of the kernel of Vr on Mn is given by ar p2n + λr n + cr(n) for all n sufficiently large, where ar, λr are rational constants and cr : Z/mr Z Q is a periodic function, depending on r and the tower. To provide evidence for these conjectures, we collect extensive experimental data based on new and more efficient algorithms for working with differentials on Zp-towers of curves, and we prove our conjectures in the case p=2 and r=1.