Newton Polygons of Sums on Curves II: Variation in p-adic Families
Abstract
In this article we study the behavior of Newton polygons along Zp-towers of curves. Fix an ordinary curve X over a finite field Fq of characteristic p. By a Zp-tower X∞/X we mean a tower of covers … X2 X1 X with Gal(Xn/X) Z/pnZ. We show that if the ramification along the tower is sufficiently moderate, then the slopes of the Newton polygon of Xn are equidistributed in the interval [0,1] as n tends to ∞. Under a stronger congruence assumption on the ramification invariants, we completely determine the slopes of the Newton polygon of each curve. This is the first result towards `regularity' in Newton polygon behavior for Zp-towers over higher genus curves. We also obtain similar results for Zp-towers twisted by a generic tame character.
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