Split degenerate superelliptic curves and -adic images of inertia
Abstract
Let K be a field with a discrete valuation, and let p and be (possibly equal) primes which are not necessarily different from the residue characteristic. Given a superelliptic curve C : yp = f(x) which has split degenerate reduction over K, with Jacobian denoted by J / K, we describe the action of an element of the inertia group IK on the -adic Tate module T(J) as a product of powers of certain transvections with respect to the -adic Weil pairing and the canonical principal polarization of J. The powers to which the transvections are taken are given by a formula depending entirely on the cluster data of the roots of the defining polynomial f. This result is demonstrated using Mumford's non-archimedean uniformization of the curve C.
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