Higher a-numbers in Zp-towers via Counting Lattice Points
Abstract
Booher, Cais, Kramer-Miller and Upton study a class of Zp-tower of curves in characteristic p with ramification controlled by an integer d. In the special case that d divides p-1, they prove a formula for the higher a-numbers of these curves involving the number of lattice points in a complicated region of the plane. Booher and Cais had previously conjectured that for n sufficiently large the higher a-numbers of the nth curve are given by formulae of the form α(n) p2n + β(n) pn + λr(n) n + (n) , where α,β,,λr are periodic functions of n. This is an example of a new kind of Iwasawa theory. We establish this conjecture by carefully studying these lattice points.
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