Bounding slopes of p-adic modular forms

Abstract

Let p be prime, N be a positive integer prime to p, and k be an integer. Let Pk(t) be the characteristic series for Atkin's U operator as an endomorphism of p-adic overconvergent modular forms of tame level N and weight k. Motivated by conjectures of Gouvea and Mazur, we strengthen Wan's congruence between coefficients of Pk and Pk' for k' close p-adically to k. For p-1 | 12, N = 1, k = 0, we compute a matrix for U whose entries are coefficients in the power series of a rational function of two variables. We apply this computation to show for p = 3 a parabola below the Newton polygon N0 of P0, which coincides with N0 infinitely often. As a consequence, we find a polygonal curve above N0. This tightest bound on N0 yields the strongest congruences between coefficients of P0 and Pk for k of large 3-adic valuation.