Bounding slopes of $p$-adic modular forms
Abstract
Let be prime, be a positive integer prime to , and be an integer. Let be the characteristic series for Atkin's operator as an endomorphism of -adic overconvergent modular forms of tame level and weight . Motivated by conjectures of Gouvea and Mazur, we strengthen Wan's congruence between coefficients of and for close -adically to . For , , , we compute a matrix for whose entries are coefficients in the power series of a rational function of two variables. We apply this computation to show for a parabola below the Newton polygon of , which coincides with infinitely often. As a consequence, we find a polygonal curve above . This tightest bound on yields the strongest congruences between coefficients of and for of large 3-adic valuation.
Cite
@article{arxiv.0705.3614,
title = {Bounding slopes of $p$-adic modular forms},
author = {Lawren Smithline},
journal= {arXiv preprint arXiv:0705.3614},
year = {2007}
}