English

Bounding slopes of $p$-adic modular forms

Algebraic Geometry 2007-05-25 v1

Abstract

Let pp be prime, NN be a positive integer prime to pp, and kk be an integer. Let Pk(t)P_k(t) be the characteristic series for Atkin's UU operator as an endomorphism of pp-adic overconvergent modular forms of tame level NN and weight kk. Motivated by conjectures of Gouvea and Mazur, we strengthen Wan's congruence between coefficients of PkP_k and PkP_{k'} for kk' close pp-adically to kk. For p112p-1 | 12, N=1N = 1, k=0k = 0, we compute a matrix for UU whose entries are coefficients in the power series of a rational function of two variables. We apply this computation to show for p=3p = 3 a parabola below the Newton polygon N0N_0 of P0P_0, which coincides with N0N_0 infinitely often. As a consequence, we find a polygonal curve above N0N_0. This tightest bound on N0N_0 yields the strongest congruences between coefficients of P0P_0 and PkP_k for kk of large 3-adic valuation.

Keywords

Cite

@article{arxiv.0705.3614,
  title  = {Bounding slopes of $p$-adic modular forms},
  author = {Lawren Smithline},
  journal= {arXiv preprint arXiv:0705.3614},
  year   = {2007}
}
R2 v1 2026-06-21T08:31:39.948Z