Algebra and Arithmetic of Modular Forms
Publikation: Bog/antologi/afhandling/rapport › Ph.d.-afhandling › Forskning
In [Rus14b] and [Rus14a], we study graded rings of modular forms over
congruence subgroups, with coefficients in subrings A of C, and determine
bounds of the weights of modular forms constituting a minimal set of generators,
as well as on the degree of the generators of the ideal of relations
between them. We give an algorithm that computes the structures of these
rings, and formulate conjectures on the minimal generating weight for modular
forms with coefficients in Z.
We discuss questions of finiteness of systems of Hecke eigenvalues modulo pm, for a prime p and an integer m ≥ 2, in analogy to the classical theory that already exists for m = 1. In joint work with Ian Kiming and Gabor Wiese ([KRW14]), we show that these questions are intimately related to a question of Buzzard regarding the boundedness of the eld of denition of Hecke eigenforms (over Qp), and we formulate precise conjectures. We prove the existence of bounds on the weight ltrations of eigenforms modulo pm, which gives evidence as to the truth of these conjectures. These bounds are made explicit in the case N = 1, p = 2.
We discuss questions of finiteness of systems of Hecke eigenvalues modulo pm, for a prime p and an integer m ≥ 2, in analogy to the classical theory that already exists for m = 1. In joint work with Ian Kiming and Gabor Wiese ([KRW14]), we show that these questions are intimately related to a question of Buzzard regarding the boundedness of the eld of denition of Hecke eigenforms (over Qp), and we formulate precise conjectures. We prove the existence of bounds on the weight ltrations of eigenforms modulo pm, which gives evidence as to the truth of these conjectures. These bounds are made explicit in the case N = 1, p = 2.
Originalsprog | Engelsk |
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Forlag | Department of Mathematical Sciences, Faculty of Science, University of Copenhagen |
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Antal sider | 117 |
ISBN (Trykt) | 978-87-7078-966-0 |
Status | Udgivet - 2014 |
ID: 129734801