On certain finiteness questions in the arithmetic of modular forms

Ian Kiming; Nadim Rustom; Gabor Wiese

doi:10.1112/jlms/jdw045

On certain finiteness questions in the arithmetic of modular forms

Ian Kiming, Nadim Rustom, Gabor Wiese

Department of Mathematical Sciences

5 Citations (Scopus)

Abstract

We investigate certain finiteness questions that arise naturally when studying approximations modulo prime powers of $p$-adic Galois representations coming from modular forms. We link these finiteness statements with a question by K. Buzzard concerning $p$-adic coefficient fields of Hecke eigenforms. Specifically, we conjecture that, for fixed $N$, $m$, and prime $p$ with $p$ not dividing $N$, there is only a finite number of reductions modulo $p^m$ of normalized eigenforms on $\Gamma -1(N)$. We consider various variants of our basic finiteness conjecture, prove a weak version of it, and give some numerical evidence.

Original language	English
Journal	Journal of the London Mathematical Society
Volume	94
Issue number	2
Pages (from-to)	479-502
ISSN	0024-6107
DOIs	https://doi.org/10.1112/jlms/jdw045
Publication status	Published - 1 Oct 2016

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N2 - We investigate certain finiteness questions that arise naturally when studying approximations modulo prime powers of $p$-adic Galois representations coming from modular forms. We link these finiteness statements with a question by K. Buzzard concerning $p$-adic coefficient fields of Hecke eigenforms. Specifically, we conjecture that, for fixed $N$, $m$, and prime $p$ with $p$ not dividing $N$, there is only a finite number of reductions modulo $p^m$ of normalized eigenforms on $\Gamma -1(N)$. We consider various variants of our basic finiteness conjecture, prove a weak version of it, and give some numerical evidence.

AB - We investigate certain finiteness questions that arise naturally when studying approximations modulo prime powers of $p$-adic Galois representations coming from modular forms. We link these finiteness statements with a question by K. Buzzard concerning $p$-adic coefficient fields of Hecke eigenforms. Specifically, we conjecture that, for fixed $N$, $m$, and prime $p$ with $p$ not dividing $N$, there is only a finite number of reductions modulo $p^m$ of normalized eigenforms on $\Gamma -1(N)$. We consider various variants of our basic finiteness conjecture, prove a weak version of it, and give some numerical evidence.

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DO - 10.1112/jlms/jdw045

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EP - 502

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On certain finiteness questions in the arithmetic of modular forms

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