English

Fourier coefficients of half-integral weight modular forms modulo ell

Number Theory 2008-02-03 v1

Abstract

For each prime \ell, let |\cdot|_\ell be an extension to \Qˉ\bar \Q of the usual \ell-adic absolute value on \Q\Q. Suppose g(z)=n=0c(n)qnMk+\half(N)g(z) = \sum_{n=0}^\infty c(n)q^n \in M_{k+\half}(N) is an eigenform whose Fourier coefficients are algebraic integers. Under a mild condition, for all but finitely many primes \ell there are infinitely many square-free integers mm for which c(m)=1|c(m)|_\ell = 1. Consequently we obtain indivisibility results for ``algebraic parts'' of central critical values of modular LL-functions and class numbers of imaginary quadratic fields. These results partially answer a conjecture of Kolyvagin regarding Tate-Shafarevich groups of modular elliptic curves. Similar results were obtained earlier by Jochnowitz by a completely different method. Our method uses standard facts about Galois representations attached to modular forms, and pleasantly uncovers surprising Kronecker-style congruences for LL-function values. For example if Δ(z)\Delta(z) is Ramanujan's cusp form and g(z)=n=1c(n)qng(z)=\sum_{n=1}^{\infty}c(n)q^n is the cusp form for which L(ΔD,6)=\fracwithdelims()πD6D5!<Δ(z),Δ(z)><g(z),g(z)>c(D)2,L(\Delta_D,6)=\fracwithdelims(){\pi}{D}^6\frac{\sqrt{D}}{5!}\frac{< \Delta(z),\Delta(z)>} {< g(z),g(z)>}\cdot c(D)^2, for fundamental discriminants D>0,D>0, then for N1N\geq 1 k=c(Nk2)\halfdN(χ1(d)+χ1(N/d))d6(mod61).(0)\sum_{k=-\infty}^\infty c(N-k^2) \equiv \half \sum_{d|N}(\chi_{-1}(d)+\chi_{-1}(N/d))d^6 \pmod {61}. \tag{0}

Keywords

Cite

@article{arxiv.math/9611225,
  title  = {Fourier coefficients of half-integral weight modular forms modulo ell},
  author = {Ken Ono and Christopher Skinner},
  journal= {arXiv preprint arXiv:math/9611225},
  year   = {2008}
}