Formes modulaires modulo 2 : L'ordre de nilpotence des op\'erateurs de Hecke (version d\'evelopp\'ee)
Abstract
Let = Σm=0∞ q(2m+1)2 ∈ F2[[q]] be the reduction mod 2 of the series. A modular form f modulo 2 of level 1 is a polynomial in . If p is an odd prime, then the Hecke operator Tp transforms f in a modular form Tp(f) which is a polynomial in whose degree is smaller than the degree of f, so that Tp is nilpotent. The order of nilpotence of f is defined as the smallest integer g=g(f) such that, for every family of g odd primes p1,p2,…,pg, the relation Tp1Tp2… Tpg(f)=0 holds. We show how one can compute explicitly g(f); if f is a polynomial of degree d≥slant 1 in , one finds that g(f) < 32 d.
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