A new perspective on the rank of Mazur's Eisenstein Hecke algebra

Abstract

Let N, p ≥ 5 be primes such that N 1 p. We study the rank r of the Hecke algebra that parametrizes modular forms of weight 2 and level N that are Eisenstein modulo p. When r is 2 or 3, we prove that r-1 equals the order of vanishing of the mod-p reduction of a zeta element that interpolates Dirichlet L-values at -1, thereby recovering results of Merel and Lecouturier. This equality can fail in some cases when r ≥ 4, and we provide a heuristic explanation of this failure. Our approach handles all of these cases uniformly by studying the analogous Hecke algebra in level N2. When exactly one of r-1 or the order of vanishing equals 3, we provide precise information about Galois orbits of cuspidal newforms in level N2 that are Eisenstein modulo p.