Preston Wake, Carl Wang-Erickson
Published 2018-04-17Version 1
We use pseudodeformation theory to study the analogue of Mazur's Eisenstein ideal with certain squarefree levels. Given a prime number $p>3$ and a squarefree number $N$ satisfying certain conditions, we study the Eisenstein part of the $p$-adic Hecke algebra for $\Gamma_0(N)$, and show that it is a local complete intersection and isomorphic to a pseudodeformation ring. We also show that in certain cases, the Eisenstein ideal is not principal and that the cuspidal quotient of the Hecke algebra is not Gorenstein. As a corollary, we prove that "multiplicity one" fails for the modular Jacobian in these cases. In a particular case, this proves a conjecture of Ribet.
On the Mazur--Tate conjecture for prime conductor and Mazur's Eisenstein ideal
Reflective automorphic forms on lattices of squarefree level
Newforms of half-integral weight: the minus space of S_{k+1/2}(Γ_0(8M))
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