On the failure of Gorensteinness at weight 1 Eisenstein points of the eigencurve

Abstract

We prove that the cuspidal eigencurve Ccusp is \'etale over the weight space at any classical weight 1 Eisenstein point f and meets two Eisenstein components of the eigencurve C transversally at f. Further, we prove that the local ring of C at f is Cohen--Macaulay but not Gorenstein and compute the Fourier coefficients of a basis of overconvergent weight 1 modular forms lying in the same generalised eigenspace as f. In addition, we prove an R=T theorem for the local ring at f of the closed subspace of C given by the union of Ccusp and one Eisenstein component and prove unconditionally, via a geometric construction of the residue map, that the corresponding congruence ideal is generated by the Kubota--Leopoldt p-adic L-function. Finally we obtain a new proof of the Ferrero--Greenberg Theorem and Gross' formula for the derivative of the p-adic L-function at the trivial zero.