Ramification of the eigencurve at classical RM points

Abstract

J.Bella\"iche and M.Dimitrov have shown that the p-adic eigencurve is smooth but not etale over the weight space at p-regular theta series attached to a character of a real quadratic field F in which p splits. We proof in this paper the existence of an isomorphism between the subring of the completed local ring of the eigencurve at these points fixed by the Atkin-Lehner involution and an universal ring representing a pseudo-deformation problem, and one gives also a precise criterion for which the ramification index is exactly 2. We finish this paper by proving the smoothness of the nearly ordinary and ordinary Hecke algebras for Hilbert modular forms over F at the cuspidal-overconvergent Eisenstein points which are the base change lift for GL(2)/F of these theta series.