The eigencurve at crystalline points with scalar Frobenius and Gross-Stark regulators
Abstract
A complete description of the local geometry of the p-adic eigencurve at p-irregular classical weight one cusp forms is given in the cases where the usual R=T methods fall short. As an application, we show that the ordinary p-adic \'etale cohomology group attached to the tower of elliptic modular curves X1(Npr) is not free over the Hecke algebra, when localized at a p-irregular weight one point.
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