Abstract We give a complete description of the local geometry of the 𝑝-adic eigencurve at 𝑝-irregular classical weight one cusp forms under the assumption that certain Gross–Stark regulators do not vanish, as predicted by classical conjectures in 𝑝-adic transcendental number theory. We also provide several applications to the Hecke structure of the ordinary 𝑝-adic étale cohomology of towers of modular curves, as well as to Beilinson–Flach elements.
Betina et al. (Thu,) studied this question.
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