Abstract
Under relatively mild and natural conditions, we establish integral period relations for the (real or imaginary) quadratic base change of an elliptic cusp form. This answers a conjecture of Hida regarding the congruence ideal controlling the congruences between this base change and other eigenforms which are not base change. As a corollary, we establish the Bloch–Kato conjecture for adjoint modular Galois representations twisted by an even quadratic character. In the odd case, we formulate a conjecture linking the degree two topological period attached to the base change Bianchi modular form, the cotangent complex of the corresponding Hecke algebra and the archimedean regulator attached to some Beilinson–Flach element.
Citation
Jacques Tilouine. Eric Urban. "Integral period relations and congruences." Algebra Number Theory 16 (3) 647 - 695, 2022. https://doi.org/10.2140/ant.2022.16.647
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