Adel Betina scite author profile

Adel Betina

4Publications

57Citation Statements Received

116Citation Statements Given

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115

Affiliations

University of Vienna, University of Sheffield, Universitat Politècnica de Catalunya

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

Betina¹,

Dimitrov²,

Pozzi³

2018

Preprint

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We prove that the cuspidal eigencurve Ccusp is etale over the weight space at any classical weight 1 Eisenstein point f and meets transversally each of the two Eisenstein components of the eigencurve C containing 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 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 its derivative at the trivial zero.

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Geometry of the eigencurve at CM points and trivial zeros of Katz $p$-adic $L$-functions

Betina¹,

Dimitrov²

2019

Preprint

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The primary goal of this paper is to study the geometry of the p-adic eigencurve at a point f corresponding to a weight one theta series θ ψ irregular at p. We show that f belongs to exactly three or four irreducible components and study their mutual congruences.In particular, we show that the congruence ideal of one of the CM components has a simple zero at f if, and only if, a certain L -invariant L-(ψ-) does not vanish. Further, using Roy's Strong Six Exponential Theorem we show that at least one amongst L-(ψ-) and L-(ψ −1 -) is non-zero. Combined with a divisibility proved by Hida and Tilouine, we deduce that the anti-cyclotomic Katz p-adic L-function of ψ-has a simple (trivial) zero at s = 0, if L-(ψ-) is non-zero, which can be seen as an anti-cyclotomic analogue of a result of Ferrero and Greenberg. Finally, we propose a formula for the linear term of the two-variable Katz p-adic L-function of ψ-at s = 0 thus extending a conjecture of Gross.

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Geometry of the eigencurve at CM points and trivial zeros of Katz p-adic L-functions

Betina

Dimitrov

2021

Advances in Mathematics

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On the $p$-adic periods of the modular curve $X(\Gamma _0(p) \cap \Gamma (2))$

Betina

Lecouturier

2018

Trans. Amer. Math. Soc.

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Adel Betina

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

Geometry of the eigencurve at CM points and trivial zeros of Katz $p$-adic $L$-functions

Geometry of the eigencurve at CM points and trivial zeros of Katz p-adic L-functions

On the $p$-adic periods of the modular curve $X(\Gamma _0(p) \cap \Gamma (2))$

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