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

Betina, Adel; Dimitrov, Mladen

doi:10.48550/arxiv.1907.09422

Cited by 4 publications

(17 citation statements)

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“…There are plenty of examples of weight one classical eigenforms which are irregular at p. Such eigenforms have critical slope. The recent works [BDP18,BD19] studied the geometry of the eigencurve at such points following a new approach, hence deducing some arithmetic properties on trivial zeros of their adoint p-adic L-functions (that is, the Kubota-Leopoldt and Katz p-adic L-functions). In contrast to the results of this paper, the local ring at these irregular weight one eigenforms is never Gorenstein and their associated overconvergent generalised eigenspace contains non-classical padic modular forms; hence the construction of the two-variable p-adic L-function around these points remains an open and challenging question in Iwasawa theory.…”

Section: Families Of P-adic L-functions Through P-irregular Formsmentioning

confidence: 99%

Arithmetic of p-irregular modular forms: families and p-adic L-functions

Betina,

Williams

2020

Preprint

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Let fnew be a classical eigenform of weight ≥ 2 and level N prime to p. We study the arithmetic of fnew and its unique p-stabilisation f when fnew is p-irregular, that is, when its Hecke polynomial at p admits a single repeated root. In particular, we study p-adic weight families through f and its base-change to an imaginary quadratic field F where p splits, and prove that the respective eigencurves are both Gorenstein at f . We use this to construct a two-variable p-adic L-function over a Coleman family through f , and a three-variable p-adic L-function over the base-change of this family to F . We relate the two-and three-variable p-adic L-functions via p-adic Artin formalism. These results are used in work of Xin Wan to prove the Iwasawa Main Conjecture in this case.In an appendix, we prove results towards Hida duality for modular symbols, constructing a pairing between Hecke algebras and families of overconvergent modular symbols and proving that it is non-degenerate locally around any cusp form. This allows us to control the sizes of (classical and Bianchi) Hecke algebras in families.

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Section: Families Of P-adic L-functions Through P-irregular Formsmentioning

confidence: 99%

Arithmetic of p-irregular modular forms: families and p-adic L-functions

Betina,

Williams

2020

Preprint

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“…The question, analogous to the Ferrero-Greenberg Theorem, of whether the trivial zeros of Katz' anti-cyclotomic p-adic Lfunctions are simple, has remained open while being reformulated in terms of certain Iwasawa modules, via the mysterious bridge envisioned by Iwasawa. In [7] we use Hida Theory together with Mazur's Galois Deformations Theory, to show that these trivial zeros are indeed simple, provided that a certain anti-cyclotomic L -invariant does not vanish, as predicted by the Four Exponentials Conjecture in Transcendence Theory.…”

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confidence: 99%

“…This has been the leitmotiv in [8], resp. [7], where the geometry of C at certain p-irregular Eisenstein, resp. CM, weight 1 points is related to trivial zeros of the Kubota-Leopoldt, resp.…”

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“…Here ε K denotes the quadratic Dirichlet character attached to K Q, and Ver denotes the transfer homomorphism. Let f = ∑ n⩾1 a n q n denote the unique p-stabilization of θ ψ (see (7)).…”

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“…Using the resulting q-expansion Principle we prove a perfect Hida duality between the space of Coleman families and the corresponding Hecke algebra. Exploiting this duality and the results of [7] on the local geometry of C at f , allows us in §3 to compute infinitesimally the Fourier coefficients of all families passing through f . The resulting formulas involve p-adic logarithms of algebraic numbers in the field cut out by the projective Galois representation attached to f .…”

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A geometric view on Iwasawa theory

Betina¹,

Dimitrov²

2020

Preprint

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These notes expand on the presentation given by the second author at the Iwasawa 2019 conference in Bordeaux of our joint work on the geometry of the p-adic eigencurve at a weight one CM form f irregular at p, namely its implications in Iwasawa and in Hida theories. Novel features include the determination of • the Fourier coefficients of the infinitesimal deformations of f along each Hida family containing it in terms of p-adic logarithms of algebraic numbers.• the "mysterious" cross-ratios of the ordinary filtrations of the Hida families containing f .

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Fourier coefficients of the overconvergent generalized eigenform associated to a CM form

Hsu

2020

Int. J. Number Theory

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Let f be a modular form with complex multiplication. If f has critical slope, then Coleman's classicality theorem implies that there is a padic overconvergent generalized Hecke eigenform with the same Hecke eigenvalues as f . We give a formula for the Fourier coefficiets of this generalized Hecke eigenform. We also investigate the dimension of the generalized Hecke eigenspace of p-adic overconvergent forms containing f .

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

Cited by 4 publications

References 21 publications

Arithmetic of p-irregular modular forms: families and p-adic L-functions

Arithmetic of p-irregular modular forms: families and p-adic L-functions

A geometric view on Iwasawa theory

Fourier coefficients of the overconvergent generalized eigenform associated to a CM form

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