Numerical verification of the Stark-Chinburg conjecture for some icosahedral representations.

Jehanne, Arnaud; Roblot, Xavier-Francois; Sands, Jonathan

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Displaying similar documents to “Numerical verification of the Stark-Chinburg conjecture for some icosahedral representations.”

Wildly ramified Galois representations and a generalization of a conjecture of Serre.

Doud, Darrin (2005)

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The Bloch-Kato conjecture on special values of $L$ -functions. A survey of known results

Guido Kings (2003)

Journal de théorie des nombres de Bordeaux

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This paper contains an overview of the known cases of the Bloch-Kato conjecture. It does not attempt to overview the known cases of the Beilinson conjecture and also excludes the Birch and Swinnerton-Dyer point. The paper starts with a brief review of the formulation of the general conjecture. The final part gives a brief sketch of the proofs in the known cases.

A note on the global Langlands conjecture.

Lapid, Erez M. (1998)

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Class groups of abelian fields, and the main conjecture

Cornelius Greither (1992)

Annales de l'institut Fourier

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This first part of this paper gives a proof of the main conjecture of Iwasawa theory for abelian base fields, including the case $p = 2$ , by Kolyvagin’s method of Euler systems. On the way, one obtains a general result on local units modulo circular units. This is then used to deduce theorems on the order of $χ$ -parts of $p$ -class groups of abelian number fields: first for relative class groups of real fields (again including the case $p = 2$ ). As a consequence, a generalization of the Gras conjecture...

On a conjecture concerning minus parts in the style of Gross

C. Greither, Radan Kučera (2008)

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Theoretical evidence in support of the extended abelian rank one Stark conjecture for the base field ℚ

Daniel Vallières (2012)

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Refined theorems of the Birch and Swinnerton-Dyer type

Ki-Seng Tan (1995)

Annales de l'institut Fourier

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In this paper, we generalize the context of the Mazur-Tate conjecture and sharpen, in a certain way, the statement of the conjecture. Our main result will be to establish the truth of a part of these new sharpened conjectures, provided that one assume the truth of the classical Birch and Swinnerton-Dyer conjectures. This is particularly striking in the function field case, where these results can be viewed as being a refinement of the earlier work of Tate and Milne.

Davenport-Hasse relations and an explicit Langlands correspondence, II : twisting conjectures

Colin J. Bushnell, Guy Henniart (2000)

Journal de théorie des nombres de Bordeaux

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Let $F / ℚ_{p}$ be a finite field extension. The Langlands correspondence gives a canonical bijection between the set $𝒢_{F}^{0} (n)$ of equivalence classes of irreducible $n$ -dimensional representations of the Weil group $𝒲_{F}$ of $F$ and the set $𝒜_{F}^{0} (n)$ of equivalence classes of irreducible supercuspidal representations of GL $_{n} (F)$ . This paper is concerned with the case where $n = p^{m}$ . In earlier work, the authors constructed an explicit bijection $π : 𝒢_{F}^{0} (p^{m}) \to 𝒜_{F}^{0} (p^{m})$ using a non-Galois tame base change map. If this tame base change satisfies a certain...

On Tate’s refinement for a conjecture of Gross and its generalization

Noboru Aoki (2004)

Journal de Théorie des Nombres de Bordeaux

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We study Tate’s refinement for a conjecture of Gross on the values of abelian $L$ -function at $s = 0$ and formulate its generalization to arbitrary cyclic extensions. We prove that our generalized conjecture is true in the case of number fields. This in particular implies that Tate’s refinement is true for any number field.

On the distribution of Galois groups. II.

Malle, Gunter (2004)

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On the Collatz conjecture

Sebastian Hebda (2013)

Colloquium Mathematicae

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We propose two conjectures which imply the Collatz conjecture. We give a numerical evidence for the second conjecture.

An update on a few permanent conjectures

Fuzhen Zhang (2016)

Special Matrices

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We review and update on a few conjectures concerning matrix permanent that are easily stated, understood, and accessible to general math audience. They are: Soules permanent-on-top conjecture†, Lieb permanent dominance conjecture, Bapat and Sunder conjecture† on Hadamard product and diagonal entries, Chollet conjecture on Hadamard product, Marcus conjecture on permanent of permanents, and several other conjectures. Some of these conjectures are recently settled; some are still open.We...