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# Vidéo de la semaine

## Post-edited

Balkanova, Olga (Auteur de la Conférence)

Zagier L-functions Cohen’s numbers Kuznetsov formula Symmetric square L-functions Averages of Zagier L-functions Multiple Zeta functions

# Dernières Vidéos

## Post-edited Failure of the Brauer-Manin obstruction for a simply connected fourfold, and an orbifold version of the Mordell theorem

Almost one decade ago, Poonen constructed the first examples of algebraic varieties over global fields for which Skorobogatov’s etale Brauer-Manin obstruction does not explain the failure of the ...

## Post-edited Spectral decompositions and an extension of a theorem of Atzmon: a couple leading to spectral subspaces for Bishop operators

Bishop’s operator arose in the fifties as possible candidates for being counterexamples to the Invariant Subspace Problem. Several authors addressed the problem of finding invariant subspaces for ...

## Post-edited Triality

Duality in projective geometry is a well-known phenomenon in any dimension. On the other hand, geometric triality deals with points and spaces of two different kinds in a sevendimensional projective ...

## Post-edited On ellipsephic integers

The term " ellipsephic " was proposed by Christian Mauduit to denote the integers with missing digits in a given basis. This talk is a survey on several results on the multiplicative properties of ...

## Multi angle Prime numbers with preassigned digits

Bourgain (2015) estimated the number of prime numbers with a proportion $c$ > 0 of preassigned digits in base 2 ($c$ is an absolute constant not specified). We present a generalization of this result ...

## Multi angle Monogenic cubic fields and local obstructions

A number field is monogenic if its ring of integers is generated by a single element. It is conjectured that for any degree d > 2, the proportion of degree d number fields which are monogenic is 0. ...

## Multi angle On Epstein's zeta function and related random functions

In this talk I will discuss questions concerning the asymptotic behavior of the Epstein zeta function $E_{n}\left ( L, s \right )$ in the limit of large dimension $n$. In particular I will be ...

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