Complete Description of Measures Corresponding to Abelian Varieties over Finite Fields

We study probability measures corresponding to families of abelian varieties over a finite field. These measures play an important role in the Tsfasman- Vladuts theory of asymptotic zeta-functions defining completely the limit zeta-function of the family. J.-P.Serre, using results of R.M.Robinson on...

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Hauptverfasser:	Nadirashvili, Nikolai S, Tsfasman, Michael A
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Schlagworte:	Mathematics - Algebraic Geometry Mathematics - Analysis of PDEs Mathematics - Number Theory
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creator	Nadirashvili, Nikolai S Tsfasman, Michael A
description	We study probability measures corresponding to families of abelian varieties over a finite field. These measures play an important role in the Tsfasman- Vladuts theory of asymptotic zeta-functions defining completely the limit zeta-function of the family. J.-P.Serre, using results of R.M.Robinson on conjugate algebraic integers, described the possible set of measures than can correspond to families of abelian varieties over a finite field. The problem whether all such measures actually occur was left open. Moreover, Serre supposed that not all such measures correspond to abelian varieties (for example, the Lebesgue measure on a segment). Here we settle Serre's problem proving that Serre conditions are sufficient, and thus describe completely the set of measures corresponding to abelian varieties.
doi_str_mv	10.48550/arxiv.2212.14854
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title	Complete Description of Measures Corresponding to Abelian Varieties over Finite Fields
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