根据Abel, Chebyshev, Robinson，…Frobenius自同态特征值的渐近分布

IF 1 4区数学 Q1 MATHEMATICS Asterisque Pub Date : 2018-07-31 DOI:10.24033/ast.1090

Jean-Pierre Serre

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引用次数: 19

摘要

我们考虑酉多项式 $P \in Z[X]$ 谁的根 $(x_i)$ 属于一个给定的契约 $K$ 的 $C$．我们把这个测度与这样一个多项式联系起来 $\mu_P$ on $K$ 狄拉克测度的均值是多少 $\delta_{x_i}$．这些措施的限制是什么 $\mu_P$ 什么时候 $P$ 变化?特别是，他们的支持是什么?我们对这些问题给出了部分答案，尤其是当 $K$ 包含在 $R$．

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Distribution asymptotique des valeurs propres des endomorphismes de Frobenius d'après Abel, Chebyshev, Robinson,...

We consider unitary polynomials $P \in Z[X]$ whose roots $(x_i)$ belong to a given compact $K$ of $C$. To such a polynomial we associate the measure $\mu_P$ on $K$ which is the mean value of the Dirac measures $\delta_{x_i}$. What are the limits of the measures $\mu_P$ when $P$ varies ? In particular, what are their supports? We give partial answers to such questions, especially when $K$ is contained in $R$.

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来源期刊

Asterisque MATHEMATICS-

CiteScore

2.90

自引率

0.00%

发文量

审稿时长

>12 weeks

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