函数场中±1值完全乘法函数的极值行为

Pub Date : 2021-06-24 DOI:10.3336/gm.56.1.06

Nikola Lelas

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引用次数: 0

摘要

我们研究了有限域上有理函数场的经典Pólya和Turán猜想𝔽q。结合这两个猜想，我们研究了𝔽q[t]上二次字符对应的Dirichlet l -函数在s=1点处的截断符号，证明了𝔽q[t]上任意一元不可约多项式集的朗道定理的一个变体，并计算了𝔽q[t]上Liouville函数的某些变体的均值。

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Extremal behaviour of ± 1-valued completely multiplicative functions in function fields

We investigate the classical Pólya and Turán conjectures in the context of rational function fields over finite fields 𝔽q. Related to these two conjectures we investigate the sign of truncations of Dirichlet L-functions at point s=1 corresponding to quadratic characters over 𝔽q[t], prove a variant of a theorem of Landau for arbitrary sets of monic, irreducible polynomials over 𝔽q[t] and calculate the mean value of certain variants of the Liouville function over 𝔽q[t].

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