论德里赫特数列哈达玛德组合的相对 Φ 增长

Axioms Pub Date : 2024-07-19 DOI:10.3390/axioms13070487

M. Sheremeta, O. Mulyava

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摘要

德里赫利数列 F(s)=∑n=1∞fnexp{sλn} 是具有相同指数的类似德里赫利数列 Fj(s) 的属 m 的哈达玛组成、关于作为 Dirichlet 级数给出的函数 G(s)的增长，从 Φ 型（MG-1(MF(σ))/Φ(σ)的上限为 σ↑A）和收敛 Φ 级进行研究，收敛 Φ 级由 ∫σ0AΦ′(σ)MG-1(MF(σ))Φ2(σ)dσ<+∞ 条件定义、其中，MF(σ) 是函数 F 在虚线处的最大模量，A 是绝对收敛的横座标。

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On the Relative Φ-Growth of Hadamard Compositions of Dirichlet Series

For the Dirichlet series F(s)=∑n=1∞fnexp{sλn}, which is the Hadamard composition of the genus m of similar Dirichlet series Fj(s) with the same exponents, the growth with respect to the function G(s) given as the Dirichlet series is studied in terms of the Φ-type (the upper limit of MG−1(MF(σ))/Φ(σ) as σ↑A) and convergence Φ-class defined by the condition ∫σ0AΦ′(σ)MG−1(MF(σ))Φ2(σ)dσ<+∞, where MF(σ) is the maximum modulus of the function F at an imaginary line and A is the abscissa of the absolute convergence.

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