Minimal value for the type of an entire function of order $rhoin(0,,1)$, whose zeros lie in an angle and have a prescribed density

IF 0.5 Q3 MATHEMATICS
V. Sherstyukov
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引用次数: 1

Abstract

. In the work we find the minimal value that can be taken by the type of an entire function of order 𝜌 ∈ (0 , 1) with zeroes of prescribed upper and lower densities and located in an angle of a fixed opening less than 𝜋 . The main theorem generalizes the previous result by the author (the zeroes lie on one ray) and by A.Yu. Popov (only the upper density of zeros was taken into consideration). We distinguish and study in detail the case when the an entire function has a measurable sequence of zeroes. We provide applications of the obtained results to the uniqueness theorems for entire functions and to the completeness of exponential systems in the space of analytic in a circle functions with the standard topology of uniform convergence on compact sets.
$rhoin(0,,1)$阶的整个函数类型的最小值,其零点位于一个角度并且具有规定的密度
. 在工作中,我们发现了一个阶为𝜌∈(0,1)的完整函数的类型所能取的最小值,该函数具有规定的上、下密度的零点,并且位于小于一个固定开口的角上。主定理推广了作者(零点在一条射线上)和A.Yu先前的结果。波波夫(只考虑了零的上密度)。我们详细区分和研究了整个函数具有可测量的零序列的情况。将所得结果应用于整函数的唯一性定理和紧集上一致收敛的标准拓扑圆函数解析空间中指数系统的完备性。
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CiteScore
1.10
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