关于Macintyre - Evgrafov类定理中函数增长和衰减的估计

IF 0.5 Q3 MATHEMATICS Ufa Mathematical Journal Pub Date : 2017-01-01 DOI:10.13108/2017-9-3-26
A. Gaisin, G. Gaisina
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引用次数: 1

摘要

. 本文得到了关于狄利克雷级数在实轴上的性质的两个结果。第一个问题是关于段系统上Dirichlet级数和的下界[rtp, rtp +𝛿]。这里的参数,即:参数,即:参数,即:参数,即:参数,即:利用一种基于不等式的方法,对适当的非拟解析Carleman类的极值函数建立了所需的渐近估计。事实证明,这种方法比已知的获得类似估计的传统方法更有效。第二个结果实质上证明了M.A. Evgrafov关于R狄利克雷级数上有界存在性的已知定理。根据麦金太尔的说法,这个级数的和在R上趋于零。我们在一个Macintyre-Evgrafov型例子中证明了函数衰减率的一个特定估计。
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Estimate for growth and decay of functions in Macintyre - Evgrafov kind theorems
. In the paper we obtain two results on the behavior of Dirichlet series on a real axis.Thefirst of them concerns the lower bound for the sum of the Dirichlet series on the system of segments [ 𝛼, 𝛼 + 𝛿 ]. Here the parameters 𝛼 > 0, 𝛿 > 0 are such that 𝛼 ↑ + ∞ , 𝛿 ↓ 0. The needed asymptotic estimates is established by means of a method based on some inequalities for extremal functions in the appropriate non-quasi-analytic Carleman class. This approach turns out to be more effective than the known traditional ways for obtaining similar estimates. The second result specifies essentially the known theorem by M.A. Evgrafov on existence of a bounded on R Dirichlet series. According to Macintyre, the sum of this series tends to zero on R . We prove a spectific estimate for the decay rate of the function in an Macintyre-Evgrafov type example.
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