Hardy type inequalities for one weight function and their applications

IF 0.8 3区 数学 Q2 MATHEMATICS
R. Nasibullin
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引用次数: 0

Abstract

New one-dimensional Hardy-type inequalities for a weight function of the form $x^\alpha(2-x)^\beta$ for positive and negative values of the parameters $\alpha$ and $\beta$ are put forward. In some cases, the constants in the resulting one-dimensional inequalities are sharp. We use one-dimensional inequalities with additional terms to establish multivariate inequalities with weight functions depending on the mean distance function or the distance function from the boundary of a domain. Spatial inequalities are proved in arbitrary domains, in Davies-regular domains, in domains satisfying the cone condition, in $\lambda$-close to convex domains, and in convex domains. The constant in the additional term in the spatial inequalities depends on the volume or the diameter of the domain. As a consequence of these multivariate inequalities, estimates for the first eigenvalue of the Laplacian under the Dirichlet boundary conditions in various classes of domains are established. We also use one-dimensional inequalities to obtain new classes of meromorphic univalent functions in simply connected domains. Namely, Nehari-Pokornii type sufficient conditions for univalence are obtained.
单权函数的Hardy型不等式及其应用
对参数$\alpha$和$\beta$的正负值提出了形式为$x^\alpha(2-x)^\beta$的权函数的新的一维hardy型不等式。在某些情况下,由此产生的一维不等式中的常数是尖锐的。我们使用带有附加项的一维不等式来建立基于平均距离函数或到域边界的距离函数的权重函数的多元不等式。在任意域、davis -正则域、满足锥条件的域、$\lambda$ -接近凸域和凸域上证明了空间不等式。空间不等式中附加项的常数取决于区域的体积或直径。作为这些多元不等式的结果,建立了在Dirichlet边界条件下的拉普拉斯算子的第一特征值的估计。我们还利用一维不等式得到了单连通域上亚纯一元函数的新类别。即得到了一元性的Nehari-Pokornii型充分条件。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Izvestiya Mathematics
Izvestiya Mathematics 数学-数学
CiteScore
1.30
自引率
0.00%
发文量
30
审稿时长
6-12 weeks
期刊介绍: The Russian original is rigorously refereed in Russia and the translations are carefully scrutinised and edited by the London Mathematical Society. This publication covers all fields of mathematics, but special attention is given to: Algebra; Mathematical logic; Number theory; Mathematical analysis; Geometry; Topology; Differential equations.
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