无界域上的简单部分分式近似

Pub Date : 2021-01-01 DOI:10.1070/SM9298
P. Borodin, K. Shklyaev
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引用次数: 1

摘要

对于复平面上由若干在无穷远处具有正则渐近行为的简单曲线所界的无界单连通域,我们得到了在的边界上具有极点的简单部分分式(多项式的对数导数)在的紧子集上具有一致收敛拓扑的全纯函数空间中是稠密的必要条件和充分条件。在两条平行线为界的条形情况下,我们给出了在边界上有极点且有一个固定极点的简单部分分式的收敛速率在内部趋近于零的估计。参考书目:16篇。
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Approximation by simple partial fractions in unbounded domains
For unbounded simply connected domains in the complex plane, bounded by several simple curves with regular asymptotic behaviour at infinity, we obtain necessary conditions and sufficient conditions for simple partial fractions (logarithmic derivatives of polynomials) with poles on the boundary of to be dense in the space of holomorphic functions in (with the topology of uniform convergence on compact subsets of ). In the case of a strip bounded by two parallel lines, we give estimates for the convergence rate to zero in the interior of of simple partial fractions with poles on the boundary of and with one fixed pole. Bibliography: 16 titles.
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