解析函数空间的移环性

Jeet Sampat
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引用次数: 0

摘要

在本研究中,我们考虑了一个和多个复变量中解析函数的巴拿赫空间,对于这些空间,(i) 多项式是密集的;(ii) 域上的点评估是有界线性函数;(iii) 移位算子对每个变量都是有界的:(i) 多项式是密集的,(ii) 域上的点评估是有界线性函数,(iii) 移位算子对每个变量都是有界的。我们讨论的问题是确定这样一个空间中的移环函数,即其多项式倍数构成密集子空间的函数。众所周知,确定某些解析函数空间中的移环函数问题与数学其他领域的一些深奥问题密切相关,如扩张完备性问题,甚至黎曼假设。确定移环函数之所以如此困难,是因为我们经常需要使用针对所考虑的空间的特定技术。因此,我们介绍了过去经常出现的几种不同的函数空间,如哈代空 间、狄利克型空间、完全 Pickspaces 和伯格曼空间。我们强调了这些空间中移环函数的异同,并列出了任何给定解析函数空间中移环函数必须共享的一些重要的一般性质。在整个讨论过程中,我们还提出了大量与移环性相关的开放问题。
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Shift-cyclicity in analytic function spaces
In this survey, we consider Banach spaces of analytic functions in one and several complex variables for which: (i) polynomials are dense, (ii) point-evaluations on the domain are bounded linear functionals, and (iii) the shift operators are bounded for each variable. We discuss the problem of determining the shift-cyclic functions in such a space, i.e., functions whose polynomial multiples form a dense subspace. The problem of determining shift-cyclic functions in certain analytic function spaces is known to be intimately connected to some deep problems in other areas of mathematics, such as the dilation completeness problem and even the Riemann hypothesis. What makes determining shift-cyclic functions so difficult is that often we need to employ techniques that are specific to the space in consideration. We therefore cover several different function spaces that have frequently appeared in the past such as the Hardy spaces, Dirichlet-type spaces, complete Pick spaces and Bergman spaces. We highlight the similarities and the differences between shift-cyclic functions among these spaces and list some important general properties that shift-cyclic functions in any given analytic function space must share. Throughout this discussion, we also motivate and provide a large list of open problems related to shift-cyclicity.
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