Szegö的定理及其概率派生

IF 1.3 Q2 STATISTICS & PROBABILITY Probability Surveys Pub Date : 2011-08-01 DOI:10.1214/11-PS178

N. Bingham

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引用次数: 60

摘要

单位圆上的正交多项式理论(OPUC)可以追溯到Szego 1915- 1921年的工作，并得到了西蒙最近的工作的巨大推动，特别是他的调查论文和最近的三本著作;我们在本文中提到了其中第三个定理的标题，即塞戈定理及其衍生定理。西蒙的动机来自光谱理论和分析。OPUC的另一个主要应用领域来自概率论、统计学、时间序列和预测理论;例如，可以参考Grenander和Szego的经典著作《Toeplitz表格及其应用》。从这个背景出发，我们在这里的目的是通过给出一些概率动机的结果来补充最近的工作。我们还主张对长期依赖作出新的定义。

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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Szegö's theorem and its probabilistic descendants

The theory of orthogonal polynomials on the unit circle (OPUC) dates back to Szego's work of 1915-21, and has been given a great impetus by the recent work of Simon, in particular his survey paper and three recent books; we allude to the title of the third of these, Szego's theorem and its descendants , in ours. Simon's motivation comes from spectral theory and analysis. Another major area of application of OPUC comes from probability, statistics, time series and prediction theory; see for instance the classic book by Grenander and Szego, Toeplitz forms and their applications . Coming to the subject from this background, our aim here is to complement this recent work by giving some probabilistically motivated results. We also advocate a new definition of long-range dependence.

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