Bias correction for Vandermonde low-rank approximation

IF 2 Q2 ECONOMICS
Antonio Fazzi , Alexander Kukush , Ivan Markovsky
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引用次数: 0

Abstract

The low-rank approximation problem, that is the problem of approximating a given matrix with a matrix of lower rank, appears in many scientific fields. In some applications the given matrix is structured and the approximation is required to have the same structure. Examples of linear structures are Hankel, Toeplitz, and Sylvester. Currently, there are only a few results for nonlinearly structured low-rank approximation problems. The problem of Vandermonde structured low-rank approximation is considered. The high condition number of the Vandermonde matrix, in combination with the noise in the data, makes the problem challenging. A numerical method based on a bias correction procedure is proposed and its properties are demonstrated by simulation. The performance of the method is illustrated on numerical results.

范德蒙德低秩近似的偏差修正
低秩近似问题,即用低秩矩阵近似给定矩阵的问题,出现在许多科学领域。在某些应用中,给定矩阵是结构化的,而近似矩阵则需要具有相同的结构。线性结构的例子有汉克尔(Hankel)、托普利兹(Toeplitz)和西尔维斯特(Sylvester)。目前,对于非线性结构的低阶近似问题,只有少数几个结果。本文考虑的是 Vandermonde 结构低阶近似问题。Vandermonde 矩阵的条件数较高,再加上数据中的噪声,使得该问题具有挑战性。本文提出了一种基于偏差修正程序的数值方法,并通过仿真演示了该方法的特性。数值结果表明了该方法的性能。
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来源期刊
CiteScore
3.10
自引率
10.50%
发文量
84
期刊介绍: Econometrics and Statistics is the official journal of the networks Computational and Financial Econometrics and Computational and Methodological Statistics. It publishes research papers in all aspects of econometrics and statistics and comprises of the two sections Part A: Econometrics and Part B: Statistics.
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