在与Jordan块相关的三对角矩阵上

Pub Date : 2022-11-01 DOI:10.2478/ausm-2022-0004
C. D. da Fonseca, V. Kowalenko
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引用次数: 0

摘要

摘要本文旨在说明如何使用一些标准的一般结果比现有的方法更优雅、更简单地揭示三对角线及相关矩阵的谱理论。作为一个典型的例子,我们将该理论应用于特殊的三对角线矩阵,在最近的关于Jordan块产生的正交多项式的论文中。因此,我们发现多项式和谱理论的特殊矩阵是可表示的第二类切比雪夫多项式,其性质产生了有趣的结果。对于特殊情况,我们得到了斐波那契数和勒让德多项式的结果。
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On tridiagonal matrices associated with Jordan blocks
Abstract This paper aims to show how some standard general results can be used to uncover the spectral theory of tridiagonal and related matrices more elegantly and simply than existing approaches. As a typical example, we apply the theory to the special tridiagonal matrices in recent papers on orthogonal polynomials arising from Jordan blocks. Consequently, we find that the polynomials and spectral theory of the special matrices are expressible in terms of the Chebyshev polynomials of second kind, whose properties yield interesting results. For special cases, we obtain results in terms of the Fibonacci numbers and Legendre polynomials.
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