E. A. Maksimenko scite author profile

MSC:15A18 41A25 47B35 65F15 Keywords:Toeplitz matrix Eigenvalue Asymptotic expansions a b s t r a c t While extreme eigenvalues of large Hermitian Toeplitz matrices have been studied in detail for a long time, much less is known about individual inner eigenvalues. This paper explores the behavior of the jth eigenvalue of an n-by-n banded Hermitian Toeplitz matrix as n tends to infinity and provides asymptotic formulas that are uniform in j for 1 ≤ j ≤ n. The realvalued generating function of the matrices is assumed to increase strictly from its minimum to its maximum, and then to decrease strictly back from the maximum to the minimum, having nonzero second derivatives at the minimum and the maximum. The results, which are of interest in numerical analysis, probability theory, or statistical physics, for example, are illustrated and underpinned by numerical examples.

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On the Structure of the Eigenvectors of Large Hermitian Toeplitz Band Matrices

2010

The First Order Asymptotics of the Extreme Eigenvectors of Certain Hermitian Toeplitz Matrices

Integr. equ. oper. theory

et al. 2009

The paper is concerned with Hermitian Toeplitz matrices generated by a class of unbounded symbols that emerge in several applications. The main result gives the third order asymptotics of the extreme eigenvalues and the first order asymptotics of the extreme eigenvectors of the matrices as their dimension increases to infinity. (2000). Primary 47B35; Secondary 15A18, 41A80, 46N30. Mathematics Subject Classification

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The Szegő and Avram–Parter theorems for general test functions

Comptes Rendus Mathematique

2008

Pushing the envelope of the test functions in the Szegö and Avram–Parter theorems

Linear Algebra and its Applications

2008