Generalized Krein algebras and asymptotics of Toeplitz determinants

Authors

  • A. Böttcher Fakultat fur Mathematik, Technische Universitat Chemnitz, D-09107, Chemnitz, Germany
  • A. Karlovich Departamento de Matem\'atica, Instituto Superior Tecnico, Av. Rovisco Pais 1, 1049-001, Lisbon, Portugal
  • B. Silbermann Fakultat fur Mathematik, Technische Universitat Chemnitz, D-09107, Chemnitz, Germany 

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Abstract

We give a survey on generalized Krein algebras $K_{p,q}^{\alpha,\beta}$ and their applications to Toeplitz determinants. Our methods originated in a paper by Mark Krein of 1966, where he showed that $K_{2,2}^{1/2,1/2}$ is a Banach algebra. Subsequently, Widom proved the strong Szego limit theorem for block Toeplitz determinants with symbols in $(K_{2,2}^{1/2,1/2})_{N\times N}$ and later two of the authors studied symbols in the generalized Krein algebras $(K_{p,q}^{\alpha,\beta})_{N\times N}$, where $\lambda:=1/p+1/q=\alpha+\beta$ and $\lambda=1$. We here extend these results to $0< \lambda <1$. The entire paper is based on fundamental work by Mark Krein, ranging from operator ideals through Toeplitz operators up to Wiener-Hopf factorization.

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Published

2007-09-25

Issue

Vol. 13 No. 3 (2007)

Section

Articles

How to Cite

Böttcher, A., et al. “Generalized Krein Algebras and Asymptotics of Toeplitz Determinants”. Methods of Functional Analysis and Topology, vol. 13, no. 3, Sept. 2007, pp. 236-61, https://zen.imath.kiev.ua/index.php/mfat/article/view/352.