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AN UNBOUNDED OPERATOR WITH SPECTRUM IN A STRIP AND MATRIX DIFFERENTIAL OPERATORS

Part of: Special classes of linear operators General theory of linear operators Operator theory: Ordinary differential operators

Published online by Cambridge University Press:  16 April 2021

MICHAEL GIL’ Open the ORCID record for MICHAEL GIL’ [Opens in a new window]
MICHAEL GIL’*
Affiliation:
Department of Mathematics, Ben Gurion University of the Negev, PO Box 653, Beer-Sheva 84105, Israel
*
e-mail: [email protected]
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Abstract

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Let A and $\tilde A$ be unbounded linear operators on a Hilbert space. We consider the following problem. Let the spectrum of A lie in some horizontal strip. In which strip does the spectrum of $\tilde A$ lie, if A and $\tilde A$ are sufficiently ‘close’? We derive a sharp bound for the strip containing the spectrum of $\tilde A$ , assuming that $\tilde A-A$ is a bounded operator and A has a bounded Hermitian component. We also discuss applications of our results to regular matrix differential operators.

Keywords

differential operatorHilbert spacespectrum localisation

MSC classification

Primary: 47A10: Spectrum, resolvent
Secondary: 47A55: Perturbation theory 47B10: Operators belonging to operator ideals (nuclear, $p$-summing, in the Schatten-von Neumann classes, etc.) 47E05: Ordinary differential operators (should also be assigned at least one other classification number in section 47)
Type
Research Article
Information
Bulletin of the Australian Mathematical Society , Volume 105 , Issue 1 , February 2022 , pp. 146 - 153
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Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited.
Copyright
© Australian Mathematical Publishing Association Inc. 2021

References

Arendt, W., Batty, C. J. K., Neubrander, F. and Hieber, M., Laplace Transforms and Cauchy Problems (Springer, Basel, 2011).CrossRefGoogle Scholar
Bade, W. G., ‘An operational calculus for operators with spectrum in a strip’, Pacific J. Math. 3 (1953), 257290.CrossRefGoogle Scholar
Boyadzhiev, K. and deLaubenfels, R., ‘Spectral theorem for unbounded strongly continuous groups on a Hilbert space’, Proc. Amer. Math. Soc. 120(1) (1994), 127136.CrossRefGoogle Scholar
Curtain, R. and Zwart, H., Introduction to Infinite-Dimensional Systems Theory (Springer, New York, 1995).Google Scholar
Engel, K.-J. and Nagel, R., A Short Course on Operator Semigroups, Universitext (Springer, New York, 2006).Google Scholar
Gil’, M. I., ‘Perturbations of operators on tensor products and spectrum localization of matrix differential operators’, J. Appl. Funct. Anal. 3(3) (2008), 315332.Google Scholar
Gil’, M. I., ‘Resolvent and spectrum of a nonselfadjoint differential operator in a Hilbert space’, Ann. Univ. Mariae Curie-Skłodowska Sect. A 66(1) (2012), 2539.Google Scholar
Gil’, M. I., Operator Functions and Operator Equations (World Scientific, Hackensack, NJ, 2018).Google Scholar
Haase, M., ‘Spectral properties of operator logarithms’, Math. Z. 245(4) (2003), 761779.CrossRefGoogle Scholar
Haase, M., The Functional Calculus for Sectorial Operators, Operator Theory: Advances and Applications, 169 (Birkhauser, Basel, 2006).Google Scholar
Haase, M. A., ‘A characterization of group generators on Hilbert spaces and the ${H}^{\infty }$ -calculus’, Semigroup Forum 66(2) (2003), 288304.CrossRefGoogle Scholar
Kato, T., Perturbation Theory for Linear Operators (Springer-Verlag, Berlin, 1980).Google Scholar
Kholkin, A. M. and Rofe-Beketov, F. S., ‘On spectrum of differential operator with block-triangular matrix coefficients’, Zh. Mat. Fiz. Anal. Geom. 10(1) (2014), 4463.CrossRefGoogle Scholar
Locker, J., Spectral Theory of Non-Self-Adjoint Two Point Differential Operators, Mathematical Surveys and Monographs, 73 (American Mathematical Society, Providence, RI, 1999).CrossRefGoogle Scholar
Ma, R., Wang, H. and Elsanosi, M., ‘Spectrum of a linear fourth-order differential operator and its applications’, Math. Nachr. 286(17–18) (2013), 18051819.CrossRefGoogle Scholar
Martinez, C. C. and Sanz, A. M., The Theory of Fractional Powers of Operators (North-Holland, Amsterdam, 2001).Google Scholar
Pruss, J. and Sohr, H., ‘On operators with bounded imaginary powers in Banach spaces’, Math. Z. 203(3) (1990), 429452.CrossRefGoogle Scholar
Zettl, A. and Sun, J., ‘Self-adjoint ordinary differential operators and their spectrum’, Rocky Mountain J. Math. 45(3) (2015), 763886.CrossRefGoogle Scholar
Zhang, M., Sun, J. and Ao, J., ‘The discreteness of spectrum for higher-order differential operators in weighted function spaces’, Bull. Aust. Math. Soc. 86(3) (2012), 370376.CrossRefGoogle Scholar