The Spectral Analysis of a Nuclear Resolvent Operator Associated With a Second Order Dissipative Differential Operator
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Date
2017
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Publisher
Springer Heidelberg
Open Access Color
Green Open Access
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Abstract
In this paper, we introduce a new approach for the spectral analysis of a linear second order dissipative differential operator with distributional potentials. This approach is related with the inverse operator. We show that the inverse operator is a non-selfadjoint trace class operator. Using Lidskii's theorem, we introduce a complete spectral analysis of the second order dissipative differential operator. Moreover, we give a trace formula for the trace class integral operator.
Description
Keywords
Dissipative Operator, Trace Class Operator, Nuclear Operator, Hilbert-Schmidt Operator, Completeness Theorem, dissipative operator, nuclear operator, General theory of ordinary differential operators, Hilbert-Schmidt operator, Spectrum, resolvent, Linear accretive operators, dissipative operators, etc., completeness theorem, Nonselfadjoint operator theory in quantum theory including creation and destruction operators, Weyl theory and its generalizations for ordinary differential equations, trace class operator
Fields of Science
0101 mathematics, 01 natural sciences
Citation
Uğurlu, E. (2017). The spectral analysis of a nuclear resolvent operator associated with a second order dissipative differential operator. Computational Methods And Function Theory, 17(2), 237-253. http://dx.doi.org/10.1007/s40315-016-0185-8
WoS Q
Q2
Scopus Q
Q2
OpenCitations Citation Count
6
Source
Computational Methods and Function Theory
Volume
17
Issue
2
Start Page
237
End Page
253
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CrossRef : 3
Scopus : 5
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Mendeley Readers : 1
SCOPUS™ Citations
5
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Web of Science™ Citations
5
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3
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