Abstract:
This paper provides a survey of results devoted to the study of integrodifferential equations with unbounded operator coefficients in a Hilbert space. These equations are operator models of integrodifferential partial differential equations arising in numerous applications: in the theory of viscoelasticity, in the theory of heat propagation in media with memory (Gurtin–Pipkin equations), and averaging theory. The most interesting and profound results of the survey are devoted to the spectral analysis of operator functions that are symbols of the integrodifferential equations under study.
Citation:
V. V. Vlasov, N. A. Rautian, “Investigation of integrodifferential equations by methods of spectral theory”, Dedicated to the memory of Professor N. D. Kopachevsky, CMFD, 67, no. 2, PFUR, M., 2021, 255–284
\Bibitem{VlaRau21}
\by V.~V.~Vlasov, N.~A.~Rautian
\paper Investigation of integrodifferential equations by methods of spectral theory
\inbook Dedicated to the memory of Professor N. D. Kopachevsky
\serial CMFD
\yr 2021
\vol 67
\issue 2
\pages 255--284
\publ PFUR
\publaddr M.
\mathnet{http://mi.mathnet.ru/cmfd417}
\crossref{https://doi.org/10.22363/2413-3639-2021-67-2-255-284}
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https://www.mathnet.ru/eng/cmfd417
https://www.mathnet.ru/eng/cmfd/v67/i2/p255
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