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Contemporary Mathematics. Fundamental Directions, 2020, Volume 66, Issue 2, Pages 209–220
DOI: https://doi.org/10.22363/2413-3639-2020-66-2-209-220
(Mi cmfd401)
 

Dilatations of linear operators

Yu. L. Kudryashov

V. I. Vernadsky Crimean Federal University, Simferopol, Russia
References:
Abstract: The article is devoted to building various dilatations of linear operators. The explicit construction of a unitary dilation of a compression operator is considered. Then the $J$-unitary dilatation of a bounded operator is constructed by means of the operator knot concept of a bounded linear operator. Using the Pavlov method, we construct the self-adjoint dilatation of a bounded dissipative operator. We consider spectral and translational representations of the self-adjoint dilatation of a densely defined dissipative operator with nonempty set of regular points.
Using the concept of an operator knot for a bounded operator and the Cayley transform, we introduce an operator knot for a linear operator. By means of this concept, we construct the $J$-self-adjoint dilatation of a densely defined operator with a regular point.
We obtain conditions of isomorphism of extraneous dilations and their minimality.
Document Type: Article
UDC: 517.983.24, 517.984.4
Language: Russian
Citation: Yu. L. Kudryashov, “Dilatations of linear operators”, Proceedings of the Crimean autumn mathematical school-symposium, CMFD, 66, no. 2, PFUR, M., 2020, 209–220
Citation in format AMSBIB
\Bibitem{Kud20}
\by Yu.~L.~Kudryashov
\paper Dilatations of linear operators
\inbook Proceedings of the Crimean autumn mathematical school-symposium
\serial CMFD
\yr 2020
\vol 66
\issue 2
\pages 209--220
\publ PFUR
\publaddr M.
\mathnet{http://mi.mathnet.ru/cmfd401}
\crossref{https://doi.org/10.22363/2413-3639-2020-66-2-209-220}
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