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Matematicheskie Zametki, 2022, Volume 111, Issue 3, paper published in the English version journal
(Mi mzm13476)
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This article is cited in 1 scientific paper (total in 1 paper)
Papers published in the English version of the journal
Convergence of Spectral Expansions Related to Elliptic Operators with Singular
Coefficients
V. S. Serovab, U. M. Kyllönena a University of Oulu, Oulu, 90014, Finland
b Moscow Center of Fundamental and Applied Mathematics, Moscow, 119991, Russia
Abstract:
Let
$\Omega$
be a smooth domain in
$\mathbb{R}^n$
(not necessarily bounded), and let
$A$
be a linear elliptic differential operator
of order
$2m$
with singular coefficients acting in
$L^2(\Omega)$.
Under some assumptions of singularity for the coefficients of
$A$,
we consider the
Friedrichs extension
and study the convergence of spectral expansions in Sobolev spaces.
Keywords:
Elliptic operator, Friedrichs extension, Sobolev embedding, spectral expansions.
Received: 10.10.2021
Citation:
V. S. Serov, U. M. Kyllönen, “Convergence of Spectral Expansions Related to Elliptic Operators with Singular
Coefficients”, Math. Notes, 111:3 (2022), 455–469
Linking options:
https://www.mathnet.ru/eng/mzm13476
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Abstract page: | 117 |
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