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Chebyshevskii Sbornik, 2018, Volume 19, Issue 3, Pages 164–182
DOI: https://doi.org/10.22405/2226-8383-2018-19-3-164-182
(Mi cheb686)
 

This article is cited in 1 scientific paper (total in 1 paper)

On solvability of variational Dirichlet problem for a class of degenerate elliptic operators

S. A. Iskhokova, I. A. Yakushevb

a Dzhuraev Institute of Mathematics, Academy of Sciences of Republic of Tajikistan
b Mirny Polytechnic Institute, the branch of Ammosov North-Eastern Federal University
Full-text PDF (707 kB) Citations (1)
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Abstract: The paper is devoted to investigation of unique solvability of the Dirichlet variational problem associated with integro-differential sesquilinear form
\begin{equation*}\tag{*} B[u,\,v]=\sum_{j\in J}B_j[u,\,v], \end{equation*}
where
\begin{equation*} B_j[u,\,v]= \sum_{|k|=|l|=j}\int_{\Omega}\rho(x)^{2\tau_j}b_{kl}(x)u^{(k)}(x)\,\overline{v^{(l)}(x)}dx, \end{equation*}
$\Omega$ — a bounded domain in the euclidian space $R^n$ with a closed $(n-1)$-dimensional boundary $\partial \Omega$, $\rho(x),\,x\in \Omega,$ — a regularized distance from a point $x\in\Omega$ to $\partial \Omega$, $k$ — a multi-index, $u^{(k)}(x)$ — a generalized derivative of multi-index $k$ of a function $u(x),\,x\in \Omega$, $b_{kl}(x)$ — bounded in $\Omega$ complex-valued functions, $J\subset \{1,\,2,\,\ldots,\,r\}$ and $\tau_j,\,j\in J,$ — real numbers. It is assumed that $r\in J$. A degeneracy of coefficients of the differential operator associated with the form (*), is said to be coordinated if there exist a number $\alpha$ such that $\tau_j=\alpha+j-r$ for all $j\in J.$ Otherwise it is called uncoordinated.
The variational Dirichlet problem associated with the form (*) in the case of coordinated degeneracy of coefficients is well studied in many papers, where it is also assumed that the form (*) satisfies a coercivness condition. It should be mentioned that the case of uncoordinated degeneracy of the coefficients is fraught with some technical complexities and it was only considered in some separate papers. In this case with the aid of embedding theorems for spaces of differentiable functions with power weights leading forms $B_j[u,\,v],\, j\in J_2\subset J,$ are separated and it is proved that solvability of the variational Dirichlet problem is generally depends on the leading forms.
We consider the case of uncoordinated degeneracy of coefficients of the operator under investigation and, in contrast to previously published works on this direction, it is allowed that the main form (*) does not obey coerciveness condition.
Keywords: variational Dirichlet problem, elliptic operator, uncoordinated degeneration, noncoercive form.
Received: 22.04.2018
Accepted: 10.10.2018
Bibliographic databases:
Document Type: Article
UDC: 517.957
Language: Russian
Citation: S. A. Iskhokov, I. A. Yakushev, “On solvability of variational Dirichlet problem for a class of degenerate elliptic operators”, Chebyshevskii Sb., 19:3 (2018), 164–182
Citation in format AMSBIB
\Bibitem{IskYak18}
\by S.~A.~Iskhokov, I.~A.~Yakushev
\paper On solvability of variational Dirichlet problem for a class of degenerate elliptic operators
\jour Chebyshevskii Sb.
\yr 2018
\vol 19
\issue 3
\pages 164--182
\mathnet{http://mi.mathnet.ru/cheb686}
\crossref{https://doi.org/10.22405/2226-8383-2018-19-3-164-182}
\elib{https://elibrary.ru/item.asp?id=39454395}
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