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- Q7550132 subject Q6960175.
- Q7550132 subject Q7216206.
- Q7550132 subject Q7451798.
- Q7550132 subject Q7481097.
- Q7550132 abstract "In mathematics, Sobolev spaces for planar domains are one of the principal techniques used in the theory of partial differential equations for solving the Dirichlet and Neumann boundary value problems for the Laplacian in a bounded domain in the plane with smooth boundary. The methods use the theory of bounded operators on Hilbert space. They can be used to deduce regularity properties of solutions and to solve the corresponding eigenvalue problems.".
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- Q7550132 wikiPageWikiLink Q622741.
- Q7550132 wikiPageWikiLink Q643513.
- Q7550132 wikiPageWikiLink Q6960175.
- Q7550132 wikiPageWikiLink Q7216206.
- Q7550132 wikiPageWikiLink Q7451798.
- Q7550132 wikiPageWikiLink Q7481097.
- Q7550132 wikiPageWikiLink Q7524241.
- Q7550132 wikiPageWikiLink Q7996766.
- Q7550132 wikiPageWikiLink Q927051.
- Q7550132 type Thing.
- Q7550132 comment "In mathematics, Sobolev spaces for planar domains are one of the principal techniques used in the theory of partial differential equations for solving the Dirichlet and Neumann boundary value problems for the Laplacian in a bounded domain in the plane with smooth boundary. The methods use the theory of bounded operators on Hilbert space. They can be used to deduce regularity properties of solutions and to solve the corresponding eigenvalue problems.".
- Q7550132 label "Sobolev spaces for planar domains".
- Q7550132 seeAlso Q1192869.