@article{Denk2000Bound-704,
  year={2000},
  doi={10.1007/BF01228606},
  title={Boundary value problems for a class of elliptic operator pencils},
  volume={38},
  journal={Integral Equations Operator Theory},
  pages={410--436},
  author={Denk, Robert and Mennicken, Reinhard and Volevič, Leonid R.}
}

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    <dc:contributor>Denk, Robert</dc:contributor>
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    <dcterms:title>Boundary value problems for a class of elliptic operator pencils</dcterms:title>
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    <dcterms:abstract xml:lang="eng">An operator family of densely defined closed linear operators and the In this paper operator pencils depending polynomially on the spectral parameter  are studied which act on a manifold with boundary and satisfy the condition of  N -ellipticity with parameter, a generalization of the notion of ellipticity with parameter as introduced by Agmon and Agranovich-Vishik. Sobolev spaces corresponding to a Newton polygon are defined and investigated; in particular it is possible to describe  their trace spaces. With respect to these spaces, an a priori estimate  holds for the Dirichlet boundary value problem connected with an N-elliptic pencil, and a right parametrix is constructed.</dcterms:abstract>
    <dcterms:bibliographicCitation>First publ. in: Integral Equations Operator Theory 38 (2000), pp. 410-436</dcterms:bibliographicCitation>
    <dc:creator>Mennicken, Reinhard</dc:creator>
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