Variational principles for nonpotential operators

This book develops a variational method for solving linear equations with B-symmetric and B-positive operators and generalizes the method to nonlinear equations with nonpotential operators. The author carries out a constructive extension of the variational method to "nonvariational" equati...

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Detalles Bibliográficos
Autores principales: Filippov, V M, Schulenberger, J R
Lenguaje:eng
Publicado: American Mathematical Society 1989
Materias:
Mathematical Physics and Mathematics
Acceso en línea:http://cds.cern.ch/record/2318083
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author Filippov, V M
Schulenberger, J R
author_facet Filippov, V M
Schulenberger, J R
author_sort Filippov, V M
collection CERN
description This book develops a variational method for solving linear equations with B-symmetric and B-positive operators and generalizes the method to nonlinear equations with nonpotential operators. The author carries out a constructive extension of the variational method to "nonvariational" equations (including parabolic equations) in classes of functionals which differ from the Euler-Lagrange functionals. In this connection, some new functions spaces are considered. Intended for mathematicians working in the areas of functional analysis and differential equations, this book would also prove useful for researchers in other areas and students in advanced courses who use variational methods in solving linear and nonlinear boundary value problems in continuum mechanics and theoretical physics.
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institution Organización Europea para la Investigación Nuclear
language eng
publishDate 1989
publisher American Mathematical Society
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spelling cern-23180832021-04-21T18:49:13Zhttp://cds.cern.ch/record/2318083engFilippov, V MSchulenberger, J RVariational principles for nonpotential operatorsMathematical Physics and MathematicsThis book develops a variational method for solving linear equations with B-symmetric and B-positive operators and generalizes the method to nonlinear equations with nonpotential operators. The author carries out a constructive extension of the variational method to "nonvariational" equations (including parabolic equations) in classes of functionals which differ from the Euler-Lagrange functionals. In this connection, some new functions spaces are considered. Intended for mathematicians working in the areas of functional analysis and differential equations, this book would also prove useful for researchers in other areas and students in advanced courses who use variational methods in solving linear and nonlinear boundary value problems in continuum mechanics and theoretical physics.American Mathematical Societyoai:cds.cern.ch:23180831989
spellingShingle Mathematical Physics and Mathematics
Filippov, V M
Schulenberger, J R
Variational principles for nonpotential operators
title Variational principles for nonpotential operators
title_full Variational principles for nonpotential operators
title_fullStr Variational principles for nonpotential operators
title_full_unstemmed Variational principles for nonpotential operators
title_short Variational principles for nonpotential operators
title_sort variational principles for nonpotential operators
topic Mathematical Physics and Mathematics
url http://cds.cern.ch/record/2318083
work_keys_str_mv AT filippovvm variationalprinciplesfornonpotentialoperators
AT schulenbergerjr variationalprinciplesfornonpotentialoperators

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