On Computing Multiple Solutions of Nonlinear PDEs Without Variational Structure

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dc.contributorZhou, Jianxin
dc.creatorWang, Changchun
dc.date.accessioned2014-09-16T07:28:23Z
dc.date.accessioned2017-04-07T20:00:28Z
dc.date.available2014-09-16T07:28:23Z
dc.date.available2017-04-07T20:00:28Z
dc.date.created2012-05
dc.date.issued2012-07-16
dc.description.abstractVariational structure plays an important role in critical point theory and methods. However many differential problems are non-variational i.e. they are not the Euler- Lagrange equations of any variational functionals, which makes traditional critical point approach not applicable. In this thesis, two types of non-variational problems, a nonlinear eigen solution problem and a non-variational semi-linear elliptic system, are studied. By considering nonlinear eigen problems on their variational energy profiles and using the implicit function theorem, an implicit minimax method is developed for numerically finding eigen solutions of focusing nonlinear Schrodinger equations subject to zero Dirichlet/Neumann boundary condition in the order of their eigenvalues. Its mathematical justification and some related properties, such as solution intensity preserving, bifurcation identification, etc., are established, which show some significant advantages of the new method over the usual ones in the literature. A new orthogonal subspace minimization method is also developed for finding multiple (eigen) solutions to defocusing nonlinear Schrodinger equations with certain symmetries. Numerical results are presented to illustrate these methods. A new joint local min orthogonal method is developed for finding multiple solutions of a non-variational semi-linear elliptic system. Mathematical justification and convergence of the method are discussed. A modified non-variational Gross-Pitaevskii system is used in numerical experiment to test the method.
dc.identifier.urihttp://hdl.handle.net/1969.1/ETD-TAMU-2012-05-11171
dc.language.isoen_US
dc.subjectNonlinear Schrodinger eigen problem
dc.subjectNonvariational semilinear system
dc.subjectImplicit minimax method
dc.subjectOrder in eigenvalues
dc.subjectMorse index
dc.subjectBifurcation
dc.titleOn Computing Multiple Solutions of Nonlinear PDEs Without Variational Structure
dc.typeThesis

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