Eigenvalues of a third order BVP subject to functional BCs
classification
🧮 math.CA
keywords
eigenvaluesorderboundaryexistencefunctionalsubjectthirdapplicability
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We discuss the existence of eigenvalues for a third order boundary value problem subject to functional boundary conditions and higher order derivative dependence in the nonlinearities. We prove the existence of positive and negative eigenvalues and provide a localization of the corresponding eigenfunctions in terms of their norm. The methodology involves a version of the classical Birkhoff-Kellogg theorem. We illustrate the applicability of the theoretical results in an example.
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