Global Bifurcation Result for the p-biharmonic Operator
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We prove that the nonlinear eigenvalue problem for the p-biharmonic operator with p > 1, and Ω a bounded domain in ℝN with smooth boundary, has principal positive eigenvalue which is simple and isolated. The corresponding eigenfunction is positive in Ω and satisfies ∂u / ∂n < 0 on ∂Ω, ∆u1 < 0 in Ω. We also prove that (λ1, 0) is the point of global bifurcation for associated nonhomogeneous problem. In the case N = 1 we give a description of all eigenvalues and associated eigenfunctions. Every such an eigenvalue is then the point of global bifurcation.
CitationDrabek, P., & Otani, M. (2001). Global bifurcation result for the p-biharmonic operator. Electronic Journal of Differential Equations, 2001(48), pp. 1-19.
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