Infinite Resonant Solutions and Turning Points in a Problem with Unbounded bifurcation
نویسندگان
چکیده
We consider an elliptic equation −∆u + u = 0 with nonlinear boundary conditions ∂u ∂n = λu + g(λ, x, u), where g(λ, x, s) s → 0, as |s| → ∞. In [1, 2] the authors proved the existence of unbounded branches of solutions near a Steklov eigenvalue of odd multiplicity and, among other things, provided tools to decide whether the branch is subcritical or supercritical. In this work we give conditions on the nonlinearity guaranteeing the existence of a bifurcating branch which is neither subcritical nor supercritical, having an infinite number of turning points and an infinite number of resonant solutions. Keys words : bifurcation from infinity; nonlinear boundary condtions; Steklov eigenvalues; turning points; resonant solutions. ∗The three authors are partially supported by Project MTM2006–08262, MEC Spain, GR74/07, Grupo 920894 (Comunidad de Madrid UCM, Spain). Moreover, the first and third authors are also supported by PHB2006-003PC from MICINN and the first author is also supported by SIMUMAT, Comunidad de Madrid
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ورودعنوان ژورنال:
- I. J. Bifurcation and Chaos
دوره 20 شماره
صفحات -
تاریخ انتشار 2010