2026-06-28T10:34:49Zhttps://docta.ucm.es/rest/oai/request

oai:docta.ucm.es:20.500.14352/419852023-08-28T14:49:38Zcom_20.500.14352_14col_20.500.14352_15

00925njm 22002777a 4500 dc Arrieta Algarra, José María author Pardo San Gil, Rosa María author Rodríguez Bernal, Aníbal author 2009 We consider a parabolic equation ut−Δu+u=0 with nonlinear boundary conditions , where as |s|→∞. In [J.M. Arrieta, R. Pardo, A. Rodríguez-Bernal, Bifurcation and stability of equilibria with asymptotically linear boundary conditions at infinity, Proc. Roy. Soc. Edinburgh Sect. A 137 (2) (2007) 225–252] the authors proved the existence of unbounded branches of equilibria for λ close to a Steklov eigenvalue of odd multiplicity. In this work, we characterize the stability of such equilibria and analyze several features of the bifurcating branches. We also investigate several question related to the global dynamical properties of the system for different values of the parameter, including the behavior of the attractor of the system when the parameter crosses the first Steklov eigenvalue and the existence of extremal equilibria. We include Appendix A where we prove a uniform antimaximum principle and several results related to the spectral behavior when the potential at the boundary is perturbed. 0022-0396 10.1016/j.jde.2008.09.002 https://hdl.handle.net/20.500.14352/41985 http://www.sciencedirect.com/science/journal/00220396 Equilibria and global dynamics of a problem with bifurcation from infinity