In this paper we use the homotopy invariants methods to study the global dynamics of the reaction-diffusion systems that are at resonance at infinity. Considering degrees of the resonance for the nonlinear perturbation we establish Landesman-Lazer type conditions and use them to express the Rybakowski-Conley index of the invariant set consisting of all bounded solutions. Obtained results are applied to study the existence of solutions connecting stationary points for the system of nonlinear heat equations.
Global Dynamics and Photon Loss in the Kompaneets Equation
Universality of global dynamics for the cubic wave equation
Global regularity and convergence to equilibrium of reaction-diffusion systems with nonlinear diffusion
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