Stability of attractors for the Kirchhoff wave equation with strong damping and critical nonlinearities

Abstract

The paper investigates longtime dynamics of the Kirchhoff wave equation with strong damping and critical nonlinearities: utt−(1+ϵ‖∇u‖2)Δu−Δut+h(ut)+g(u)=f(x), with ϵ∈[0,1]. The well-posedness and the existence of global and exponential attractors are established, and the stability of the attractors on the perturbation parameter ϵ is proved for the IBVP of the equation provided that both nonlinearities h(s) and g(s) are of critical growth.