Uniform attractors of non-autonomous Kirchhoff wave models

Abstract

The paper investigates the existence and upper semicontinuity of uniform attractors of the perturbed non-autonomous Kirchhoff wave equations with strong damping and supercritical nonlinearity: utt- ut-(1+ε\|∇ u\|2) u+f(u)=g(x,t), where ε∈ [0,1] is a perturbed parameter. It shows that when the nonlinearity f(u) is of supercritical growth p: N+2N-2=p*<p<p**=N+4(N-4)+: (i) the related evolution process has a compact uniform attractor A for each ε∈ [0,1]; (ii) the family of uniform attractor A is upper semicontinuous on the perturbed parameter ε in the sense of partially strong topology.