Dimension of attractors and invariant sets of damped wave equations in unbounded domains

Abstract

Under fairly general assumptions, we prove that every compact invariant set I of the semiflow generated by the semilinear damped wave equation utt+α ut+β(x)u- = f(x,u), (t,x)∈[0,+∞[×, u = 0, (t,x)∈[0,+∞[×∂ in H10()× L2() has finite Hausdorff and fractal dimension. Here is a regular, possibly unbounded, domain in 3 and f(x,u) is a nonlinearity of critical growth. The nonlinearity f(x,u) needs not to satisfy any dissipativeness assumption and the invariant subset I needs not to be an attractor. If f(x,u) is dissipative and I is the global attractor, we give an explicit bound on the Hausdorff and fractal dimension of I$ in terms of the structure parameters of the equation.