Finite-dimensional attractors for the quasi-linear strongly-damped wave equation

Abstract

We present a new method of investigating the so-called quasi-linear strongly damped wave equations ∂t2u-γ∂tx u-x u+f(u)= ∇x· φ'(∇x u)+g in bounded 3D domains. This method allows us to establish the existence and uniqueness of energy solutions in the case where the growth exponent of the non-linearity φ is less than 6 and f may have arbitrary polynomial growth rate. Moreover, the existence of a finite-dimensional global and exponential attractors for the solution semigroup associated with that equation and their additional regularity are also established. In a particular case φ0 which corresponds to the so-called semi-linear strongly damped wave equation, our result allows to remove the long-standing growth restriction |f(u)|≤ C(1+ |u|5).