Invariant measure and large time dynamics of the cubic Klein-Gordon equation in 3D

Abstract

In this paper we construct an invariant probability measure concentrated on H2(K)× H1(K) for a general cubic Klein-Gordon equation (including the case of the wave equation). Here K represents both the 3-dimensional torus or a bounded domain with smooth boundary in R3. That allows to deduce some corollaries on the long time behaviour of the flow of the equation in a probabilistic sense. We also establish qualitative properties of the constructed measure. This work extends the Fluctuation-Dissipation-Limit (FDL) approach to PDEs having only one (coercive) conservation law.