Invariant measure for the Klein-Gordon equation in a non periodic setting
Abstract
In this paper, we build a Gibbs measure for the 1d cubic Klein-Gordon equation on R with a decreasing non linearity, in the sense that the non linearity f3 is multiplied by where is a sufficiently integrable non negative function. We prove that this equation is almost surely globally well-posed in H1/2-loc with respect to this measure and that the measure is invariant under the flow of the equation.
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