Viscous Aubry-Mather theory and the Vlasov equation
Abstract
The Vlasov equation models a group of particles moving under a potential V; moreover, each particle exerts a force, of potential W, on the other ones. We shall suppose that these particles move on the p-dimensional torus Tp and that the interaction potential W is smooth. We are going to perturb this equation by a Brownian motion on Tp; adapting to the viscous case methods of Gangbo, Nguyen, Tudorascu and Gomes, we study the existence of periodic solutions and the asymptotics of the Hopf-Lax semigroup.
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