Large time behaviour for the semigroup of the kinetic Brownian motion in the plane
Abstract
We establish an integration by parts formula for the semi-group in time T > 0 of the kinetic Brownian motion in the Euclidean plane together with its speed in the circle. The stochastic differential equation of our kinetic Brownian motion is driven here by one real-valued Brownian motion constructed with an orthonormal basis of L2([0,T], R) and an independent sequence of N(0,1) random variables. Our method is based on an explicit computation of a Malliavin dual in the Gaussian space. We are mainly interested in large time T. From our integration by parts, we obtain gradient estimates including a reverse Poincar\'e inequality for the semi-group. As a direct consequence, we also obtain a Liouville property for the generator of the kinetic Brownian motion and its speed: all bounded harmonic functions are constant.
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