Trend to equilibrium for granular media equations under non-convex potential and application to log gases

Abstract

We derive new HWI inequalities for the granular media equation, which external potential V and interaction potential W are only strictly convex on complementary parts of the space. Particularly, potentials are not assumed convex. After solving technicalities related to the singularity of a logarithmic W, we apply our result to obtain stability rates of log gases under non-strictly convex or quartic external potentials. We prove that the distribution of a log gas converges towards an equilibrium with respect to the Wasserstein distance at a square root rate. Finally, we establish exponential stability of log gases under the double-well potential V(x) = x44 + cx22, c < 0 and the non-confining potential V(x) = gx44 + x22, g<0 for |c| and |g| small enough.