Sharp hypocoercive convergence estimates for underdamped Langevin dynamics via the modified L2 method

Abstract

In this note, we consider the underdamped Langevin dynamics with invariant measure μ(dx\,dv) e-U(x)-|v|2/2\,dx\,dv. Assume that the position marginal μx(dx) e-U(x)\,dx satisfies a Poincar\'e inequality with constant m>0, and that ∇2 U -K\,Id for some K 0. We revisit the modified L2 method of Dolbeault--Mouhot--Schmeiser, employing a gap-shifted corrector equation* Am=(m- Lo)-1(Lav)*, equation* where Lo=x-∇ U·∇x is the overdamped generator, La is the generator of the Hamiltonian flow, and v denotes averaging over the velocity variable. We establish an explicit hypocoercive L2-convergence rate equation* =16(2+K2m+4+K2m)m. equation* In particular, for convex U, this recovers the optimal O(m) rate.