On a kinetic Poincar\'e inequality and beyond

TL;DR

This paper provides a trajectorial proof of a kinetic Poincaré inequality, improving previous results and extending applicability to more general hypoelliptic equations, including Kolmogorov equations with multiple steps.

Contribution

It introduces a new trajectorial approach to the kinetic Poincaré inequality that avoids higher-order commutators and the fundamental solution, broadening the scope to general hypoelliptic equations.

Findings

Improved kinetic Poincaré inequality proof using trajectorial methods.

Method applies to a class of hypoelliptic equations, including Kolmogorov equations.

Avoids reliance on higher-order commutators and fundamental solutions.

Abstract

In this article, we give a trajectorial proof of a kinetic Poincar\'e inequality which plays an important role in the De Giorgi-Nash-Moser theory for kinetic equations. The present work improves a result due to J. Guerand and C. Mouhot [10] in several directions. We use kinetic trajectories along the vector fields $\partial_t + v \cdot \nabla_x$ and $\partial_{v_i}$, $i = 1,\dots, d$ and do not rely on higher-order commutators such as $[\partial_{v_i},\partial_t + v \cdot \nabla_x] = \partial_{x_i}$ or on the fundamental solution. The presented method also applies to more general hypoelliptic equations. We illustrate this by studying a Kolmogorov equation with $k$ steps.