Diffusions under a local strong H\"ormander condition. Part II: tube estimates

Abstract

We study lower and upper bounds for the probability that a diffusion process in Rn remains in a tube around a skeleton path up to a fixed time. We assume that the diffusion coefficients σ1,…,σd may degenerate but they satisfy a strong H\"ormander condition involving the first order Lie brackets around the skeleton of interest. The tube is written in terms of a norm which accounts for the non-isotropic structure of the problem: in a small time δ, the diffusion process propagates with speed δ in the direction of the diffusion vector fields σj and with speed δ=δ× δ in the direction of [σi,σj]. The proof consists in a concatenation technique which strongly uses the lower and upper bounds for the density proved in the part I.