Tubes estimates for diffusion processes under a local H\"ormander condition of order one

Abstract

We consider a diffusion process Xt and a skeleton curve xt(φ) and we give a lower bound for P(t≤ Td(Xt,xt(φ))≤ R). This result is obtained under the hypothesis that the strong H\"ormander condition of order one (which involves the diffusion vector fields and the first Lie brackets) holds in every point xt(φ),0≤ t≤ T. Here d is a distance which reflects the non isotropic behavior of the diffusion process which moves with speed t in the directions of the diffusion vector fields but with speed t in the directions of the first order Lie brackets. We prove that d is locally equivalent with the standard control metric dc and that our estimates hold for dc as well.