Non co-adapted couplings of Brownian motions on free, step 2 Carnot groups
Abstract
On the free, step 2 Carnot groups of rank n Gn, the subRiemannian Brownian motion consists in a Rn-Brownian motion together with its n(n-1)2 L\'evy areas. In this article we construct an explicit successful non co-adapted coupling of Brownian motions on Gn. We use this construction to obtain gradient inequalities for the heat semi-group on all the homogeneous step 2 Carnot groups. Comparing the first coupling time and the first exit time from a domain, we also obtain gradient inequalities for harmonic functions on Gn. These results generalize the coupling strategy by Banerjee, Gordina and Mariano on the Heisenberg group.
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