A family of stable diffusions
Abstract
Consider a C∞ closed connected Riemannian manifold (M, g) with negative curvature. The unit tangent bundle SM is foliated by the (weak) stable foliation Ws of the geodesic flow. Let s be the leafwise Laplacian for Ws and let X be the geodesic spray, i.e., the vector field that generates the geodesic flow. For each λ, the operator Lλ:=s+λ X generates a diffusion for Ws. We show that, as λ -∞, the unique stationary probability measure for the leafwise diffusion of Lλ converges to the normalized Lebesgue measure on SM.
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