Moment estimates, exponential integrability, concentration inequalities and exit times estimates on evolving manifolds
Abstract
On a smooth (not necessarily compact) manifold M equipped with a C1-family of complete Riemannian metrics g(t) and a C1,∞-family of vector fields Z(t) both indexed by the real interval [0,T) where T ∈ (0,∞], we prove moment estimates, exponential integrability, concentration inequalities and exit times estimates for diffusions on complete evolving Riemannian manifolds.
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