Semigroup properties for the second fundamental form.
On Gromov's theorem and -Hodge decomposition.
L¹-convergence and hypercontractivity of diffusion semigroups on manifolds
Let be the Markov semigroup generated by a weighted Laplace operator on a Riemannian manifold, with μ an invariant probability measure. If the curvature associated with the generator is bounded below, then the exponential convergence of in L¹(μ) implies its hypercontractivity. Consequently, under this curvature condition L¹-convergence is a property stronger than hypercontractivity but weaker than ultracontractivity. Two examples are presented to show that in general, however, L¹-convergence...
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