Functional inequalities and Hamilton-Jacobi Equations in Geodesic Spaces
Abstract
We study the connection between the p--Talagrand inequality and the q--logarithmic Sololev inequality for conjugate exponents p≥ 2, q≤ 2 in proper geodesic metric spaces. By means of a general Hamilton--Jacobi semigroup we prove that these are equivalent, and moreover equivalent to the hypercontractivity of the Hamilton--Jacobi semigroup. Our results generalize those of Lott and Villani. They can be applied to deduce the p-Talagrand inequality in the sub-Riemannian setting of the Heisenberg group.
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