We prove several functional and geometric inequalities only assuming the linearity and a quantitative L∞-to-Lipschitz smoothing of the heat semigroup in metric-measure spaces. Our results comprise a Buser inequality, a lower bound on the size of the nodal set of a Laplacian eigenfunction, and different estimates involving the Wasserstein distance. The approach works in a large variety of settings, including Riemannian manifolds with a variable Kato-type lower bound on the Ricci curvature tensor, RCD(K,∞) spaces, and some sub-Riemannian structures, such as Carnot groups, the Grushin plane and the SU(2) group.
Properties of Lipschitz Smoothing Heat Semigroups
Stefani, Giorgio
2025
Abstract
We prove several functional and geometric inequalities only assuming the linearity and a quantitative L∞-to-Lipschitz smoothing of the heat semigroup in metric-measure spaces. Our results comprise a Buser inequality, a lower bound on the size of the nodal set of a Laplacian eigenfunction, and different estimates involving the Wasserstein distance. The approach works in a large variety of settings, including Riemannian manifolds with a variable Kato-type lower bound on the Ricci curvature tensor, RCD(K,∞) spaces, and some sub-Riemannian structures, such as Carnot groups, the Grushin plane and the SU(2) group.
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