A sub-Riemannian Santal\'o formula with applications to isoperimetric inequalities and first Dirichlet eigenvalue of hypoelliptic operators

TL;DR

This paper establishes a sub-Riemannian Santaló formula applicable to various geometric structures, leading to sharp inequalities and bounds for the first Dirichlet eigenvalue of hypoelliptic operators, with applications to specific manifolds.

Contribution

It introduces a general sub-Riemannian Santaló formula and applies it to derive isoperimetric and eigenvalue bounds in hypoelliptic geometry contexts.

Findings

Derived sharp isoperimetric inequalities.

Established a universal lower bound for the first Dirichlet eigenvalue.

Validated results on complex and quaternionic Hopf fibrations.

Abstract

In this paper we prove a sub-Riemannian version of the classical Santal\'o formula: a result in integral geometry that describes the intrinsic Liouville measure on the unit cotangent bundle in terms of the geodesic flow. Our construction works under quite general assumptions, satisfied by any sub-Riemannian structure associated with a Riemannian foliation with totally geodesic leaves (e.g. CR and QC manifolds with symmetries), any Carnot group, and some non-equiregular structures such as the Martinet one. A key ingredient is a "reduction procedure" that allows to consider only a simple subset of sub-Riemannian geodesics. As an application, we derive isoperimetric-type and (p-)Hardy-type inequalities for a compact domain $M$ with piecewise $C^{1,1}$ boundary, and a universal lower bound for the first Dirichlet eigenvalue $\lambda_1(M)$ of the sub-Laplacian, \[ \lambda_1(M) \geq \frac{k \pi^2}{L^2}, \] in terms of the rank $k$ of the distribution and the length $L$ of the longest reduced sub-Riemannian geodesic contained in $M$. All our results are sharp for the sub-Riemannian structures on the hemispheres of the complex and quaternionic Hopf fibrations: \[ \mathbb{S}^1\hookrightarrow \mathbb{S}^{2d+1} \xrightarrow{p} \mathbb{CP}^d, \qquad \mathbb{S}^3\hookrightarrow \mathbb{S}^{4d+3} \xrightarrow{p} \mathbb{HP}^d, \qquad d \geq 1, \] where the sub-Laplacian is the standard hypoelliptic operator of CR and QC geometries, $L = \pi$ and $k=2d$ or $4d$, respectively.