subLaplacians

The subLaplacian is a differential operator that arises in the study of subRiemannian geometry, a generalization of Riemannian geometry where the metric is not necessarily defined on the entire tangent bundle. Unlike the standard Laplacian, which is built from the metric tensor and its derivatives, the subLaplacian is constructed using a system of vector fields that span the tangent space only in a restricted sense.

In essence, the subLaplacian is defined as the sum of squares of these vector fields, acting on

SubLaplacians are fundamental to understanding the geometry and analysis on subRiemannian manifolds. They play a role