A Bourgain–Brezis–Mironescu–Dávila theorem in Carnot groups of step two
Nicola Garofalo, Giulio Tralli
Abstract
In this note we prove the following theorem in any Carnot group of step two $\mathbb{G}$: \[ \underset{s\nearrow 1/2}{\lim} (1 - 2s) \mathfrak P_{H,s}(E) = \frac{4}{\sqrt π}\ \mathfrak P_H(E). \] Here, $\mathfrak P_H(E)$ represents the horizontal perimeter of a measurable set $E\subset \mathbb{G}$, whereas the nonlocal horizontal perimeter $\mathfrak P_{H,s}(E)$ is a heat based Besov seminorm. This result represents a dimensionless sub-Riemannian counterpart of a famous characterisation of Bourgain-Brezis-Mironescu and Dávila.
Topics & Concepts
MathematicsCarnot cycleDimensionless quantityCombinatoricsPerimeterGeometryPhysicsThermodynamicsGeometric Analysis and Curvature FlowsDermatological and Skeletal DisordersNonlinear Partial Differential Equations