Area of Hölder curves and coarea formula on the Heisenberg group

Abstract

We prove the coarea formula for Lipschitz maps from the subriemannian nth Heisenberg group Hn to R2n. Our result is new even when n=1 and provides the simplest vector-valued instance of the coarea formula in subriemannian geometry. This answers a question left open in the works of Magnani, Kozhevnikov, Magnani--Stepanov--Trevisan, and Julia--Nicolussi Golo--Vittone. The main difficulty of the proof is that a fiber of a C1H map f: Hn R2n is typically an unrectifiable curve. Its measure depends on the symplectic area of its projection to R2n. A bound on this area would imply the coarea formula, but examples of Kozhevnikov show that this area can be infinite or undefined. To overcome this, we introduce an integral that we use to define both the symplectic area of 12--Hölder curves in R2n and the symplectic area of projections of vertical curves in Hn. Then, we give a geometric condition for this integral to converge. This yields, in addition, new results on the existence of the signed area of 12--Hölder planar curves that may be of independent interest. Finally, we use β--number estimates from the Fässler--Orponen Dorronsoro Theorem to show that this geometric condition holds for almost every fiber.