Cauchy surface area formula in the Heisenberg groups

Abstract

We show the analogy of Cauchy's surface area formula for the Heisenberg groups Hn for n≥ 1, which states that the p-area of any compact hypersurface in Hn with its p-normal vector defined almost everywhere on is the average of its projected p-areas onto the orthogonal complements of all p-normal vectors of the Pansu spheres (up to a constant). The formula provides a geometric interpretation of the p-areas defined by Cheng-Hwang-Malchiodi-Yang [9] in H1 and Cheng-Hwang-Yang [7] in Hn for n≥ 2. We also characterize the projected areas for rotationally symmetric domains in Hn, namely, for any rotationally symmetric domain with boundary in Hn, its projected p-area onto the orthogonal complement of any normal vector of the Pansu spheres is a constant, independent of the choices of the projected directions.