A surface area formula for compact hypersurfaces in Rn

Abstract

The classical result of Cauchy's surface area formula states that the surface area of the boundary ∂ K= of any n-dimensional convex body in the n-dimensional Euclidean space Rn can be obtained by the average of the projected areas of along all directions in Sn-1. In this notes, we generalize the formula to the boundary of arbitrary n-dimensional submanifolds in Rn by defining a natural notion of projected areas along any direction in Sn-1. This surface area formula derived from the new concept coincides with not only the result of the Crofton's formula but that of De Jong de2013volume by using tubular neighborhood. We also define the projected r-volumes of onto any r-dimensional subspaces, and obtain a recursive formula for mean projected r-volumes of .