Kinematic formulas for sets defined by differences of convex functions

Abstract

Two of the authors have defined the class WDC(M) as the class of all subsets of a smooth manifold M that may be expressed in local coordinates as certain sublevel sets of DC (differences of convex) functions. If M is Riemanian and G is a group of isometries acting transitively on the sphere bundle SM, we define the invariant curvature measures of compact ~ subsets of M, and show that pairs of such subsets are subject to the array of kinematic formulas known to apply to smoother sets. Restricting to the case (M, G) = ( Rd, SO(d)), this extends and subsumes Federer's theory of sets with positive reach in an essential way. The key technical point is equivalent to a sharpening of a classical theorem of Ewald, Larman, and Rogers characterizing the dimension of the set of directions of line segments lying in the boundary of a given convex body.