Kinematic formulas for sets defined by differences of convex functions
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...
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| Main Authors | , , |
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| Format | Journal Article |
| Language | English |
| Published |
13.05.2015
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| Subjects | |
| Online Access | Get full text |
| DOI | 10.48550/arxiv.1505.03388 |
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| Summary: | 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 \WDC~
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
$(M, G) = (\mathbb R^d, \overline{SO(d)})$, 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. |
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| DOI: | 10.48550/arxiv.1505.03388 |