English

Rotational Crofton Formulae with a Fixed Subspace

Metric Geometry 2023-10-03 v1

Abstract

The classical Crofton formula explains how intrinsic volumes of a convex body KK in nn-dimensional Euclidean space can be obtained from integrating a measurement function at sections of KK with invariantly moved affine flats. Motivated by stereological applications, we present variants of Crofton's formula, where the flats are constrained to contain a fixed linear subspace L0L_0, but are otherwise invariantly rotated. This main result generalizes a known rotational Crofton formula, which only covers the case dimL0=0\dim L_0=0. The proof combines a suitable Blaschke--Petkantschin formula with the classical Crofton formula. We also argue that our main result is best possible, in the sense that one cannot estimate intrinsic volumes of a set, based on lower-dimensional sections, other than those given by our result. Finally, we provide a proof for a well-established variant: an integral relation for vertical sections. Our formula is stated for intrinsic volumes of a given set, complementing the classical approach for Hausdorff measures.

Keywords

Cite

@article{arxiv.2308.11972,
  title  = {Rotational Crofton Formulae with a Fixed Subspace},
  author = {Emil Dare and Markus Kiderlen},
  journal= {arXiv preprint arXiv:2308.11972},
  year   = {2023}
}
R2 v1 2026-06-28T12:02:16.122Z