English

The covariogram determines three-dimensional convex polytopes

Metric Geometry 2010-03-10 v1 Classical Analysis and ODEs Probability

Abstract

The cross covariogram g_{K,L} of two convex sets K, L in R^n is the function which associates to each x in R^n the volume of the intersection of K with L+x. The problem of determining the sets from their covariogram is relevant in stochastic geometry, in probability and it is equivalent to a particular case of the phase retrieval problem in Fourier analysis. It is also relevant for the inverse problem of determining the atomic structure of a quasicrystal from its X-ray diffraction image. The two main results of this paper are that g_{K,K} determines three-dimensional convex polytopes K and that g_{K,L} determines both K and L when K and L are convex polyhedral cones satisfying certain assumptions. These results settle a conjecture of G. Matheron in the class of convex polytopes. Further results regard the known counterexamples in dimension n>=4. We also introduce and study the notion of synisothetic polytopes. This concept is related to the rearrangement of the faces of a convex polytope.

Keywords

Cite

@article{arxiv.0805.1605,
  title  = {The covariogram determines three-dimensional convex polytopes},
  author = {Gabriele Bianchi},
  journal= {arXiv preprint arXiv:0805.1605},
  year   = {2010}
}

Comments

32 pages, 3 figures, major revision with respect to version previously sent by email to some colleagues

R2 v1 2026-06-21T10:39:26.893Z