Poisson polyhedra in high dimensions
Autor(en): | Hoerrmann, Julia Hug, Daniel Reitzner, Matthias Thaele, Christoph |
Stichwörter: | BODIES; Dual intrinsic volume; f-Vector; High dimensional polyhedra; HYPERPLANE CONJECTURE; Hyperplane tessellation; Isoperimetric ratio; ISOTROPY CONSTANT; Mathematics; Poisson Voronoi tessellation; Random polyhedron; SPACES; VOLUME; Zero cell | Erscheinungsdatum: | 2015 | Herausgeber: | ACADEMIC PRESS INC ELSEVIER SCIENCE | Journal: | ADVANCES IN MATHEMATICS | Volumen: | 281 | Startseite: | 1 | Seitenende: | 39 | Zusammenfassung: | The zero cell of a parametric class of random hyperplane tessellations depending on a distance exponent and an intensity parameter is investigated, as the space dimension tends to infinity. The model includes the zero cell of stationary and isotropic Poisson hyperplane tessellations as well as the typical cell of a stationary Poisson Voronoi tessellation as special cases. It is shown that asymptotically in the space dimension, with overwhelming probability these cells satisfy the hyperplane conjecture, if the distance exponent and the intensity parameter are suitably chosen dimension-dependent functions. Also the high dimensional limits of the mean number of faces are explored and the asymptotic behaviour of an isoperimetric ratio is analysed. In the background are new identities linking the f-vector of the zero cell to certain dual intrinsic volumes. (C) 2015 Elsevier Inc. All rights reserved. |
ISSN: | 00018708 | DOI: | 10.1016/j.aim.2015.03.025 |
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geprüft am 12.05.2024