Threshold phenomena for random cones
Abstract
We consider an even probability distribution on the -dimensional Euclidean space with the property that it assigns measure zero to any hyperplane through the origin. Given independent random vectors with this distribution, under the condition that they do not positively span the whole space, the positive hull of these vectors is a random polyhedral cone (and its intersection with the unit sphere is a random spherical polytope). It was first studied by Cover and Efron. We consider the expected face numbers of these random cones and describe a threshold phenomenon when the dimension and the number of random vectors tend to infinity. In a similar way, we treat the solid angle, and more generally the Grassmann angles. We further consider the expected numbers of -faces and of Grassmann angles of index when also tends to infinity.
Keywords
Cite
@article{arxiv.2004.11473,
title = {Threshold phenomena for random cones},
author = {Daniel Hug and Rolf Schneider},
journal= {arXiv preprint arXiv:2004.11473},
year = {2020}
}