Random Triangles and Polygons in the Plane
Abstract
We consider the problem of finding the probability that a random triangle is obtuse, which was first raised by Lewis Caroll. Our investigation leads us to a natural correspondence between plane polygons and the Grassmann manifold of 2-planes in real -space proposed by Allen Knutson and Jean-Claude Hausmann. This correspondence defines a natural probability measure on plane polygons. In these terms, we answer Caroll's question. We then explore the Grassmannian geometry of planar quadrilaterals, providing an answer to Sylvester's four-point problem, and describing explicitly the moduli space of unordered quadrilaterals. All of this provides a concrete introduction to a family of metrics used in shape classification and computer vision.
Cite
@article{arxiv.1702.01027,
title = {Random Triangles and Polygons in the Plane},
author = {Jason Cantarella and Tom Needham and Clayton Shonkwiler and Gavin Stewart},
journal= {arXiv preprint arXiv:1702.01027},
year = {2019}
}
Comments
24 pages, 4 figures