Abstract
A stochastic dynamical context is developed for Bookstein's shape theory. It is shown how Bookstein's shape space for planar triangles arises naturally when the landmarks are moved around by a special Brownian motion on the general linear group of invertible (2×2) real matrices. Asymptotics for the Brownian transition density are used to suggest an exponential family of distributions, which is analogous to the von Mises-Fisher spherical distribution and which has already been studied by J. K. Jensen. The computer algebra implementationItovsn3(W. S. Kendall) of stochastic calculus is used to perform the calculations (some of which actually date back to work by Dyson on eigenvalues of random matrices and by Dynkin on Brownian motion on ellipsoids). An interesting feature of these calculations is that they include the first application (to the author's knowledge) of the Gröbner basis algorithm in a stochastic calculus context.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,Statistics and Probability
Cited by
13 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献
1. On dependent Dirichlet processes for general Polish spaces;Electronic Journal of Statistics;2024-01-01
2. Exploring Errors in Reading a Visualization via Eye Tracking Models Using Stochastic Geometry;HCI in Business, Government and Organizations. Information Systems and Analytics;2019
3. References;Wiley Series in Probability and Statistics;2016-09-05
4. A Model for the Shapes of Advected Triangles;Journal of Statistical Physics;2013-07-11
5. Representation of Radon shape diffusions via hyperspherical Brownian motion;Mathematical Proceedings of the Cambridge Philosophical Society;2008-09