Diffusion on Some Simple Stratified Spaces

Nye, T. M. W.; White, M. C.

doi:10.1007/s10851-013-0457-0

Diffusion on Some Simple Stratified Spaces

Published: 11 September 2013

Volume 50, pages 115–125, (2014)
Cite this article

Journal of Mathematical Imaging and Vision Aims and scope Submit manuscript

T. M. W. Nye¹ &
M. C. White¹

529 Accesses
Explore all metrics

Abstract

A variety of different imaging techniques produce data which naturally lie in stratified spaces. These spaces consist of smooth regions of maximal dimension glued together along lower dimensional boundaries. Diffusion processes are important as they can be used to represent noise in statistical models on spaces for which standard parametric probability distributions do not exist. We consider particles undergoing Brownian motion in some low dimensional stratified spaces, and obtain analytic solutions to the heat equation specifying the distribution of particles. These solutions play the role of prototypical distributions for studying behaviour near singularities. While probabilistic reasoning can be used to solve the heat equation in some straightforward cases, more generally we construct solutions from eigenfunctions of the Laplacian. Specifically, we solve the heat equation on: open books; two-dimensional cones; the Petersen graph with unit edge length; and the cone of this graph which corresponds to a space of evolutionary trees.

This is a preview of subscription content, log in via an institution to check access.

Access this article

Log in via an institution

Subscribe and save

Springer+ Basic

$34.99 /Month

Get 10 units per month
Download Article/Chapter or eBook
1 Unit = 1 Article or 1 Chapter
Cancel anytime

Buy Now

Price excludes VAT (USA)
Tax calculation will be finalised during checkout.

Instant access to the full article PDF.

Institutional subscriptions

References

Aydin, B., Pataki, G., Wang, H., Bullitt, E., Marron, J.: A principal component analysis for trees. Ann. Appl. Stat. 3(4), 1597–1615 (2009)
Article MATH MathSciNet Google Scholar
Billera, L., Holmes, S., Vogtmann, K.: Geometry of the space of phylogenetic trees. Adv. Appl. Math. 27, 733–767 (2001)
Article MATH MathSciNet Google Scholar
Boas, M.: Mathematical methods in the physical sciences. Wiley, New York (2006)
MATH Google Scholar
Brin, M., Kifer, Y.: Brownian motion, harmonic functions and hyperbolicity for Euclidean complexes. Math. Z. 237(3), 421–468 (2001)
Article MATH MathSciNet Google Scholar
Cattaneo, C.: The spectrum of the continuous Laplacian on a graph. Monatshefte Math. 124(3), 215–235 (1997)
Article MATH MathSciNet Google Scholar
Dryden, I., Mardia, K.: Statistical analysis of shape. Wiley, New York (1998)
Google Scholar
Feragen, A., Lauze, F., Lo, P., de Bruijne, M., Nielsen, M.: Geometries on spaces of treelike shapes. In: ACCV 2010 Proceedings, pp. 160–173 (2011)
Google Scholar
Feragen, A., Lo, P., Gorbunova, V., Nielsen, M., Dirksen, A., Reinhardt, J., Lauze, F., de Bruijne, M.: An airway tree-shape model for geodesic airway branch labeling. MICCAI workshop on Math. Found. Comp. Anat. (2011)
Hotz, T., Huckemann, S., Le, H., Marron, J., Mattingly, J., Miller, E., Nolen, J., Owen, M., Patrangenaru, V., Skwerer, S.: Sticky central limit theorems on open books (2012). arXiv:1202.4267
Wang, H., Marron, J.: Object oriented data analysis: sets of trees. Ann. Stat. 35(5), 1849–1873 (2007)
Article MATH MathSciNet Google Scholar

Download references

Author information

Authors and Affiliations

School of Mathematics and Statistics, Newcastle University, Newcastle upon Tyne, UK
T. M. W. Nye & M. C. White

Authors

T. M. W. Nye
View author publications
You can also search for this author in PubMed Google Scholar
M. C. White
View author publications
You can also search for this author in PubMed Google Scholar

Corresponding author

Correspondence to T. M. W. Nye.

Electronic Supplementary Material

Below is the link to the electronic supplementary material.