English

Persistent Cohomology and Circular Coordinates

Algebraic Topology 2009-06-12 v1 Computational Geometry

Abstract

Nonlinear dimensionality reduction (NLDR) algorithms such as Isomap, LLE and Laplacian Eigenmaps address the problem of representing high-dimensional nonlinear data in terms of low-dimensional coordinates which represent the intrinsic structure of the data. This paradigm incorporates the assumption that real-valued coordinates provide a rich enough class of functions to represent the data faithfully and efficiently. On the other hand, there are simple structures which challenge this assumption: the circle, for example, is one-dimensional but its faithful representation requires two real coordinates. In this work, we present a strategy for constructing circle-valued functions on a statistical data set. We develop a machinery of persistent cohomology to identify candidates for significant circle-structures in the data, and we use harmonic smoothing and integration to obtain the circle-valued coordinate functions themselves. We suggest that this enriched class of coordinate functions permits a precise NLDR analysis of a broader range of realistic data sets.

Keywords

Cite

@article{arxiv.0905.4887,
  title  = {Persistent Cohomology and Circular Coordinates},
  author = {Vin de Silva and Mikael Vejdemo-Johansson},
  journal= {arXiv preprint arXiv:0905.4887},
  year   = {2009}
}

Comments

10 pages, 7 figures. To appear in the proceedings of the ACM Symposium on Computational Geometry 2009

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