Vines and vineyards by updating persistence in linear time

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Vines and vineyards by updating persistence in linear time

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Annual Symposium on Computational Geometry archive
Proceedings of the twenty-second annual symposium on Computational geometry table of contents

Sedona, Arizona, USA

SESSION: Session 5A (tuesday, june 6th--9:00-10:15 am) table of contents

Pages: 119 - 126

Year of Publication: 2006

ISBN:1-59593-340-9

Authors

David Cohen-Steiner	INRIA, Sophia-Antipolis, France
Herbert Edelsbrunner	Duke University, Durham, NC
Dmitriy Morozov	Duke University, Durham, NC

Sponsors

ACM: Association for Computing Machinery
SIGACT: ACM Special Interest Group on Algorithms and Computation Theory
SIGGRAPH: ACM Special Interest Group on Computer Graphics and Interactive Techniques

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ACM New York, NY, USA

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Downloads (6 Weeks): 10, Downloads (12 Months): 41, Citation Count: 2

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ABSTRACT

Persistent homology is the mathematical core of recent work on shape, including reconstruction, recognition, and matching. Its pertinent information is encapsulated by a pairing of the critical values of a function, visualized by points forming a diagram in the plane. The original algorithm in [10] computes the pairs from an ordering of the simplices in a triangulation and takes worst-case time cubic in the number of simplices. The main result of this paper is an algorithm that maintains the pairing in worst-case linear time per transposition in the ordering. A side-effect of the algorithm's analysis is an elementary proof of the stability of persistence diagrams [7] in the special case of piecewise-linear functions. We use the algorithm to compute 1-parameter families of diagrams which we apply to the study of protein folding trajectories.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

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CITED BY 2

	Herbert Edelsbrunner , Dmitriy Morozov , Valerio Pascucci, Persistence-sensitive simplification functions on 2-manifolds, Proceedings of the twenty-second annual symposium on Computational geometry, June 05-07, 2006, Sedona, Arizona, USA
	S. Biasotti , A. Cerri , P. Frosini , D. Giorgi , C. Landi, Multidimensional Size Functions for Shape Comparison, Journal of Mathematical Imaging and Vision, v.32 n.2, p.161-179, October 2008