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COMGEO
2008
ACM

Recursive geometry of the flow complex and topology of the flow complex filtration

13 years 11 months ago
Recursive geometry of the flow complex and topology of the flow complex filtration
The flow complex is a geometric structure, similar to the Delaunay tessellation, to organize a set of (weighted) points in Rk. Flow shapes are topological spaces corresponding to substructures of the flow complex. The flow complex and flow shapes have found applications in surface reconstruction, shape matching, and molecular modeling. In this article we give an algorithm for computing the flow complex of weighted points in any dimension. The algorithm reflects the recursive structure of the flow complex. On the basis of the algorithm we establish a topological similarity between flow shapes and the nerve of a corresponding ball set, namely homotopy equivalence. Part of this research was supported by the Deutsche Forschungsgemeinschaft within the European graduate program 'Combinatorics, Geometry, and Computation' (No. GRK 588/2). Also partially supported by the IST Programme of the EU as a Shared-cost RTD(FET Open) Project under Contract No IST-006413 (ACS - Algorithms for ...
Kevin Buchin, Tamal K. Dey, Joachim Giesen, Matthi
Added 09 Dec 2010
Updated 09 Dec 2010
Type Journal
Year 2008
Where COMGEO
Authors Kevin Buchin, Tamal K. Dey, Joachim Giesen, Matthias John
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