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Model selection for simplicial approximation| old_uid | 7475 |
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| title | Model selection for simplicial approximation |
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| start_date | 2009/10/19 |
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| schedule | 13h30 |
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| online | no |
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| location_info | V106 |
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| summary | In the computational geometry field, simplicial complexes have been used to describe
an underlying geometric shape knowing a point cloud sampled on it. In this article, an adequate
statistical framework is first proposed for the choice of a simplicial complex among a parametrized
family. A least squares penalized criterion is introduced to choose a complex, and a model selection theorem states how to select the “best” model, with a statistical point of view. This result gives the shape of the penalty, and next, the so called “slope heuristics method” is used to calibrate the penalty from the data. Some experimental studies on simulated and real dataset illustrate the method for the selection of graphs in two dimensions.
Key-words: computational geometry, geometrical inference, simplicial complexes, model selection, penalization, slope heuristics. |
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| responsibles | Biau, Stoltz, Massart |
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