Franck Hétroy scite author profile

Franck Hétroy

3Publications

46Citation Statements Received

98Citation Statements Given

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Affiliations

Laboratoire Jean Kuntzmann, French Institute for Research in Computer Science and Automation, Grenoble Alpes University

Publications

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An iterative algorithm for homology computation on simplicial shapes

Boltcheva¹,

Canino²,

Aceituno³

et al. 2011

Computer-Aided Design

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We propose a new iterative algorithm for computing the homology of arbitrary shapes discretized through simplicial complexes, We demonstrate how the simplicial homology of a shape can be effectively expressed in terms of the homology of its sub-components. The proposed algorithm retrieves the complete homological information of an input shape including the Betti numbers, the torsion coefficients and the representative homology generators.To the best of our knowledge, this is the first algorithm based on the constructive Mayer-Vietoris sequence, which relates the homology of a topological space to the homologies of its sub-spaces, i.e. the sub-components of the input shape and their intersections. We demonstrate the validity of our approach through a specific shape decomposition, based only on topological properties, which minimizes the size of the intersections between the sub-components and increases the efficiency of the algorithm.

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Topological quadrangulations of closed triangulated surfaces using the Reeb graph

Hétroy

Attali

2003

Graphical Models

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Although surfaces are more and more often represented by dense triangulations, it can be useful to convert them to B-spline surface patches, lying on quadrangles. This paper presents a method for the construction of coarse topological quadrangulations of closed triangulated surfaces, based on Morse theory. In order to construct on the surface a quadrangulation of its canonical polygonal schema, we compute first a Reeb graph then a canonical set of generators embedded on the surface. Some results are shown on different surfaces.

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Segmentation of temporal mesh sequences into rigidly moving components

et al. 2013

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International audienceIn this paper is considered the segmentation of meshes into rigid components given temporal sequences of deforming meshes. We propose a fully automatic approach that identifies model parts that consistently move rigidly over time. This approach can handle meshes independently reconstructed at each time instant. It allows therefore for sequences of meshes with varying connectivities as well as varying topology. It incrementally adapts, merges and splits segments along a sequence based on the coherence of motion information within each segment. In order to provide tools for the evaluation of the approach, we also introduce new criteria to quantify a mesh segmentation. Results on both synthetic and real data as well as comparisons are provided in the paper

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Franck Hétroy

An iterative algorithm for homology computation on simplicial shapes

Topological quadrangulations of closed triangulated surfaces using the Reeb graph

Segmentation of temporal mesh sequences into rigidly moving components

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