0000000001225386

AUTHOR

Bastien Durix

showing 2 related works from this author

Skeleton-Based Multiview Reconstruction

2016

International audience; The advantage of skeleton-based 3D reconstruction is to completely generate a single 3D object from well chosen views. Having numerous views is necessary for a reliable reconstruction but projections of skeletons lead to different topologies. We reconstruct 3D objects with curved medial axis (whose topology is a tree) from the perspective skeletons on an arbitrary number of calibrated acquisitions. The main contribution is to estimate the 3D skeleton, from multiple images: its topology is chosen as the closest to those of the perspective skeletons on the set of images, which means that the number of topology changes to map the 3D skeleton topology to topologies on im…

topologyreconstruction[SPI] Engineering Sciences [physics]ComputingMethodologies_IMAGEPROCESSINGANDCOMPUTERVISION02 engineering and technologyIterative reconstructionSkeleton (category theory)Network topologyGraph-edit distanceTopology[SPI]Engineering Sciences [physics]Traitement des imagesMedial axis[ INFO.INFO-TI ] Computer Science [cs]/Image Processing0202 electrical engineering electronic engineering information engineering[ SPI ] Engineering Sciences [physics]Traitement du signal et de l'imageComputer visionSynthèse d'image et réalité virtuelleTopology (chemistry)SkeletonMathematicsComputingMethodologies_COMPUTERGRAPHICSbusiness.industry3D reconstructionPerspective (graphical)020207 software engineeringVision par ordinateur et reconnaissance de formesIntelligence artificielle[SPI.TRON] Engineering Sciences [physics]/Electronics[ SPI.TRON ] Engineering Sciences [physics]/Electronics[SPI.TRON]Engineering Sciences [physics]/Electronics[INFO.INFO-TI] Computer Science [cs]/Image Processing [eess.IV]Shock graphs[INFO.INFO-TI]Computer Science [cs]/Image Processing [eess.IV]graph-edit distance020201 artificial intelligence & image processingTopological skeletonArtificial intelligenceShapesReconstructionbusiness
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Surface canal, squelette et espace des sphères

2016

A canal surface is the envelope of a one-parameter familly of oriented spheres. With the knowledge of center an radius functions associated to it, it is easy to compute a parametrisation of the surface. In this article, we study the inverse operation, which is the search for the spheres in the canal surface. By selecting a point on the boundary and using the sphere space, we estimate the maximal sphere tangent with this point and a second point on the boundary. Furthermore, we estimate a second sphere, which allows to build the characteiristic circle of the canal surface. So this article consists in a new approach of the skeletonization of an object. Indeed, a skeleton is a shape representa…

espace des sphères[MATH] Mathematics [math][MATH.MATH-MG] Mathematics [math]/Metric Geometry [math.MG][MATH]Mathematics [math][MATH.MATH-MG]Mathematics [math]/Metric Geometry [math.MG]squeletteMots-clés : Surface canal
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