Your search keyword '"Nicolas Szafran"' showing total 6 results

1. Construction and smoothing of triangular Coons patches with geodesic boundary curves

Author

Nicolas Szafran, Luc Biard, Rida T. Farouki, Department of Mechanical and Aeronautical Engineering (MAE), University of California [Davis] (UC Davis), University of California-University of California, Modélisation Géométrique & Multirésolution pour l'Image (MGMI), Laboratoire Jean Kuntzmann (LJK), and Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)

Subjects

Pure mathematics, Geodesic, Coordinate system, Aerospace Engineering, 010103 numerical & computational mathematics, 02 engineering and technology, 01 natural sciences, Combinatorics, 0202 electrical engineering, electronic engineering, information engineering, Regular space, Geodesic curves, 0101 mathematics, Mathematics, Curvilinear coordinates, 020207 software engineering, [INFO.INFO-MO]Computer Science [cs]/Modeling and Simulation, Computer Graphics and Computer-Aided Design, Coons interpolation, Spline (mathematics), Tensor product, [MATH.MATH-DG]Mathematics [math]/Differential Geometry [math.DG], Modeling and Simulation, Bounded function, Automotive Engineering, Surface reconstruction, Smoothing

Abstract

International audience; Given three regular space curves r1(t), r2(t), r3(t) for t in [0,1] that define a curvilinear triangle, we consider the problem of constructing a triangular surface patch R(u1,u2,u3) bounded by these three curves, such that they are geodesics of the constructed surface. Results from a prior study (Farouki et al., 2009a) concerned with tensor-product patches are adapted to identify constraints on the given curves for the existence of such geodesic-bounded triangular surface patches. For curves satisfying these conditions, the patch is constructed by means of a cubically-blended triangular Coons interpolation scheme. A formulation of thin-plate spline energy in terms of barycentric coordinates with respect to a general domain triangle is also derived, and used to optimize the smoothness of the geodesic-bounded triangular surface patches.

Published

2010

2. Construction of Bézier surface patches with Bézier curves as geodesic boundaries

Author

Luc Biard, Nicolas Szafran, Rida T. Farouki, Department of Mechanical and Aeronautical Engineering (MAE), University of California [Davis] (UC Davis), University of California-University of California, Modélisation Géométrique & Multirésolution pour l'Image (MGMI), Laboratoire Jean Kuntzmann (LJK), and Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)

Subjects

Bézier surface, Surface (mathematics), Pure mathematics, Polynomial, Geodesic, 010103 numerical & computational mathematics, 02 engineering and technology, Bézier curves and surfaces, [INFO.INFO-CG]Computer Science [cs]/Computational Geometry [cs.CG], 01 natural sciences, Industrial and Manufacturing Engineering, Hermite/Coons interpolation, surface reconstruction, 0202 electrical engineering, electronic engineering, information engineering, 0101 mathematics, Mathematics, Rational surface, Mathematical analysis, Interpolation (computer graphics), geodesic curves, 020207 software engineering, [INFO.INFO-MO]Computer Science [cs]/Modeling and Simulation, Computer Graphics and Computer-Aided Design, Computer Science Applications, Computer Science::Graphics, Geometric design, [MATH.MATH-DG]Mathematics [math]/Differential Geometry [math.DG], Rational representation

Abstract

International audience; Given four polynomial or rational Bézier curves defining a curvilinear rectangle, we consider the problem of constructing polynomial or rational tensor-product Bézier patches bounded by these curves, such that they are geodesics of the constructed surface. The existence conditions and interpolation scheme, developed in a general context in earlier studies, are adapted herein to ensure that the geodesic-bounded surface patches are compatible with the usual polynomial/rational representation schemes of CAD systems. Precise conditions for four Bézier curves to constitute geodesic boundaries of a polynomial or rational surface patch are identified, and an interpolation scheme for the construction of such surfaces is presented when these conditions are satisfied. The method is illustrated with several computed examples.

Published

2009

3. [Untitled]

Author

Nicolas Szafran, Valérie Pham-Trong, and Luc Biard

Subjects

Discrete mathematics, Surface (mathematics), Geodesic, Applied Mathematics, Mathematical analysis, 020207 software engineering, 010103 numerical & computational mathematics, 02 engineering and technology, 01 natural sciences, Longest path problem, Euclidean shortest path, Computer Science::Graphics, Path length, Parametric surface, Shortest path problem, 0202 electrical engineering, electronic engineering, information engineering, Net (polyhedron), 0101 mathematics, ComputingMethodologies_COMPUTERGRAPHICS, Mathematics

Abstract

We present two numerical methods to approximate the shortest path or a geodesic between two points on a three-dimensional parametric surface. The first one consists of minimizing the path length, working in the parameter domain, where the approximation class is composed of Bezier curves. In the second approach, we consider Bezier surfaces and their control net. The numerical implementation is based on finding the shortest path on the successive control net subdivisions. The convergence property of the Bezier net to the surface gives an approximation of the required shortest path. These approximations, also called pseudo-geodesics, are then applied to the creation of pseudo-geodesic meshes. Experimental results are also provided.

Published

2001

4. Reconstruction of quasi developable surfaces from ribbon curves

Author

Nicolas Szafran, Mathieu Huard, Luc Biard, Nathalie Sprynski, Commissariat à l'énergie atomique et aux énergies alternatives - Laboratoire d'Electronique et de Technologie de l'Information (CEA-LETI), Direction de Recherche Technologique (CEA) (DRT (CEA)), Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Commissariat à l'énergie atomique et aux énergies alternatives (CEA), Modélisation Géométrique & Multirésolution pour l'Image (MGMI), Laboratoire Jean Kuntzmann (LJK), Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS), and Equipe de Recherche Commune CEA-Leti / UJF-LJK

Subjects

Surface (mathematics), Curvilinear coordinates, Developable surface, Geodesic, Applied Mathematics, Boundary (topology), 020207 software engineering, Geometry, 02 engineering and technology, 01 natural sciences, Tangential developable, Capture and reconstruction of surfaces, 0104 chemical sciences, Geodesic curve, 010404 medicinal & biomolecular chemistry, [MATH.MATH-DG]Mathematics [math]/Differential Geometry [math.DG], Ribbon, 0202 electrical engineering, electronic engineering, information engineering, Developable and quasi developable surfaces, Hermite interpolation, Mathematics, Interpolation, Coons filling methods

Abstract

International audience; This paper deals with the acquisition and reconstruction of physical surfaces by mean of a ribbon device equipped with micro-sensors, providing geodesic curves running on the surface. The whole process involves the reconstruction of these 3D ribbon curves together with their global treatment so as to produce a consistent network for the geodesic surface interpolation by filling methods based on triangular Coons-like approaches. However, the ribbon curves follow their own way, subdividing thus the surface into arbitrary n-sided patches. We present here a method for the reconstruction of quasi developable surfaces from such n-sided curvilinear boundary curves acquired with the ribbon device.

Published

2013

5. Construction of rational surface patches bounded by lines of curvature

Author

Luc Biard, Rida T. Farouki, Nicolas Szafran, Modélisation Géométrique & Multirésolution pour l'Image (MGMI), Laboratoire Jean Kuntzmann (LJK), Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS), Department of Mechanical and Aeronautical Engineering (MAE), University of California [Davis] (UC Davis), and University of California-University of California

Subjects

Surface (mathematics), Darboux frame, rotation-minimizing frame, Aerospace Engineering, Boundary (topology), Geometry, Bézier curve, 010103 numerical & computational mathematics, 02 engineering and technology, Pythagorean-hodograph curve, Curvature, 01 natural sciences, Principal curvature, 0202 electrical engineering, electronic engineering, information engineering, 0101 mathematics, Mathematics, rational surface patch, Rational surface, Mathematical analysis, 020207 software engineering, Computer Graphics and Computer-Aided Design, [INFO.INFO-MO]Computer Science [cs]/Modeling and Simulation, Quintic function, Computer Science::Graphics, [MATH.MATH-DG]Mathematics [math]/Differential Geometry [math.DG], Modeling and Simulation, Automotive Engineering, angular velocity, lines of curvature

Abstract

International audience; The fact that the Darboux frame is rotation-minimizing along lines of curvature of a smooth surface is invoked to construct rational surface patches whose boundary curves are lines of curvature. For given patch corner points and associated frames defining the surface normals and principal directions, the patch boundaries are constructed as quintic RRFM curves, i.e, spatial Pythagorean-hodograph (PH) curves that possess rational rotation-minimizing frames. The interior of the patch is then defined as a Coons interpolant, matching the boundary curves and their associated rotation-minimizing frames as surface Darboux frames. The surface patches are compatible with the standard rational Bézier/B-spline representations, and G^1 continuity between adjacent patches is easily achieved. Such patches are advantageous in surface design with more precise control over the surface curvature properties.

Published

2010

6. Surface Reconstruction via Geodesic Interpolation

Author

N. Sprynski, Nicolas Szafran, Luc Biard, B. Lacolle, Commissariat à l'énergie atomique et aux énergies alternatives - Laboratoire d'Electronique et de Technologie de l'Information (CEA-LETI), Direction de Recherche Technologique (CEA) (DRT (CEA)), Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Commissariat à l'énergie atomique et aux énergies alternatives (CEA), Modélisation Géométrique & Multirésolution pour l'Image (MGMI), Laboratoire Jean Kuntzmann (LJK), and Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)

Subjects

Surface (mathematics), Geodesic, Geometry, 010103 numerical & computational mathematics, 02 engineering and technology, Curvature minimization, [INFO.INFO-CG]Computer Science [cs]/Computational Geometry [cs.CG], 01 natural sciences, Industrial and Manufacturing Engineering, Hermite interpolation, Embedded micro-sensors, surface reconstruction, Ribbon, 0202 electrical engineering, electronic engineering, information engineering, 0101 mathematics, Geodesic curves, Mathematics, Geodesic map, Mathematical analysis, 020207 software engineering, Computer Graphics and Computer-Aided Design, [INFO.INFO-MO]Computer Science [cs]/Modeling and Simulation, Computer Science Applications, [MATH.MATH-DG]Mathematics [math]/Differential Geometry [math.DG], Motion capture, Surface reconstruction, Interpolation

Abstract

International audience; This paper is concerned with reconstruction of numerical or real surfaces based on the knowledge of some geodesic curves on the surface. So, considering two regular 3D-curves f0(t) and f1(t), our purpose is to construct a surface which interpolates these two curves in such a way that these two curves are geodesics on this surface. This will be accomplished using Hermite interpolation. For a real surface, it will be shown that geodesics can be acquired using a ribbon of micro-sensors.

Published

2008