This paper reviews both the theory and practice of the numerical computation of geodesic distances on Riemannian manifolds. The notion of Riemannian manifold allows one to define a local metric (a symmetric positive tensor field) that encodes the information about the problem one wishes to solve. This takes into account a local isotropic cost (whether some point should be avoided or not) and a local anisotropy (which direction should be preferred). Using this local tensor field, the geodesic distance is used to solve many problems of practical interest such as segmentation using geodesic balls and Voronoi regions, sampling points at regular geodesic distance or meshing a domain with geodesic Delaunay triangles. The shortest paths for this R...
Manifold learning models attempt to parsimoniously describe multivariate data through a low-dimensio...
Geodesic distance estimation for data lying on a manifold is an important issue in many applications...
We present two algorithms for computing distances along a non-convex polyhedral surface. The first al...
International audienceThis paper reviews both the theory and practice of the numerical computation o...
This paper shows how computational Riemannian manifold can be used to solve several problems in comp...
The distribution of geometric features is anisotropic by its nature. Intrinsic properties of surface...
Computing geodesics on meshes is a classical problem in computational and differential geometry. It ...
Distribution of geometric features varies with direction, including, for example, normal curvature. ...
Measuring the distance is an important task in many clustering and image-segmentation algorithms. Th...
The computation of geodesic distances is an important research topic in Geometry Processing and 3D S...
This survey gives a brief overview of theoretically and practically relevant algorithms to compute g...
We present a highly practical, efficient, and versatile approach for computing approximate geodesic ...
This survey gives a brief overview of theoretically and practically relevant algorithms to compute g...
AbstractThis survey gives a brief overview of theoretically and practically relevant algorithms to c...
The distribution of geometric features is anisotropic by its nature. Intrinsic properties of surface...
Manifold learning models attempt to parsimoniously describe multivariate data through a low-dimensio...
Geodesic distance estimation for data lying on a manifold is an important issue in many applications...
We present two algorithms for computing distances along a non-convex polyhedral surface. The first al...
International audienceThis paper reviews both the theory and practice of the numerical computation o...
This paper shows how computational Riemannian manifold can be used to solve several problems in comp...
The distribution of geometric features is anisotropic by its nature. Intrinsic properties of surface...
Computing geodesics on meshes is a classical problem in computational and differential geometry. It ...
Distribution of geometric features varies with direction, including, for example, normal curvature. ...
Measuring the distance is an important task in many clustering and image-segmentation algorithms. Th...
The computation of geodesic distances is an important research topic in Geometry Processing and 3D S...
This survey gives a brief overview of theoretically and practically relevant algorithms to compute g...
We present a highly practical, efficient, and versatile approach for computing approximate geodesic ...
This survey gives a brief overview of theoretically and practically relevant algorithms to compute g...
AbstractThis survey gives a brief overview of theoretically and practically relevant algorithms to c...
The distribution of geometric features is anisotropic by its nature. Intrinsic properties of surface...
Manifold learning models attempt to parsimoniously describe multivariate data through a low-dimensio...
Geodesic distance estimation for data lying on a manifold is an important issue in many applications...
We present two algorithms for computing distances along a non-convex polyhedral surface. The first al...