Add to ORKGWe present a full geometric parameterization of generalized barycentric coordinates on convex polytopes. We show that these continuous and non-negative coefficients ensuring linear precision can be efficiently and exactly computed through a power diagram of the polytope's vertices and the evaluation point. In particular, we point out that well-known explicit coordinates such as Wachspress, Discrete Harmonic, Voronoi, or Mean Value correspond to simple choices of power weights. We also present examples of new barycentric coordinates, and discuss possible extensions such as power coordinates for non-convex polygons and smooth shapes
A general construction of trans_nite barycentric coordinates is obtained as a simple and natural ge...
Different coordinate systems allow to uniquely determine the position of a geometric element in spa...
Barycentric coordinates provide a convenient way to represent a point inside a triangle as a convex ...
In this paper we provide an extension of barycentric coordinates from simplices to arbitrary convex ...
Generalized barycentric coordinate systems allow us to express the position of a point in space with...
AbstractIn Wachspress (1975) [1], theory was developed for constructing rational basis functions for...
In this paper, we study and compare different types of generalized bary- centric coordinates in deta...
Barycentric coordinates for triangles are commonly used in computer graphics, geometric modelling, a...
We develop spherical barycentric coordinates. Analogous to classical, planar barycentric coordinates...
Barycentric coordinates for triangles are commonly used in computer graphics, geometric modelling, a...
We show that four well-known kinds of generalized barycentric coordinates in convex polygons share a...
Abstract: Trivariate barycentric coordinates can be used both to express a point inside a tetrahedro...
Barycentric coordinates yield a powerful and yet simple paradigm to interpolate data values on polyh...
A fundamental problem in geometry processing is that of expressing a point inside a convex polyhedro...
A fundamental problem in geometry processing is that of expressing a point inside a conve...
A general construction of trans_nite barycentric coordinates is obtained as a simple and natural ge...
Different coordinate systems allow to uniquely determine the position of a geometric element in spa...
Barycentric coordinates provide a convenient way to represent a point inside a triangle as a convex ...
In this paper we provide an extension of barycentric coordinates from simplices to arbitrary convex ...
Generalized barycentric coordinate systems allow us to express the position of a point in space with...
AbstractIn Wachspress (1975) [1], theory was developed for constructing rational basis functions for...
In this paper, we study and compare different types of generalized bary- centric coordinates in deta...
Barycentric coordinates for triangles are commonly used in computer graphics, geometric modelling, a...
We develop spherical barycentric coordinates. Analogous to classical, planar barycentric coordinates...
Barycentric coordinates for triangles are commonly used in computer graphics, geometric modelling, a...
We show that four well-known kinds of generalized barycentric coordinates in convex polygons share a...
Abstract: Trivariate barycentric coordinates can be used both to express a point inside a tetrahedro...
Barycentric coordinates yield a powerful and yet simple paradigm to interpolate data values on polyh...
A fundamental problem in geometry processing is that of expressing a point inside a convex polyhedro...
A fundamental problem in geometry processing is that of expressing a point inside a conve...
A general construction of trans_nite barycentric coordinates is obtained as a simple and natural ge...
Different coordinate systems allow to uniquely determine the position of a geometric element in spa...
Barycentric coordinates provide a convenient way to represent a point inside a triangle as a convex ...