Figure 1: Using our framework various vector field design goals can be easily posed as linear constraints. Here, given three symmetry maps: rotational (S1), bilateral (S2) and front/back (S3), we can generate a symmetric vector field using only S
Vector fields tangent to a 2D manifold surface have many applications in Computer Graphics, Scientif...
The position vector field is the most elementary and natural geometric object on a Euclidean submani...
Figure 1: Signed angle field computation: (a) a human model; (b) the harmonic field from the red poi...
International audienceIn this paper, we introduce a novel coordinate-free method for manipulating an...
The use of tangential vector fields and thus the need for designing them has steadily been increasin...
of applications resulted in definitions for many types of directional fields: from vector and tensor...
Direction fields and vector fields play an increasingly important role in computer graphics and geom...
While scalar fields on surfaces have been staples of geometry processing, the use of tangent vector ...
Abstract: The objective of this paper is to examine the symmetry of the tangent operator for nonline...
Tangent vector fields are an essential ingredient in controlling surface appearance for applications...
Vector field design on surfaces is necessary for many graphics applications: example-based texture s...
Tangent vector fields on surfaces are linear operators acting on scalar functions. Taking this class...
Many algorithms in texture synthesis, non-photorealistic rendering (hatching), or re-meshing re-quir...
The use of rotationally symmetric operators in vision is reviewed and conditions for rotational sy...
This paper presents a vector expression of the constant-orientation singularity locus of the general...
Vector fields tangent to a 2D manifold surface have many applications in Computer Graphics, Scientif...
The position vector field is the most elementary and natural geometric object on a Euclidean submani...
Figure 1: Signed angle field computation: (a) a human model; (b) the harmonic field from the red poi...
International audienceIn this paper, we introduce a novel coordinate-free method for manipulating an...
The use of tangential vector fields and thus the need for designing them has steadily been increasin...
of applications resulted in definitions for many types of directional fields: from vector and tensor...
Direction fields and vector fields play an increasingly important role in computer graphics and geom...
While scalar fields on surfaces have been staples of geometry processing, the use of tangent vector ...
Abstract: The objective of this paper is to examine the symmetry of the tangent operator for nonline...
Tangent vector fields are an essential ingredient in controlling surface appearance for applications...
Vector field design on surfaces is necessary for many graphics applications: example-based texture s...
Tangent vector fields on surfaces are linear operators acting on scalar functions. Taking this class...
Many algorithms in texture synthesis, non-photorealistic rendering (hatching), or re-meshing re-quir...
The use of rotationally symmetric operators in vision is reviewed and conditions for rotational sy...
This paper presents a vector expression of the constant-orientation singularity locus of the general...
Vector fields tangent to a 2D manifold surface have many applications in Computer Graphics, Scientif...
The position vector field is the most elementary and natural geometric object on a Euclidean submani...
Figure 1: Signed angle field computation: (a) a human model; (b) the harmonic field from the red poi...