Vertex- and face-based subdivision schemes are now routinely used in geometric modeling and computational science, and their primal/dual relationships are well studied. In this paper, we interpret these schemes as defining bases for discrete differ-ential 0- resp. 2-forms, and complete the picture by introducing edge-based subdivision schemes to construct the missing bases for discrete differential 1-forms. Such subdivision schemes map scalar coefficients on edges from the coarse to the refined mesh and are intrinsic to the surface. Our construction is based on treating vertex-, edge-, and face-based subdivision schemes as a joint triple and enforcing that subdivision commutes with the topological exterior derivative. We demonstrate our con...
Subdivision surfaces allow smooth freeform surface modelling without topological constraints. They h...
One problem in subdivision surfaces is the number of facets grows exponentially with the level of su...
Thesis (Ph. D.)--University of Washington, 1996Subdivision surfaces are a convenient representation ...
Vertex- and face-based subdivision schemes are now routinely used in geometric modeling and computat...
Vertex- and face-based subdivision schemes are now routinely used in geometric modeling and computat...
Despite the growing interest in subdivision surfaces within the computer graphics and geometric proc...
Subdivision is the process of generating smooth curves or surfaces from a finite set of initial cont...
Surfaces play an important role in three-dimensional computer aided geometric design (CAGD). Flat fa...
In this paper we introduce a new subdivision operator that unifies triangular and quadrilateral subd...
We present a novel linear subdivision scheme for face-based tangent directional fields on triangle m...
We present new families of primal and dual subdivision schemes for triangle meshes and 3-refinement....
Subdivision surfaces are capable of modeling and representing complex shapes of arbi-trary topology....
Surface subdivision schemes are used in computer graphics to generate visually smooth surfaces of ar...
Subdivision is a powerful paradigm for the generation of surfaces of arbitrary topology. Given an i...
In this paper we introduce 4–8 subdivision, a new scheme that generalizes the fourdirectional box sp...
Subdivision surfaces allow smooth freeform surface modelling without topological constraints. They h...
One problem in subdivision surfaces is the number of facets grows exponentially with the level of su...
Thesis (Ph. D.)--University of Washington, 1996Subdivision surfaces are a convenient representation ...
Vertex- and face-based subdivision schemes are now routinely used in geometric modeling and computat...
Vertex- and face-based subdivision schemes are now routinely used in geometric modeling and computat...
Despite the growing interest in subdivision surfaces within the computer graphics and geometric proc...
Subdivision is the process of generating smooth curves or surfaces from a finite set of initial cont...
Surfaces play an important role in three-dimensional computer aided geometric design (CAGD). Flat fa...
In this paper we introduce a new subdivision operator that unifies triangular and quadrilateral subd...
We present a novel linear subdivision scheme for face-based tangent directional fields on triangle m...
We present new families of primal and dual subdivision schemes for triangle meshes and 3-refinement....
Subdivision surfaces are capable of modeling and representing complex shapes of arbi-trary topology....
Surface subdivision schemes are used in computer graphics to generate visually smooth surfaces of ar...
Subdivision is a powerful paradigm for the generation of surfaces of arbitrary topology. Given an i...
In this paper we introduce 4–8 subdivision, a new scheme that generalizes the fourdirectional box sp...
Subdivision surfaces allow smooth freeform surface modelling without topological constraints. They h...
One problem in subdivision surfaces is the number of facets grows exponentially with the level of su...
Thesis (Ph. D.)--University of Washington, 1996Subdivision surfaces are a convenient representation ...