We construct a class of envelope surfaces in Rd, more precisely envelopes of balls. An envelope surface is a closed C1 (tangent continuous) manifold wrapping tightly around the union of a set of balls. Such a manifold is useful in modeling since the union of a finite set of balls can approximate any closed smooth manifold arbitrarily close. The theory of envelope surfaces generalizes the theoretical framework of skin surfaces earlier developed for molecular modeling. However, envelope surfaces are more flexible: where a skin surface is controlled by a single parameter, envelope surfaces can be adapted locally. We show that a special subset of envelope surfaces is piecewise quadratic and derive conditions under which the envelope surface is ...
Abstract. This paper presents new mathematical foundations for topologically correct surface reconst...
Skin surfaces are used for the visualization of molecules. They form a class of tangent continuous s...
Abstract. A new paradigm for designing smooth surfaces is described. A finite set of points with wei...
We construct a class of envelope surfaces in Rd, more precisely envelopes of balls. An envelope surf...
Intuitively, an envelope of a family of curves is a curve that is tangent to a member of the family ...
Intuitively, an envelope of a family of curves is a curve that is tangent to a member of the family ...
We continue the study of rational envelope (RE) surfaces. Although these surfaces are parametrized w...
Skin surfaces are used for the visualization of molecules. They form a class of tangent continuous S...
In the present paper we investigate rational two-parameter families of spheres and their envelope su...
Skin surfaces are used for the modeling and visualization of molecules. They form a class of tangent...
AbstractSkin surfaces are used for the visualization of molecules. They form a class of tangent cont...
We present the computation of envelopes of a set of quadratic surfaces defined in ${\rm I\!\hspace{-...
We present a method to approximate a simple, regular C2 surface W in R3 by a (tangent continuous) sk...
The envelope of an arrangement of lines is the polygon consisting of the finite length segments that...
We present a method to approximate a simple, regular C2 surface W in R3 by a (tangent continuous) sk...
Abstract. This paper presents new mathematical foundations for topologically correct surface reconst...
Skin surfaces are used for the visualization of molecules. They form a class of tangent continuous s...
Abstract. A new paradigm for designing smooth surfaces is described. A finite set of points with wei...
We construct a class of envelope surfaces in Rd, more precisely envelopes of balls. An envelope surf...
Intuitively, an envelope of a family of curves is a curve that is tangent to a member of the family ...
Intuitively, an envelope of a family of curves is a curve that is tangent to a member of the family ...
We continue the study of rational envelope (RE) surfaces. Although these surfaces are parametrized w...
Skin surfaces are used for the visualization of molecules. They form a class of tangent continuous S...
In the present paper we investigate rational two-parameter families of spheres and their envelope su...
Skin surfaces are used for the modeling and visualization of molecules. They form a class of tangent...
AbstractSkin surfaces are used for the visualization of molecules. They form a class of tangent cont...
We present the computation of envelopes of a set of quadratic surfaces defined in ${\rm I\!\hspace{-...
We present a method to approximate a simple, regular C2 surface W in R3 by a (tangent continuous) sk...
The envelope of an arrangement of lines is the polygon consisting of the finite length segments that...
We present a method to approximate a simple, regular C2 surface W in R3 by a (tangent continuous) sk...
Abstract. This paper presents new mathematical foundations for topologically correct surface reconst...
Skin surfaces are used for the visualization of molecules. They form a class of tangent continuous s...
Abstract. A new paradigm for designing smooth surfaces is described. A finite set of points with wei...