AbstractWe present a procedure to compute all the circles in the intersection curve of two tori, based on the geometric properties of the circles embedded in a torus. By using the geometric constraints in computing the circles, our algorithm provides an efficient and robust solution
An algorithm and implementation is presented to compute the exact arrangement induced by arbitrary a...
This paper presents a simple and elegant algorithm to estimate adaptively the stepping direction and...
In this thesis, we focus on the topological properties of surfaces, i.e. those that are preserved by...
AbstractWe present a procedure to compute all the circles in the intersection curve of two tori, bas...
This thesis provides efficient and robust algorithms for the computation of the intersection curve b...
The intersections of the cylindrical surfaces with a torus are often met in practice, for instance i...
Surfaces of revolution belong to an important class of geometric models with simpler shape character...
Starting from the study of the orthoptic curves of parabolas and ellipses, we generalize to the case...
Ring Dupin cyclides are non-spherical algebraic surfaces of degree four that can be defined as the i...
International audienceA torus contains four families of circles: parallels, meridians and two sets o...
Computing the intersection curve of two surfaces is a fundamental problem in many areas, such as the...
We describe exact representations and algorithms for geometric operations on general circles and cir...
By circle skinning we have a discrete set of circles and we would like to find two curves, which tou...
A novel algorithm for computing RSIC intersection curves of two surfaces of revolution is presented,...
An algorithm is presented to compute the exact arrangement induced by arbitrary algebraic surfaces o...
An algorithm and implementation is presented to compute the exact arrangement induced by arbitrary a...
This paper presents a simple and elegant algorithm to estimate adaptively the stepping direction and...
In this thesis, we focus on the topological properties of surfaces, i.e. those that are preserved by...
AbstractWe present a procedure to compute all the circles in the intersection curve of two tori, bas...
This thesis provides efficient and robust algorithms for the computation of the intersection curve b...
The intersections of the cylindrical surfaces with a torus are often met in practice, for instance i...
Surfaces of revolution belong to an important class of geometric models with simpler shape character...
Starting from the study of the orthoptic curves of parabolas and ellipses, we generalize to the case...
Ring Dupin cyclides are non-spherical algebraic surfaces of degree four that can be defined as the i...
International audienceA torus contains four families of circles: parallels, meridians and two sets o...
Computing the intersection curve of two surfaces is a fundamental problem in many areas, such as the...
We describe exact representations and algorithms for geometric operations on general circles and cir...
By circle skinning we have a discrete set of circles and we would like to find two curves, which tou...
A novel algorithm for computing RSIC intersection curves of two surfaces of revolution is presented,...
An algorithm is presented to compute the exact arrangement induced by arbitrary algebraic surfaces o...
An algorithm and implementation is presented to compute the exact arrangement induced by arbitrary a...
This paper presents a simple and elegant algorithm to estimate adaptively the stepping direction and...
In this thesis, we focus on the topological properties of surfaces, i.e. those that are preserved by...
DOI
Add to ORKG