AbstractA canal surface is the envelope of a one-parameter set of spheres with radiir(t) and centersm(t). It is shown that any canal surface to a rational spine curvem(t) and a rational radius functionr(t) possesses rational parametrizations. We derive algorithms for the computation of these parametrizations and put particular emphasis on low degree representations
We present an algorithm that covers any given rational ruled surface with two rational parametrizati...
AbstractThe present paper investigates two-parameter families of spheres in R3 and their correspondi...
We propose a new method for constructing rational spatial Pythagorean Hodograph (PH) curves based on...
AbstractA canal surface is the envelope of a one-parameter set of spheres with radiir(t) and centers...
AbstractA canal surface in R3, generated by a parametrized curveC=m(t), is the Zariski closure of th...
AbstractThe envelope of a one-parameter set of spheres with radii r(t) and centers m(t) is a canal s...
The paper describes a concept of induced rational parametrisation for curves. Parametrisations of cu...
The conchoid of a surface F with respect to given xed point O is roughly speaking the surface obtain...
In this paper we will continue in investigating ‘contour method’ and its using for the computation o...
We continue the study of rational envelope (RE) surfaces. Although these surfaces are parametrized w...
In this paper we will continue in investigating ‘contour method’ and its using for the computation o...
AbstractThe present paper investigates two-parameter families of spheres in R3 and their correspondi...
AbstractIt is well known that a real algebraic surface is real rational if and only if it is complex...
We present an algorithm that covers any given rational ruled surface with two rational parametrizati...
We present an algorithm that covers any given rational ruled surface with two rational parametrizati...
We present an algorithm that covers any given rational ruled surface with two rational parametrizati...
AbstractThe present paper investigates two-parameter families of spheres in R3 and their correspondi...
We propose a new method for constructing rational spatial Pythagorean Hodograph (PH) curves based on...
AbstractA canal surface is the envelope of a one-parameter set of spheres with radiir(t) and centers...
AbstractA canal surface in R3, generated by a parametrized curveC=m(t), is the Zariski closure of th...
AbstractThe envelope of a one-parameter set of spheres with radii r(t) and centers m(t) is a canal s...
The paper describes a concept of induced rational parametrisation for curves. Parametrisations of cu...
The conchoid of a surface F with respect to given xed point O is roughly speaking the surface obtain...
In this paper we will continue in investigating ‘contour method’ and its using for the computation o...
We continue the study of rational envelope (RE) surfaces. Although these surfaces are parametrized w...
In this paper we will continue in investigating ‘contour method’ and its using for the computation o...
AbstractThe present paper investigates two-parameter families of spheres in R3 and their correspondi...
AbstractIt is well known that a real algebraic surface is real rational if and only if it is complex...
We present an algorithm that covers any given rational ruled surface with two rational parametrizati...
We present an algorithm that covers any given rational ruled surface with two rational parametrizati...
We present an algorithm that covers any given rational ruled surface with two rational parametrizati...
AbstractThe present paper investigates two-parameter families of spheres in R3 and their correspondi...
We propose a new method for constructing rational spatial Pythagorean Hodograph (PH) curves based on...
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