Suppose we only know of some elements in a geometric algebra how a versor has transformed them, can we then reconstruct the unknown versor V? We present an O(2(n)) method that works in n-D geometric algebra for n exact vector correspondences. This makes it usable for determining, for instance, a Euclidean rigid body motion in n-D from a frame correspondence providing the required n+2 conformal vectors as: the frame location, the n axis directions, and the invariance of the point at infinity. The method can only determine a full conformal transformation if the weights of the transformed entities are also observed
This paper exposes a very geometrical yet directly computational way of working with conformal motio...
Part II uses the foundations of Part I [35] to define constraint equations for 2D-3D pose estimation...
In this paper the authors will apply a mathematical system, the Conformal Geometric Algebra (CGA), t...
We derive a method to determine a conformal transformation in nD in closed form given exact correspo...
The motion rotors, or motors, are used to model Euclidean motion in 3D conformal geometric algebra. ...
A new and useful set of homogeneous coordinates has been discovered for the treatment of Euclidean g...
Abstract: In this paper we will address the problem of recovering covariant transformations between ...
Early in the development of computer graphics it was realized that projective geometry was well suit...
Early in the development of computer graphics it was realized that projective geometry was well suit...
The classical Vahlen matrix representation of conformal transformations on R(n) is directly related ...
Geometric algebra is an universal mathematical language which provides very comprehensive techniques...
Early in the development of Computer Graphics it was realized that projective geometry was well suit...
The body of this thesis has three main sections. The first introduces Oriented Conformal Geometric A...
In this paper we will show that the Clifford or geometric algebra is very well suited for the repres...
Using conformal geometric algebra, Euclidean motions in n-D are represented as orthogonal transforma...
This paper exposes a very geometrical yet directly computational way of working with conformal motio...
Part II uses the foundations of Part I [35] to define constraint equations for 2D-3D pose estimation...
In this paper the authors will apply a mathematical system, the Conformal Geometric Algebra (CGA), t...
We derive a method to determine a conformal transformation in nD in closed form given exact correspo...
The motion rotors, or motors, are used to model Euclidean motion in 3D conformal geometric algebra. ...
A new and useful set of homogeneous coordinates has been discovered for the treatment of Euclidean g...
Abstract: In this paper we will address the problem of recovering covariant transformations between ...
Early in the development of computer graphics it was realized that projective geometry was well suit...
Early in the development of computer graphics it was realized that projective geometry was well suit...
The classical Vahlen matrix representation of conformal transformations on R(n) is directly related ...
Geometric algebra is an universal mathematical language which provides very comprehensive techniques...
Early in the development of Computer Graphics it was realized that projective geometry was well suit...
The body of this thesis has three main sections. The first introduces Oriented Conformal Geometric A...
In this paper we will show that the Clifford or geometric algebra is very well suited for the repres...
Using conformal geometric algebra, Euclidean motions in n-D are represented as orthogonal transforma...
This paper exposes a very geometrical yet directly computational way of working with conformal motio...
Part II uses the foundations of Part I [35] to define constraint equations for 2D-3D pose estimation...
In this paper the authors will apply a mathematical system, the Conformal Geometric Algebra (CGA), t...