Abstract — The parameterisation of rotations in three dimen-sional Euclidean space is an area of applied mathematics that has long been studied, dating back to the original works of Leonhard Euler in the 18th century. As such, many ways of parameterising a rotation have been developed over the years. Motivated by the task of representing the orientation of a balancing body, the fused angles parameterisation is developed and introduced in this paper. This novel representation is carefully defined both mathematically and geometrically, and thoroughly investigated in terms of the properties it possesses, and how it relates to other existing representations. A second intermediate representation, tilt angles, is also introduced as a natural cons...
We present a new method for describing the kinematics of the rotational motion of a rigid body. The ...
Orientations and rotations in n-dimensional real Euclidean spaces (Rn) are represented by proper ort...
The theory of quaternions was discovered in the middle of nineteenth century and they were commonly ...
Abstract — The parameterisation of rotations in three dimen-sional Euclidean space is an area of app...
Euler angles have been used to describe the orientation of objects in two-dimensional and three-dime...
This paper presents a novel method of representing rotation and its application to representing the ...
The three rotational degrees of freedom between the coordinate system of a sensed object and that of...
Tilt angles, in contrast to Euler angles, tilt the body frame first about the line of nodes which is...
International audienceThe de facto standard for storing human motion data on a computer involves a r...
This chapter deals with the different approaches for describing the rotational coordinates in spatia...
This paper is written to aid the readers to understand application of Euler angles and quaternion in...
In materials science the orientation of a crystal lattice is described by means of a rotation relati...
Classic techniques have been established to characterize SO(N) using the N-dimen-sional Euler’s theo...
<div><p>This article discusses a novel framework to analyze rotational deformations of real three-di...
In this work we propose a scheme for defining a rational curve in the space, with an associated rati...
We present a new method for describing the kinematics of the rotational motion of a rigid body. The ...
Orientations and rotations in n-dimensional real Euclidean spaces (Rn) are represented by proper ort...
The theory of quaternions was discovered in the middle of nineteenth century and they were commonly ...
Abstract — The parameterisation of rotations in three dimen-sional Euclidean space is an area of app...
Euler angles have been used to describe the orientation of objects in two-dimensional and three-dime...
This paper presents a novel method of representing rotation and its application to representing the ...
The three rotational degrees of freedom between the coordinate system of a sensed object and that of...
Tilt angles, in contrast to Euler angles, tilt the body frame first about the line of nodes which is...
International audienceThe de facto standard for storing human motion data on a computer involves a r...
This chapter deals with the different approaches for describing the rotational coordinates in spatia...
This paper is written to aid the readers to understand application of Euler angles and quaternion in...
In materials science the orientation of a crystal lattice is described by means of a rotation relati...
Classic techniques have been established to characterize SO(N) using the N-dimen-sional Euler’s theo...
<div><p>This article discusses a novel framework to analyze rotational deformations of real three-di...
In this work we propose a scheme for defining a rational curve in the space, with an associated rati...
We present a new method for describing the kinematics of the rotational motion of a rigid body. The ...
Orientations and rotations in n-dimensional real Euclidean spaces (Rn) are represented by proper ort...
The theory of quaternions was discovered in the middle of nineteenth century and they were commonly ...