A dual quaternion algorithm of the Helmert transformation problem

Zeng, Huaien; Fang, Xing; Chang, Guobin; Yang, Ronghua

doi:10.1186/s40623-018-0792-x

Cited by 15 publications

(14 citation statements)

References 35 publications

(65 reference statements)

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“…In this way, dual-quaternions are double numbers with their elements being quaternions. More specifically, they are defined as [14,15]: q = r + d•ε with r and d being quaternions and ε 2 = 0 with ε 0…”

Section: Dual-quaternion Methodsmentioning

confidence: 99%

Helmert Transformation Problem. From Euler Angles Method to Quaternion Algebra

Ioannidou

Pantazis

2020

IJGI

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The three-dimensional coordinate’s transformation from one system to another, and more specifically, the Helmert transformation problem, is one of the most well-known transformations in the field of engineering. In this paper, its solution, in reverse problem, was investigated for specific data using three different methods. It is presented by solving it with the method of Euler angles as well as with the use of quaternion and dual-quaternion algebra, after first giving some basic mathematical theory. After research, not only were three artificial sets of data used, which were structured in a specific way and forced into specific transformations to be solved, but also a real geodesy problem was tested, in order to identify the sensitivity and problems of each method. Statistical analysis of the results was performed by each method, while it was found that there were significant deviations in rotations and translations in the method of Euler angles and dual quaternions, respectively.

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Section: Dual-quaternion Methodsmentioning

confidence: 99%

Helmert Transformation Problem. From Euler Angles Method to Quaternion Algebra

Ioannidou

Pantazis

2020

IJGI

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“…As a preliminary of this work, we concisely present relevant physical concepts and mathematical rules of quaternion and dual quaternion. Readers can also refer to literature [31] for more details.…”

Section: Mathematical Preliminariesmentioning

confidence: 99%

Dual Quaternion Based Close Proximity Operation for In-Orbit Assembly via Model Predictive Control

Sun

Xiao

Sun

et al. 2021

International Journal of Aerospace Engineering

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This paper studies the problem of guidance and control for autonomous in-orbit assembly. A six-degree-of-freedom (6-DOF) motion control for in-orbit assembly close proximity operation between a service satellite and a target satellite is addressed in detail. The dynamics based on dual quaternion are introduced to dispose the coupling effect between translation and rotation in a succinct frame, in which relevant perturbation and disturbance are involved. With the consideration of economical principle for fuel consume, a generic control system based on model predictive control (MPC) is then designed to generate a suboptimal control sequence for rendezvous trajectory considering actuator output saturation. The stability and robustness issues of the MPC-based control system are analyzed and proved. Numerical simulations are presented to demonstrate the effectiveness and robustness of the proposed control scheme, while additional comparisons for diverse horizons of the MPC are further conducted.

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“…Apart from using rotations, there are other representation of R , such as unit quaternion (e.g., Horn 1987;Shen et al 2006; Zeng and Yi 2011; Závoti and Kalmár 2016), dual quaternion (e.g., Walker et al 1991;Wang et al 2014;Zeng et al 2018Zeng et al , 2019, direction cosine matrix (e.g., Chen et al 2004;Wang et al 2018), and the Rodrigues matrix or Gibbs vector (e.g., Zeng and Yi 2010;Závoti and Kalmár 2016;Zeng et al 2016;Kurt 2018). The first three approaches to the representation of R introduce functional constraints, for instance the norm of quaternion is unity as the unit quaternion representation is concerned.…”

Section: D Similarity Transformation In Eiv Model Without Functionalmentioning

confidence: 99%

“…This work is very popular in many fields, such as geodesy, engineering surveying, LIDAR, terrestrial laser scanning, photogrammetry, machine vision, etc. (Besl and McKay 1992;Crosilla and Beinat 2002;Horn 1987;Jaw and Chuang 2008;Kashani 2006;Krarup 1985;Marx 2017;Paffenholz and Bae 2012;Walker et al 1991;Wang et al 2014;Závoti and Kalmár 2016;Zeng 2014;Zeng et al 2018).…”

Section: Introductionmentioning

confidence: 99%

WTLS iterative algorithm of 3D similarity coordinate transformation based on Gibbs vectors

Zeng

Chang

et al. 2020

Earth Planets Space

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The 3D similarity coordinate transformation is fundamental and frequently encountered in many areas of work such as geodesy, engineering surveying, LIDAR, terrestrial laser scanning, photogrammetry, machine vision, etc. The algorithms of 3D similarity transformation are divided into two categories. One is a closed-form algorithm that is straightforward and fast. However, it cannot provide the accuracy information for the transformation parameters. The other category of algorithm is iterative, and this can offer the accuracy information for the transformation parameters. However, the latter usually needs a good initial value of the unknown. Considering the accuracy information for transformation parameters is essential or indispensable from the viewpoint of uncertainty, this contribution proposes a weighted total least squares (WTLS) iterative algorithm of the 3D similarity coordinate transformation based on Gibbs vectors. It is fast in terms of fewer iterations, reliable and does not need good initial values of transformation parameters. Two cases including the registration of LIDAR points with big rotation angles and a geodetic datum transformation with small rotation angles are demonstrated to validate the new algorithm.

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A dual quaternion algorithm of the Helmert transformation problem

Cited by 15 publications

References 35 publications

Helmert Transformation Problem. From Euler Angles Method to Quaternion Algebra

Helmert Transformation Problem. From Euler Angles Method to Quaternion Algebra

Dual Quaternion Based Close Proximity Operation for In-Orbit Assembly via Model Predictive Control

WTLS iterative algorithm of 3D similarity coordinate transformation based on Gibbs vectors

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