Mechanics of Solids (about journal) Mechanics of Solids
A Journal of Russian Academy of Sciences
 Founded
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IssuesArchive of Issues2022-8pp.1885-1907

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Yu.N. Chelnokov, "Orientation and Kinematics of Rotation: Quaternionic and Four-Dimensional Skew-Symmetric Operators, Equations, and Algorithms," Mech. Solids. 57 (8), 1885-1907 (2022)
Year 2022 Volume 57 Number 8 Pages 1885-1907
DOI 10.3103/S0025654422080106
Title Orientation and Kinematics of Rotation: Quaternionic and Four-Dimensional Skew-Symmetric Operators, Equations, and Algorithms
Author(s) Yu.N. Chelnokov (Institute for Precision Mechanics and Control Problems, Russian Academy of Sciences, Saratov, 410028 Russia, ChelnokovYuN@gmail.com)
Abstract This paper develops a theory of three- and four-dimensional skew-symmetric rotation operators generated by exponential representations of orthogonal operators or their representations using Cayley’s formulas. The generating orthogonal operators involve the direction angle cosine matrix, the quaternionic matrix of Euler’s parameters, and the Hamilton rotation quaternion. Novel matrix and quaternion kinematic equations for the rotation of a rigid body based on four-dimensional skew-symmetric matrices and on quaternions with zero scalar parts (in associated quaternions) are proposed. It is shown that they are advantageous compared to the known kinematic equations of rotation based on three-dimensional skew-symmetric matrices and vector kinematic equations. As a topical application of the proposed equations, the paper considers the construction of high-precision algorithms for determining the orientation of a moving object in an inertial coordinate system using a strapless inertial navigation system. Fourth-order (even-order) skew-symmetric matrices and associated quaternions have qualitative advantages over third-order (odd-order) skew-symmetric matrices and vectors. This makes the use of the proposed kinematic equations of rotation in orientation and navigation problems much more efficient compared to traditionally used equations in three-dimensional skew-symmetric operators.
Keywords three-dimensional and four-dimensional orthogonal and skew-symmetric rotation operators, matrices, vectors, quaternions, exponential representations of orthogonal operators, Cayley’s formulas, kinematic equations of rotation, orientation algorithms
Received 30 May 2022Revised 15 August 2022Accepted 15 August 2022
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