The Quaternion-Based Spatial Coordinate and Orientation Frame Alignment Problems

TL;DR

This paper reviews quaternion-based methods for solving 3D spatial and orientation frame alignment problems, highlighting algebraic solutions, structural insights, and extensions to orientation data and combined translation-orientation problems.

Contribution

It provides a comprehensive analysis of quaternion eigensystem solutions, including exact algebraic expressions, and extends these methods to orientation and combined alignment problems.

Findings

Exact algebraic solutions for quaternion RMSD optimization

Structural analysis of quaternion eigensystems in spatial alignment

Extension of quaternion methods to orientation and combined problems

Abstract

We review the general problem of finding a global rotation that transforms a given set of points and/or coordinate frames (the "test" data) into the best possible alignment with a corresponding set (the "reference" data). For 3D point data, this "orthogonal Procrustes problem" is often phrased in terms of minimizing a root-mean-square deviation or RMSD corresponding to a Euclidean distance measure relating the two sets of matched coordinates. We focus on quaternion eigensystem methods that have been exploited to solve this problem for at least five decades in several different bodies of scientific literature where they were discovered independently. While numerical methods for the eigenvalue solutions dominate much of this literature, it has long been realized that the quaternion-based RMSD optimization problem can also be solved using exact algebraic expressions based on the form of the quartic equation solution published by Cardano in 1545; we focus on these exact solutions to expose the structure of the entire eigensystem for the traditional 3D spatial alignment problem. We then explore the structure of the less-studied orientation data context, investigating how quaternion methods can be extended to solve the corresponding 3D quaternion orientation frame alignment (QFA) problem, noting the interesting equivalence of this problem to the rotation-averaging problem, which also has been the subject of independent literature threads. We conclude with a brief discussion of the combined 3D translation-orientation data alignment problem. Appendices are devoted to a tutorial on quaternion frames, a related quaternion technique for extracting quaternions from rotation matrices, and a review of quaternion rotation-averaging methods relevant to the orientation-frame alignment problem. Supplementary Material covers extensions of quaternion methods to the 4D problem.