Optimal alignment of Lorentz orientation and generalization to matrix Lie groups

Abstract

There exist elegant methods of aligning point clouds in R3. Unfortunately, these methods fail to generalize to the case of Minkowski space, as we will show. Instead, we propose two solutions to the following problem: given inertial reference frames A and B, and given (possibly noisy) measurements of a set of 4-vectors \vi\ made in those reference frames with components \vA,i\ and \vB,i\, find the optimal Lorentz transformation such that vA,i=vB,i. The first method is direct least squares optimization through a parametrization of SO(3,1)+ in terms of the familiar boost and rotation vectors. The second method takes a detour through the Lorentz algebra; in addition to being conceptually simple and possessing a computational advantage over the first method, it can easily be generalized to the alignment of vector representations in other matrix Lie groups.