Review variations of the Euler–Rodrigues formula in different mathematical forms
•
Derive the connections between variations in vectors, quaternions and Lie groups
•
Give the geometrical interpretation and associate it with the algebraic derivation
•
Present the equivalence between quaternion conjugation and the adjoint action of the Lie group on the Lie algebra
Abstract
This paper reviews the Euler–Rodrigues formula in the axis–angle representation of rotations, studies its variations and derivations in different mathematical forms as vectors, quaternions and Lie groups and investigates their intrinsic connections. The Euler–Rodrigues formula in the Taylor series expansion is presented and its use as an exponential map of Lie algebras is discussed particularly with a non-normalized vector. The connection between Euler–Rodrigues parameters and the Euler–Rodrigues formula is then demonstrated through quaternion conjugation and the equivalence between quaternion conjugation and an adjoint action of the Lie group is subsequently presented. The paper provides a rich reference for the Euler–Rodrigues formula, the variations and their connections and for their use in rigid body kinematics, dynamics and computer graphics.
