Litcius/Paper detail

Review of the exponential and Cayley map on SE(3) as relevant for Lie group integration of the generalized Poisson equation and flexible multibody systems

Andreas Müller

2021Proceedings of the Royal Society A Mathematical Physical and Engineering Sciences41 citationsDOIOpen Access PDF

Abstract

The exponential and Cayley maps on SE(3) are the prevailing coordinate maps used in Lie group integration schemes for rigid body and flexible body systems. Such geometric integrators are the Munthe–Kaas and generalized- α schemes, which involve the differential and its directional derivative of the respective coordinate map. Relevant closed form expressions, which were reported over the last two decades, are scattered in the literature, and some are reported without proof. This paper provides a reference summarizing all relevant closed-form relations along with the relevant proofs, including the right-trivialized differential of the exponential and Cayley map and their directional derivatives (resembling the Hessian). The latter gives rise to an implicit generalized- α scheme for rigid/flexible multibody systems in terms of the Cayley map with improved computational efficiency.

Topics & Concepts

Poisson distributionLie groupGroup (periodic table)MathematicsExponential functionAlgebra over a fieldPure mathematicsMathematical analysisPhysicsStatisticsQuantum mechanicsDynamics and Control of Mechanical SystemsNumerical methods for differential equationsVibration and Dynamic Analysis