Higher order first integrals of autonomous non-Riemannian dynamical systems

Abstract: We consider autonomous holonomic dynamical systems defined by equations of the form qa = −Γ a bc (q) qb qc −Q a (q), where Γ a bc (q) are the coefficients of a symmetric (possibly non-metrical) connection and −Q a (q) are the generalized forces. We prove a theorem which for these systems determines autonomous and timedependent first integrals (FIs) of any order in a systematic way, using the 'symmetries' of the geometry defined by the dynamical equations. We demonstrate the application of the theorem to comput… Show more