Using the general solution of the differential equation x (Over dot)(t) + g(1)(t)x (Over dot) + g(2)(t)x - 0, a generic basis of the point-symmetry algebra sl(3, R) is constructed. Deriving the equation from a time-dependent Lagrangian, the basis elements corresponding to Noether symmetries are deduced. The generalized Lewis invariant is constructed explicitly using a linear combination of Noether symmetries. The procedure is generalized to the case of systems of second-order ordinary differential equations with maximal sl(n + 2,R)-symmetry, and its possible adaptation to the inhomogeneous non-linear case illustrated by an example.

• 出版日期2016-8