Constants of motion associated with alternative Hamiltonians
Abstract
It is shown that if a non-autonomous system of 2n first-order ordinary differential equations is expressed in the form of the Hamilton equations in terms of two different sets of coordinates, (qi, pi) and (Qi, Pi), then the determinant and the trace of any power of a certain matrix formed by the Poisson brackets of the Qi, Pi with respect to qi, pi, are constants of motion.
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