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arxiv: 1806.01755 · v3 · pith:RKPWDNZO · submitted 2018-06-05 · math-ph · math.DS· math.MP· math.SG

Averaging, symplectic reduction, and central extensions

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classification math-ph math.DSmath.MPmath.SG
keywords systemaveragedcentralsymplecticequationextensionsgroupnatural
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We show that the averaged equation for a one-frequency fast-oscillating Hamiltonian system is the result of symplectic reduction of a certain natural system on the corresponding $S^1$-bundle with respect to the circle action. Furthermore, if the reduced configuration space happens to be a group, then under natural assumptions the averaged system turns out to be the Euler equation on a central extension of that group. This gives a new explanation of the drift, common in averaged system, as a similar shift is typically present in symplectic reductions and central extensions.

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