Existence of 'Darboux chart' on loop space
Abstract
For a finite dimensional symplectic manifold (M,ω) with a symplectic form ω, corresponding loop space (LM=C∞(S1,M)) admits a weak symplectic form ω. We prove that the loop space over n admits Darboux chart for the weak symplectic structure ω. Further, we show that inclusion map from the symplectic cohomology (as defined by Kriegl and Michor KM) of the loop space over Rn to the De Rham cohomology of the loop space is an isomorphism.
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