Darboux-Weinstein theorem for locally conformally symplectic manifolds

Published 1 Nov 2015 in math.DG and math.SG | (1511.00227v1)

Abstract: A locally conformally symplectic (LCS) form is an almost symplectic form $\omega$ such that a closed one-form $\theta$ exists with $d\omega = \theta \wedge \omega$. We present a version of the well-known result of Darboux and Weinstein in the LCS setting and give an application concerning Lagrangian submanifolds.

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