Isotropic subbundles of TM T*M
Abstract
We define integrable, big-isotropic structures on a manifold M as subbundles E⊂eq TM T*M that are isotropic with respect to the natural, neutral metric (pairing) g of TM T*M and are closed by Courant brackets (this also implies that [E,Eg]⊂eq Eg). We give the interpretation of such a structure by objects of M, we discuss the local geometry of the structure and we give a reduction theorem.
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