Components of generalised complex structures on transitive Courant algebroids

Abstract

Generalised almost complex structures J on transitive Courant algebroids E are studied in terms of their components with respect to a splitting E TM T*M G, where M denotes the base of E and G its bundle of quadratic Lie algebras. Necessary and sufficient integrability equations for J are established in this formalism. As an application, it is shown that the integrability of J implies that one of the components defines a Poisson structure on M. Then the structure (normal form) of generalised complex structures for which the Poisson structure is non-degenerate is determined. It is shown that it is fully encoded in a pair (ω , ) consisting of a symplectic structure ω on M and a representation : π1(M) Aut( g, · ,· g, Jg) by automorphism of a quadratic Lie algebra ( g, · ,· g) commuting with an integrable (in the sense of Lie algebras) skew-symmetric complex structure Jg. Examples of such representations and obstructions for the existence of non-degenerate generalised complex structures are discussed. Finally, a construction of generalised complex structures on transitive Courant algebroids over complex manifolds for which the Poisson structure degenerates along a complex analytic hypersurface is presented.

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