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Line 10: Consider an ''N''-manifold ''M''. The [[tangent bundle]] of ''M'', which will be denoted '''T''', is the [[vector bundle]] over ''M'' whose fibers consist of all [[tangent vector]]s to ''M''. A [[fiber bundle#Sections\|section]] of '''T''' is a [[vector field]] on ''M''. The [[cotangent bundle]] of ''M'', denoted '''T'''<sup></sup>, is the vector bundle over ''M'' whose sections are [[differential form\|one-forms]] on ''M''. In [[complex geometry]] one considers structures on the tangent bundles of manifolds. In [[symplectic geometry]] one is instead interested in [[Exterior algebra#~~The exterior~~Exterior power\|exterior powers]] of the cotangent bundle. Generalized geometry unites these two fields by treating sections of the '''generalized tangent bundle''', which is the [[direct sum of vector bundles\|direct sum]] <math>\mathbf{T} \oplus \mathbf{T}^</math> of the tangent and cotangent bundles, which are formal sums of a vector field and a one-form. The fibers are endowed with a natural [[inner product]] with [[signature (topology)\|signature]] (''N'', ''N''). If ''X'' and ''Y'' are vector fields and ''ξ'' and ''η'' are one-forms then the inner product of ''X+ξ'' and ''Y+η'' is defined as

Generalized complex structure: Difference between revisions