Publication: Structure symplectique généralisée sur le fibré des connexions.
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Publication Date
1999
Authors
Muñoz Masqué, Jaime
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Elsevier
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Abstract
We prove that on the bundle of connections of an arbitrary principal bundle π: P → M there exists a canonical differential 2--form taking values in the adjoint bundle ;ing: adg:: ad P → M which defines a generalized symplectic structure and which verifies a property of “universal curvature”. The results of the present Note generalize those of [3] to an arbitrary Lie group.
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