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In this paper a compact and semisimple Lie group G is considered .endowed with a 2-plectic structure ω, induced by the Killing form We show that the Lie group of 2-plectomorphisms of G is finite dimensional and compact, and hence the Darboux’s theorem fails to be true for this 2-plectic structure. Also it is shown that ω induces a left-invariant g valued 2-form which is proportional to dΘ, where Θ is the Cartan–Maurer form on G. At last we consider the action of G on its tangent bundle which is furnished with the 2-plectic structure ωc, the complete lift of ω, .and calculate covariant momentum map of this action
کلید واژگان :compact semisimple Lie group, 2-plectic manifold
ارزش ریالی : 600000 ریال
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