On the Duflo formula for L∞-algebras and Q-manifolds
Abstract
We prove a direct analogue of the classical Duflo formula in the case of L∞-algebras. We conjecture an analogous formula in the case of an arbitrary Q-manifold. When G is a compact connected Lie group, the Duflo theorem for the Q-manifold ( TG,dDR) is exactly the Duflo theorem for the Lie algebra g = Lie G. The corresponding theorem for the Q-manifold ( TM,dDR), where M is an arbitrary smooth manifold, is a generalization of the Duflo theorem for the case of smooth manifolds. On the other hand, the Duflo theorem for the Q-manifold ( Thol M, ∂), where M is a complex manifold, is a generalization of the M. Kontsevich's ``theorem on complex manifold'' [K1], Sect. 8.4.
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