Formality of Kapranov's brackets in K\"ahler geometry via pre-Lie deformation theory
Abstract
We recover some recent results by Dotsenko, Shadrin and Vallette on the Deligne groupoid of a pre-Lie algebra, showing that they follow naturally by a pre-Lie variant of the PBW Theorem. As an application, we show that Kapranov's L∞ algebra structure on the Dolbeault complex of a K\"ahler manifold is homotopy abelian and independent on the choice of K\"ahler metric up to an L∞ isomorphism, by making the trivializing homotopy and the L∞ isomorphism explicit.
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