O-operators on Lie ∞-algebras with respect to Lie ∞-actions
Abstract
We define O-operators on a Lie ∞-algebra E with respect to an action of E on another Lie ∞-algebra and we characterize them as Maurer-Cartan elements of a certain Lie ∞-algebra obtained by Voronov's higher derived brackets construction. The Lie ∞-algebra that controls the deformation of O-operators with respect to a fixed action is determined.
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