Gauge equivalence for complete L∞-algebras
Abstract
We introduce a notion of left homotopy for Maurer--Cartan elements in L∞-algebras and A∞-algebras, and show that it corresponds to gauge equivalence in the differential graded case. From this we deduce a short formula for gauge equivalence, and provide an entirely homotopical proof to Schlessinger--Stasheff's theorem. As an application, we answer a question of T. Voronov, proving a non-abelian Poincar\'e lemma for differential forms taking values in an L∞-algebra.
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