An Obstruction Theory for the Existence of Maurer-Cartan Elements in curved L∞-algebras and an Application in Intrinsic Formality of P∞-Algebras

Abstract

Let g be a curved L∞-algebra endowed with a complete filtration Fg. Suppose there exists an integer r ∈ N0 for which the curvature μ0 satisfies μ0 ∈ F2r+1 g and the spectral sequence yields Er+1p,q =0 for p,q with p+q=2. We prove that then a Maurer-Cartan element exists. In addition, we show, as a typical application, that for P a possibly inhomogeneous Koszul operad with generating set in arities 1,2 (e.g. P=Com,As,BV,Lie,Ger), a P∞-algebra A is intrinsically formal if its twisted deformation complex Def(H(A)id H(A)) is acyclic in total degree 1.