A Variation of the Goldman-Millson Theorem for Filtered L∞ Algebras

Abstract

In this paper, we extend the Goldman-Millson Theorem for L∞ algebras. We consider two L∞ algebras L and L endowed with descending, bounded above and complete filtrations compatible with the L∞ structures and U:L → L an ∞-morphism respecting the filtrations. We prove that in the setting of the linear part of U, say , being a quasi-isomorphism on the r-1st page of the spectral sequences and H1 ((F2q L)/(Fmin(2q+1,r) L))=0 for every q with 2q < r and Hi((F1 L) / (Fq L))=0 for i=0,1 and q every power of 2 smaller than r and q=r this induces a weak homotopy equivalence of the simplicial sets MC (L) and MC (L).