Maurer-Cartan equation in the DGLA of graded derivations

Abstract

Let M be a smooth manifold and a differential 1-form on M with values in the tangent bundle TM. We construct canonical solutions e of Maurer-Cartan equation in the DGLA of graded derivations D*(M) of differential forms on M by means of deformations of d depending on . This yields to a classification of the canonical solutions of the Maurer-Cartan equation according to their type: e is of finite type r if there exists r∈ N such that r[,]FN = 0 and r is minimal with this property, where [.,.]FN is the Fr\"olicher-Nijenhuis bracket. A distribution ⊂ TM of codimension k > 1 is integrable if and only if the canonical solution e associated to the endomorphism of TM which is trivial on and equal to the identity on a complement of in TM is of finite type ≤ 1, respectively of finite type 0 if k = 1.