Atiyah classes of strongly homotopy Lie pairs

Abstract

The subject of this paper is strongly homotopy (SH) Lie algebras, also known as L∞-algebras. We extract an intrinsic character, the Atiyah class, which measures the nontriviality of an (SH) Lie algebra A when it is extended to L. In fact, given such an SH Lie pair (L, A), and any A-module E, there associates a canonical cohomology class, the Atiyah class [αE], which generalizes earlier known Atiyah classes out of Lie algebra pairs. We show that the Atiyah class [αL/A] induces a graded Lie algebra structure on HCE(A,L/A[-2]), and the Atiyah class [αE] of any A-module E induces a Lie algebra module structure on HCE(A,E). Moreover, Atiyah classes are invariant under gauge equivalent A-compatible infinitesimal deformations of L.