Formality for g-manifolds

Abstract

To any g-manifold M are associated two dglas tot( g Tpoly ) and tot ( g Dpoly ), whose cohomologies HCE(g, Tpoly 0 Tpoly+1) and HCE(g, Dpoly 0 Dpoly+1) are Gerstenhaber algebras. We establish a formality theorem for g-manifolds: there exists an L∞ quasi-isomorphism : tot( g Tpoly ) tot ( g Dpoly ) whose first `Taylor coefficient' (1) is equal to the Hochschild-Kostant-Rosenberg map twisted by the square root of the Todd cocycle of the g-manifold M and (2) induces an isomorphism of Gerstenhaber algebras on the level of cohomology. Consequently, the Hochschild-Kostant-Rosenberg map twisted by the square root of the Todd class of the g-manifold M is an isomorphism of Gerstenhaber algebras from HCE(g, Tpoly 0 Tpoly+1) to HCE(g, Dpoly 0 Dpoly+1).