Atiyah and Todd classes arising from integrable distributions
Abstract
In this paper, we study the Atiyah class and Todd class of the DG manifold (F[1],dF) corresponding to an integrable distribution F ⊂ TK M = TM R K, where K = R or C. We show that these two classes are canonically identical to those of the Lie pair (TK M, F). As a consequence, the Atiyah class of a complex manifold X is isomorphic to the Atiyah class of the corresponding DG manifold (T0,1X[1],∂). Moreover, if X is a compact K\"ahler manifold, then the Todd class of X is also isomorphic to the Todd class of the corresponding DG manifold (T0,1X[1],∂).
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