Atiyah classes and Todd classes of pullback dg Lie algebroids associated with Lie pairs
Abstract
For a Lie algebroid L and a Lie subalgebroid A, i.e. a Lie pair (L,A), we study the Atiyah class and the Todd class of the pullback dg (i.e. differential graded) Lie algebroid π! L of L along the bundle projection π:A[1] M of the shifted vector bundle A[1]. Applying the homological perturbation lemma, we provide a new construction of Sti\'enon--Vitagliano--Xu's contraction relating the cochain complex ((π! L),Q) of sections of π! L to the Chevalley--Eilenberg complex (( A(L/A)),dBott) of the Bott representation. Using this contraction, we construct two isomorphisms: the first identifies the cohomology of the cochain complex (((π! L)(π! L)),Q) with the Chevalley--Eilenberg cohomology HCE(A,(L/A)(L/A)) arising from the Bott representation, while the second identifies the cohomologies H(((π! L)),Q) and HCE(A,(L/A)). We prove that this pair of isomorphisms identifies the Atiyah class and the Todd class of the dg Lie algebroid π! L with the Atiyah class and the Todd class of the Lie pair (L,A), respectively.
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