The Weil algebra of a double Lie algebroid

Abstract

Given a double vector bundle D M, we define a bigraded `Weil algebra' W(D), which `realizes' the algebra of smooth functions on the supermanifold D[1,1]. We describe in detail the relations between the Weil algebras of D and those of the double vector bundles D',\ D" obtained by duality operations. In particular, we show that double-linear Poisson structures on D can be described alternatively as Gerstenhaber brackets on W(D), vertical differentials on W(D'), or horizontal differentials on W(D"). We also give a new proof of Voronov's result characterizing double Lie algebroid structures. In the case that D=TA is the tangent prolongation of a Lie algebroid, we find that W(D) is the Weil algebra of the Lie algebroid, as defined by Mehta and Abad-Crainic. We show that the deformation complex of Lie algebroids, the theory of IM forms and IM multivector fields, and 2-term representations up to homotopy all have natural interpretations in terms of our Weil algebras.