Connections up to homotopy and characteristic classes

The aim of this note is to clarify the relevance of \connections up to homotopy" [4, 5] to the theory of characteristic classes, and to present an application to the characteristic classes of algebroids [3, 5, 7] (and of Poisson manifolds in particular [8, 13]). We have already remarked [4] that such connections up to homotopy can be used to compute the classical Chern characters. Here we present a slightly dierent argument for this, and then proceed with the discussion of the at characteristic classes. In contrast with [4], we do not only recover the classical characteristic classes (of at vector bundles), but we also obtain new ones. The reason for this is that ( Z 2-graded) non- at vector bundles may have at connections up to homotopy. Aswe shall explain here, in this category fall e.g. the characteristic classes of Poisson manifolds [8, 13]. As already mentioned in [4], one of our motivations is to understand the intrinsic characteristic classes for Poisson manifolds (and algebroids) of [7, 8], and the connection with the characteristic classes of representations [3]. Conjecturally, Fernandes' intrinsic characteristic classes [7] are the characteristic classes [3] of the \adjoint representation". The problem is that the adjoint representation is a \representation up to homotopy" only. Applied to algebroids, our construction immediately solves this problem: it extends the characteristic classes of [3] from representations to representations up to homotopy, and shows that the intrinsic characteristic classes [7, 8] are indeed the ones associated to the adjoint representation [5]. I would like to thank J. Stashe and A. Weinstein for their comments on a preliminary version of this paper