Characteristic Currents on Cohesive Modules

Abstract

Let F be a coherent sheaf on a complex variety X that has a locally free resolution E. In [19], the authors constructed a pseudomeromorphic current whose support is contained in supp(E) that represents products of Chern classes of F. In this paper, we show that their construction works for general de-Rham characteristic classes and then generalize it to represent products (in de-Rham cohomology) of characteristic forms of cohesive modules defined by Block. Finally, we state a corollary to a transgression result in [16] that show that it is sufficient to only use the degree-0 and degree-1 parts of the superconnection to construct currents that represent characteristic forms of cohesive modules in the Bott-Chern cohomology.

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