Abstract
In this note we define the Chern–Simons classes of a flat superconnection, D + L , on a complex Z / 2 Z -graded vector bundle E on a manifold such that D preserves the grading and L is an odd endomorphism of E . As an application, we obtain a definition of Chern–Simons classes of a (not necessarily flat) morphism between flat vector bundles on a smooth manifold. An application of Reznikov's theorem shows the triviality of these classes when the manifold is a compact Kähler manifold or a smooth complex quasi-projective variety in degrees > 1 .
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