Riemann-Roch for real varieties

Abstract

If E is a C∞ complex vector bundle on an oriented C∞ manifold , diffeomorphic to a circle, then the space of sections of E has a canonical polarization in the sense of Pressley and Segal and so one has its determinantal gerbe with lien C*, the group of nonzero complex numbers. If q:-->B is a smooth family of circles as above and E is a vector bundle on , then the smooth direct image q*(E) is an infinite-dimensional bundle with fibers as above and so we have its determinantal gerbe on B with lien being the sheaf of invertible complex valued C∞ functions, it gives a class in H3(B, Z). In this paper we consider a family q:-->B as above but with fibers being compact oriented C∞ manifolds of dimension d. For a bundle E on one expects q*(E) to possess a determinantal d-gerbe and hence to give a class in Hd+2(B, Z). We construct directly, by means of a version of the Chern-Weil theory, the real version of this would be class. We further prove a real version of the Grothendieck-Riemann-Roch theorem describing this class as a direct image of a certain characteristic class of E.

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