Torsion and fibrations
Abstract
We study the behaviour of analytic torsion under smooth fibrations. Namely, let F E f B be a smooth fiber bundle of connected closed oriented smooth manifolds and let V be a flat vector bundle over E. Assume that E and B come with Riemannian metrics and V comes with a unimodular (not necessarily flat) Riemannian metric. Let an(E;V) be the analytic torsion of E with coefficients in V and let B be the Pfaffian (B)-form. Let HqdR(F;V) be the flat vector bundle over B whose fiber over b ∈ B is HqdR(Fb;V) with the Riemannian metric which comes from the Hilbert space structure on the space of harmonic forms induced by the Riemannian metrics. Let an(B;HqdR(F;V)) be the analytic torsion of B with coefficients in this bundle. The Leray-Serre spectral sequence for deRham cohomology determines a certain correction term SerredR(f). We prove an(E;V) = ∫B an(Fb;V) · B + Σq (-1)q · an(B;HqdR(F;V)) + SerredR(f).
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