Twisted Analytic Torsion and Adiabatic Limits

Abstract

We study an analogue of the analytic torsion for elliptic complexes that are graded by Z2, orignally constructed by Mathai and Wu. Motivated by topological T-duality, Bouwknegt an Mathai study the complex of forms on an odd-dimensional manifold equipped with with the twisted differential dH = d+H, where H is a closed odd-dimensional form. We show that the Ray-Singer metric on this twisted determinant is equal to the untwisted Ray-Singer metric when the determinant lines are identified using a canonical isomorphism. We also study another analytical invariant of the twisted differential, the derived Euler characteristic '(dH), as defined by Bismut and Zhang.