Conformal invariants of twisted Dirac operators and positive scalar curvature

Abstract

For a closed, spin, odd dimensional Riemannian manifold (Y,g), we define the rho invariant spin(Y,E,H, g) for the twisted Dirac operator DEH on Y, acting on sections of a flat hermitian vector bundle E over Y, where H = Σ ij+1 H2j+1 is an odd-degree closed differential form on Y and H2j+1 is a real-valued differential form of degree 2j+1. We prove that it only depends on the conformal class of the pair [H,g]. In the special case when H is a closed 3-form, we use a Lichnerowicz-Weitzenbock formula for the square of the twisted Dirac operator, to show that whenever Y is a closed spin manifold, then spin(Y,E,H, g)= spin(Y,E, g) for all |H| small enough, whenever g is a Riemannian metric of positive scalar curvature. When H is a top-degree form on an oriented three dimensional manifold, we also compute spin(Y,E,H, g).