On the eigenvalues of the twisted Dirac operator

Abstract

Given a compact Riemannian spin manifold with positive scalar curvature, we find a family of connections ∇At for t∈[0,1] on a trivial vector bundle of sufficiently high rank, such that the first eigenvalue of the twisted Dirac operator DAt is nonzero and becomes arbitrarily small as t1. However, if one restricts the class of twisting connections considered, then nonzero lower bounds do exist. We illustrate this fact by establishing a nonzero lower bound for the Dirac operator twisted by Hermitian-Einstein connections over Riemann surfaces.