Integrable Harmonic Higgs Bundles With Vanishing U And Eigenvalues of Q

Abstract

We study the tt*-geometry with vanishing endormorphism U. Given an integrable harmonic Higgs bundle (E, h, , U,Q) on a complex manifold M, Firstly we prove that, under the IS condition, vanishing U implies vanishing Higgs field and the Chern connection of the Hermitian Einstein metric h is a holomorphic connection, so the metric h and Q are invariant. Secondly, without the IS condition, we show that vanishing U will imply vanishing Higgs field if we assume that the Chern connection of h is a holomorphic connection. Finally, we add real structure . Given any CV-structure, we prove that super-symmetric operator Q must have 0 as an eigenvalue when the underlying bundle has odd rank.