Hitchin's equations on a nonorientable manifold (1211.0746v3)

Abstract: We define Hitchin's moduli space for a principal bundle $P$, whose structure group is a compact semisimple Lie group $K$, over a compact non-orientable Riemannian manifold $M$. We use the Donaldson-Corlette correspondence, which identifies Hitchin's moduli space with the moduli space of flat $K^\mathbb{C}$-connections, which remains valid when M is non-orientable. This enables us to study Hitchin's moduli space both by gauge theoretical methods and algebraically by using representation varieties. If the orientable double cover $\tilde{M}$ of $M$ is a K\"ahler manifold with odd complex dimension and if the K\"ahler form is odd under the non-trivial deck transformation on $\tilde{M}$, Hitchin's moduli space of the pull-back bundle $\tilde{P}$ over $\tilde{M}$ has a hyper-K\"ahler structure and admits an involution induced by the deck transformation. The fixed-point set is symplectic or Lagrangian with respect to various symplectic structures on Hitchin's moduli space over $\tilde{M}$. We show that there is a local diffeomorphism from Hitchin's moduli space over (the nonorientable manifold) $M$ to the fixed point set of the Hitchin's moduli space over (its orientable double cover) $\tilde{M}$. We compare the gauge theoretical constructions with the algebraic approach using representation varieties.