Calabi-Yau structures on the complexifications of rank two symmeric spaces

Abstract

For a (Reimannian) symmetric space G/K of compact type, the natural action of G on its complexification G C/K C (which is an anti-Kaehler symmetric space) is one of the isometric actions called ``Hermann type action''. Let be the G-invariant strictly plurisubharmonic C∞-function on an open set of G C/K C arising from a W-invariant strictly convex C∞-function on an open set of a maximal abelian subspace ad of pd, where pd is the subspace of the Lie algebra gd of Gd such that gd= k pd gives the Cartan decomposition associated to the dual symmetric space Gd/K of G/K and W is the Weyl group assocaited to ad. In this paper, we first give a new proof of a known relation between the complex Hessian of and the Hessian of . This new proof is performed from the viewpoint of the orbit geometry of the Hermann type action G G C/K C. In more detail, it is performed by using the explicit descriptions of the shape operators of the orbits of the isotropy action K Gd/K and the Hermann type action G G C/K C. Next we prove that there exists a C∞-Calabi-Yau structure on the whole of the complexification G C/K C in the case where G/K is of rank two on the basis of this relation. In the future, the above new proof will be useful to investigate the existence of invariant Calabi-Yau structure on an anti-Kaehler manifold equipped with a certain kind of complex hyperpolar action in more general, where we note that Hermann type actions are complex hyperpolar.