Harmonic morphisms and moment maps on hyper-K\"ahler manifolds

Abstract

We characterise the actions, by holomorphic isometries on a K\"ahler manifold with zero first Betti number, of an abelian Lie group of dim≥ 2, for which the moment map is horizontally weakly conformal (with respect to some Euclidean structure on the Lie algebra of the group). Furthermore, we study the hyper-K\"ahler moment map φ induced by an abelian Lie group T acting by triholomorphic isometries on a hyper-K\"ahler manifold M, with zero first Betti number, thus obtaining the following: If dim T=1 then φ is a harmonic morphism. Moreover, we illustrate this on the tangent bundle of the complex projective space equipped with the Calabi hyper-K\"ahler structure, and we obtain an explicit global formula for the map. If dim T≥ 2 and either φ has critical points, or M is nonflat and dim M=4 dim T then φ cannot be horizontally weakly conformal.