A Calabi-Yau theorem for Vaisman manifolds

Abstract

A compact complex Hermitian manifold (M, I, w) is called Vaisman if dw=w θ and the 1-form θ, called the Lee form, is parallel with respect to the Levi-Civita connection. The volume form of M is invariant with respect to the action of the vector field X dual to θ (called the Lee field) and the vector field I(X), called the anti-Lee field. The cohomology class of θ, called the Lee class, plays the same role as the Kahler class in Kahler geometry. We prove that a Vaisman metric is uniquely determined by its volume form and the Lee class, and, conversely, for each Lee class [θ] and each Lee- and anti-Lee-invariant volume form V, there exists a Vaisman structure with the volume form V and the Lee class c[θ]. This is an analogue of the Calabi-Yau theorem claiming that the Kahler form is uniquely determined by its volume and the cohomology class.