LcK structures with holomorphic Lee vector field on Vaisman-type manifolds (Q2039265)

Let \(M=(M,J,g)\) be a Hermitian manifold and \(\omega\) its fundamental form defined by \(\omega(\cdot,\cdot)=g(J\cdot,\cdot)\). \(M\) is called locally conformally Kähler (lcK for short) if there is a closed one-form \(\theta\), called the Lee-form, such that \(d\omega=\theta\wedge \omega\) and the metric dual of \(\theta\) is named the Lee vector field. We say that \(M\) is a Vaisman type manifold whenever \(\theta\) is parallel w.r.t. the Levi-Cevita connection of \(g\). The purpose of the authors is to describe lcK structures endowed with a holomorphic Lee vector field on compact Vaisman complex manifolds. The main result is stated in the fourth section (Theorem 4.11).