## Automorphisms and deformations of conformally K\"ahler, Einstein-Maxwell metrics. (arXiv:1708.01507v1 [math.DG])

We obtain a structure theorem for the group of holomorphic automorphisms of a conformally K\"ahler, Einstein--Maxwell metric, extending the classical results of Matsushima~\cite{M}, Licherowicz~\cite{L} and Calabi~\cite{calabi} in the K\"ahler--Einstein, cscK, and extremal K\"ahler cases. Combined with previous results of LeBrun~\cite{LeB1}, Apostolov--Maschler~\cite{AM} and Futaki--Ono~\cite{FO}, this completes the classification of the conformally K\"ahler, Einstein--Maxwell metrics on $\mathbb{{CP}}^1 \times \mathbb{{CP}}^1$. We also use our result in order to introduce a (relative) Mabuchi energy in the more general context of $(K, q, a)$-extremal K\"ahler metrics in a given K\"ahler class, and show that the existence of $(K, q, a)$-extremal K\"ahler metrics is stable under small deformation of the K\"ahler class, the Killing vector field $K$ and the normalization constant $a$.查看全文

## Solidot 文章翻译

 你的名字 留空匿名提交 你的Email或网站 用户可以联系你 标题 简单描述 内容 We obtain a structure theorem for the group of holomorphic automorphisms of a conformally K\"ahler, Einstein--Maxwell metric, extending the classical results of Matsushima~\cite{M}, Licherowicz~\cite{L} and Calabi~\cite{calabi} in the K\"ahler--Einstein, cscK, and extremal K\"ahler cases. Combined with previous results of LeBrun~\cite{LeB1}, Apostolov--Maschler~\cite{AM} and Futaki--Ono~\cite{FO}, this completes the classification of the conformally K\"ahler, Einstein--Maxwell metrics on $\mathbb{{CP}}^1 \times \mathbb{{CP}}^1$. We also use our result in order to introduce a (relative) Mabuchi energy in the more general context of $(K, q, a)$-extremal K\"ahler metrics in a given K\"ahler class, and show that the existence of $(K, q, a)$-extremal K\"ahler metrics is stable under small deformation of the K\"ahler class, the Killing vector field $K$ and the normalization constant $a$.