DOI: 10.4213/sm9743e ISSN: 1064-5616
Jordan property for groups of bimeromorphic automorphisms of compact Kähler threefolds
Alexey Sergeevich Golota- Algebra and Number Theory
Let $X$ be a nonuniruled compact Kähler space of dimension $3$. We show that the group of bimeromorphic automorphisms of $X$ is Jordan. More generally, the same result holds for any compact Kähler space admitting a quasi-minimal model. Bibliography: 29 titles.