Equivariant K\"ahler model for Fujiki's class

Abstract

Let X be a compact complex manifold in Fujiki's class C, i.e., admitting a big (1,1)-class [α]. Consider Aut(X) the group of biholomorphic automorphisms and Aut[α](X) the subgroup of automorphisms preserving the class [α] via pullback. We show that X admits an Aut[α](X)-equivariant K\"ahler model: there is a bimeromorphic holomorphic map σ X X from a K\"ahler manifold X such that Aut[α](X) lifts holomorphically via σ. There are several applications. We show that Aut[α](X) is a Lie group with only finitely many components. This generalizes an early result of Lieberman and Fujiki on the K\"ahler case. We also show that every torsion subgroup of Aut(X) is almost abelian, and Aut(X) is finite if it is a torsion group.