Jordan property for automorphism groups of compact spaces in Fujiki's class C$\mathcal {C}$

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Let $X$ be a compact complex space in Fujiki's Class $\mathcal{C}$. We show that the group $Aut(X)$ of all biholomorphic automorphisms of $X$ has the Jordan property: there is a (Jordan) constant $J = J(X)$ such that any finite subgroup $G\le Aut(X)$ has an abelian subgroup $H\le G$ with the index $[G:H]\le J$. This extends, with a quite different method, the result of Prokhorov and Shramov for Moishezon threefolds.