Diffeomorphism Groups of Compact 4-manifolds are not always Jordan
Abstract
We show that if M is a compact smooth manifold diffeomorphic to the total space of an orientable S2 bundle over the torus T2, then its diffeomorphism group does not have the Jordan property, i.e., Diff(M) contains a finite subgroup Gn for any natural number n such that every abelian subgroup of Gn has index at leat n. This gives a counterexample to an old conjecture of Ghys.
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