Non Jordan groups of diffeomorphisms and actions of compact Lie groups on manifolds

Abstract

A recent preprint of Csik\'os, Pyber and Szab\'o (arXiv:1411.7524) proves that the diffeomorphism group of T2× S2 is not Jordan. The purpose of this paper is to generalize the arguments of Csik\'os, Pyber and Szab\'o in order to obtain many other examples of compact manifolds whose diffeomorphism group fails to be Jordan. In particular we prove that for any ε>0 there exist manifolds admitting effective actions of arbitrarily large p-groups all of whose abelian subgroups have at most ||ε elements. Finally, we also recover some results on nonexistence of effective actions of compact connected semisimple Lie group on manifolds.