Discrete orbits and special subgroups of $\Diff$
Abstract: The local topological dynamics of subgroups of ${\rm Diff} ({\mathbb Cn}, 0)$, with special emphasis on ${\rm Diff} ({\mathbb C2}, 0)$, is discussed with a view towards integrability questions. It is proved in particular that a subgroup of ${\rm Diff} ({\mathbb C2}, 0)$ possessing locally finite orbits is necessarily solvable. Other results and examples related to higher-dimensional generalizations of Mattei-Moussu's celebrated topological characterization of integrability are also provided. These examples also settle a fundamental question raised by the previous work of Camara-Scardua.
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