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Upper Hausdorff dimension estimates for invariant sets of evolutionary systems on Hilbert manifolds

Kruck, AminaReitmann, Volker — 2017

Proceedings of Equadiff 14

We prove a generalization of the Douady-Oesterlé theorem on the upper bound of the Hausdorff dimension of an invariant set of a smooth map on an infinite dimensional manifold. It is assumed that the linearization of this map is a noncompact linear operator. A similar estimate is given for the Hausdorff dimension of an invariant set of a dynamical system generated by a differential equation on a Hilbert manifold.

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