On existence of expanding attractors with different dimensions

Abstract

We prove that n-sphere Sn, n≥ 2, admits structurally stable diffeomorphisms Snn with non-orientable expanding attractors of any topological dimension d∈\1,…,[n2]\ where [x] is an integer part of x. One proves that n-torus Tn, n≥ 2, admits structurally stable diffeomorphisms Tnn with orientable expanding attractors of any topological dimension 1≤ q≤ n-1. We also prove that given any closed n-manifold Mn, n≥ 2, and any d∈\1,…,[n2]\, there is an axiom A diffeomorphism f: Mn Mn with a d-dimensional non-orientable expanding attractor. Similar statements hold for axiom A flows.

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