Subsystems with shadowing property for Zk-actions
Abstract
In this paper, subsystems with shadowing property for Zk-actions are investigated. Let α be a continuous Zk-action on a compact metric space X. We introduce the notions of pseudo orbit and shadowing property for α along subsets, particularly subspaces, of Rk. Combining with another important property "expansiveness" for subsystems of α which was introduced and systematically investigated by Boyle and Lind, we show that if α has the shadowing property and is expansive along a subspace V of Rk, then so does for α along any subspace W of Rk containing V. Let α be a smooth Zk-action on a closed Riemannian manifold M, μ an ergodic probability measure and the Oseledec set. We show that, under a basic assumption on the Lyapunov spectrum, α has the shadowing property and is expansive on along any subspace V of Rk containing a regular vector; furthermore, α has the quasi-shadowing property on along any 1-dimensional subspace V of Rk containing a first-type singular vector. As an application, we also consider the 1-dimensional subsystems (i.e., flows) with shadowing property for the Rk-action on the suspension manifold induced by α.
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