Non-singular $\mathbb{Z}^d$-actions: an ergodic theorem over rectangles with application to the critical dimensions

Anthony H. Dooley; Kieran Jarrett

arxiv: 1606.01620 · v1 · pith:IAF5NTZQnew · submitted 2016-06-06 · 🧮 math.DS

Non-singular mathbb{Z}^d-actions: an ergodic theorem over rectangles with application to the critical dimensions

Anthony H. Dooley , Kieran Jarrett This is my paper

classification 🧮 math.DS

keywords actionsrectanglescriticaldimensionsergodicinvariantsmathbbnon-singular

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We adapt techniques of Hochman to prove a non-singular ergodic theorem for $\mathbb{Z}^d$-actions where the sums are over rectangles with side lengths increasing at arbitrary rates, and in particular are not necessarily balls of a norm. This result is applied to show that the critical dimensions with respect to sequences of such rectangles are invariants of metric isomorphism. These invariants are calculated for a class of product actions.

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Non-singular mathbb{Z}^d-actions: an ergodic theorem over rectangles with application to the critical dimensions

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