Quantitative twisted recurrence properties for piecewise expanding maps on [0,1]d

Abstract

Let T:[0,1]d →[0,1]d be a piecewise expanding map with an absolutely continuous (with respect to the d-dimensional Lebesgue measure md) T-invariant probability measure μ. Let \rn\ be a sequence of vectors satisfying the conditons that rn=(rn, 1, …, rn, d) ∈(R≥ 0)d, the sequence \ 1 ≤ i ≤ d1exrn, i 1 ≤ i ≤ d1exrn, i\ is bounded and n → ∞ 1 ≤ i ≤ drn, i=0. Let \δn\ be a sequence of non-negative real numbers with n → ∞ δn=0. Under the assumptions that μ is exponentially mixing and its density is sufficiently regular, we prove that the μ-measure of the following sets Rf(\rn\)=\x ∈[0,1]d: Tn x ∈ R(f(x), rn) for infinitely many n ∈ N \ and Rf ×(\δn\)=\x ∈[0,1]d: Tn x ∈ H(f(x), δn) for infinitely many n ∈ N \ obeys zero-full laws determined by the convergence or divergence of natural volume sums. Here, R(f(x), rn) and H(f(x), δn) represent targets as, respectively, coordinate-parallel hyperrectangles with bounded aspect ratio, and hyperboloids, both centered at f(x). f: [0,1]d → [0,1]d is a piecewise Lipschitz vector function. Our results not only unify quantitative recurrence properties and the shrinking target problem for piecewise expanding maps on [0,1]d, but also reveal that the two problems and cross-component recurrence can coexist in distinct directions on [0,1]d.

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