On recurrence sets for toral endomorphisms
Abstract
Let A be a 2× 2 integral matrix with an eigenvalue of modulus strictly less than 1. Let T be the natural endomorphism on the torus T2=R2/Z2, induced by A. Given τ>0, let \[ Rτ =\\, x∈ T2 : Tnx∈ B(x,e-nτ)~infinitely ~many~n∈N \,\. \] We calculated the Hausdorff dimension of Rτ, and also prove that Rτ has a large intersection property.
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