On density of infinite subsets I
Abstract
Let Y be a compact metric space, G be a group acting by transformations on Y. For any infinite subset A⊂ Y, we study the density of gA for g∈ G and quantitative density of the set g∈ GngA by the Hausdorff semimetric dH. It is proven that for any integer n 2, ε>0, any infinite subset A⊂ Tn, there is a g∈ SL(n, Z) such that gA is ε-dense. We also show that, for any infinite subset A⊂ [0,1], for generic rotation and generic 3-IET, nn· dH(k=0n-1TkA,[0,1])=0.
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