On a class of self-similar sets which contain finitely many common points
Abstract
For λ∈(0,1/2] let Kλ ⊂R be a self-similar set generated by the iterated function system \λ x, λ x+1-λ\. Given x∈(0,1/2), let (x) be the set of λ∈(0,1/2] such that x∈ Kλ. In this paper we show that (x) is a topological Cantor set having zero Lebesgue measure and full Hausdorff dimension. Furthermore, we show that for any y1,…, yp∈(0,1/2) there exists a full Hausdorff dimensional set of λ∈(0,1/2] such that y1,…, yp ∈ Kλ.
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