Visibility of Cartesian products of Cantor sets
Abstract
Let Kλ be the attractor of the following IFS equation* \f1(x)=λ x, f2(x)=λ x+1-λ\, \;\;0<λ<1/2. equation* Given α ≥ 0, we say the line y=α x is visible through Kλ× Kλ if \(x, α x): x∈ R \0\\ ((Kλ× Kλ))=. Let V= \α ≥ 0: y=α x is visible through Kλ× Kλ \. In this paper, we give a completed description of V, e.g., its Hausdoff dimension and its topological property. Moreover, we also discuss another type of visible problem which is related to the slicing problem.
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