Intersections of middle-α Cantor sets with a fixed translation

Abstract

For λ∈(0,1/3] let Cλ be the middle-(1-2λ) Cantor set in R. Given t∈[-1,1], excluding the trivial case we show that \[ (t):=\λ∈(0,1/3]: Cλ(Cλ+t)\ \] is a topological Cantor set with zero Lebesgue measure and full Hausdorff dimension. In particular, we calculate the local dimension of (t), which reveals a dimensional variation principle. Furthermore, for any β∈[0,1] we show that the level set \[ β(t):=\λ∈(t): H(Cλ(Cλ+t))=P(Cλ(Cλ+t))=β 2- λ\ \] has equal Hausdorff and packing dimension (-ββ-(1-β)1-β2)/ 3. We also show that the set of λ∈(t) for which H(Cλ(Cλ+t))P(Cλ(Cλ+t)) has full Hausdorff dimension.