Space-filling curves and Hausdorff dimensions (Q1369340)

The result that the authors prove is basic but really nice and says the following: Let \(n\geq 2\) be any positive integer and \(r\) any real number such that \(0<r\leq1\). There exists a continuous curve from \([0,1]\) onto \([0,1]^n\) under which the entire \(n\)-dimensional unit cube \([0,1]^n\) is the image of a subset \(A\) of \([0,1]\) of Hausdorff dimension \(r\). The proof is very constructive and well written.