Dimension of sets of numbers with multiple representations (Q1890610)

Let \(n\in \mathbb{N}\) be a natural number and \(b\), \(n> b> 1\), a real number. The author shows that the Hausdorff dimensions of the sets \(U(n, b)\) of all real \(x\in ]0, 1]\) with a unique representation \[ x= \sum^\infty_{i= 1} n_i b^{- i}\quad\text{with}\quad n_i\in \{0, 1,\dots, n- 1\} \] and \(L(n, b)\) with fewer than \({\mathfrak c}\) such different representations have Hausdorff dimension equal to \(\log(2b- 1)/\log b\) provided that \(2b- 1> n\), but if \(2b- 1\leq n\) then \(U(n, b)= L(n, b)= \emptyset\).