Arithmetic representations of real numbers in terms of self-similar sets

Abstract

Suppose n≥ 2 and Ai⊂ \0,1,·s ,(n-1)\ for i=1,·s ,l, let Ki=a∈ Ain-1(Ki+a) be self-similar sets contained in [0,1]. Given m1,·s ,ml∈ Z with Πimi≠ 0, we let equation* Sx=\ (y1,·s ,yl):m1y1+·s +mlyl=x with yi∈ Ki ∀ i\ . equation* In this paper, we analyze the Hausdorff dimension and Hausdorff measure of the following set equation* Ur=\x:Card(Sx)=r\, equation* where Card(Sx) denotes the cardinality of Sx, and r∈ N+. We prove under the so-called covering condition that the Hausdorff dimension of U1 can be calculated in terms of some matrix. Moreover, if r≥ 2, we also give some sufficient conditions such that the Hausdorff dimension of Ur takes only finite values, and these values can be calculated explicitly. Furthermore, we come up with some sufficient conditions such that the dimensional Hausdorff measure of Ur is infinity. Various examples are provided. Our results can be viewed as the exceptional results for the classical slicing problem in geometric measure theory.