Rational points in Cantor sets in the complex plane

Abstract

Let K be an imaginary quadratic field and let OK be the ring of algebraic integers of K. For α ∈ OK with |α| > 1, define \[ Dα = n=0∞ OKαn. \] For β ∈ OK with |β|>1 and a finite subset A ⊂ OK, define \[ Sβ,A = \ Σk=1∞ akβk: \; ak ∈ A \;∀ k ∈ N \. \] Suppose that α and β are relatively prime. In this paper, we show that if H Sβ,A < 1, then the intersection Dα Sβ,A is a finite set. In general, the threshold for the Hausdorff dimension of Sβ,A is sharp. If we further assume that OK is a unique factorization domain and that α and α are relatively prime, then we establish the finiteness of the intersection under the weaker condition H Sβ,A < 2. This extends the previously known results on the real line.

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