Open dynamical systems with a moving hole

Abstract

Given an integer b 3, let Tb: [0,1) [0,1); x bx 1 be the expanding map on the unit circle. For any m∈N and ω=ω0ω1…∈(\0,1,…,b-1\m)N0 let \[ Kω=\x∈[0,1): Tbn(x) Iωn~∀ n≥ 0\,\] where Iωn is the b-adic basic interval generated by ωn. Then Kω is called the survivor set of the open dynamical system ([0,1),Tb,Iω) with respect to the sequence of holes Iω=\Iωn: n≥ 0\. We show that the Hausdorff and lower box dimensions of Kω always conincide, and the packing and upper box dimensions of Kω also coincide. Moreover, we give sharp lower and upper bounds for the dimensions of Kω, which can be calculated explicitly. For any admissible α≤ β there exist infinitely many ω such that H Kω=α and P Kω=β. As applications we study badly approximable numbers in Diophantine approximation. For an arbitrary sequence of balls \Bn\, let K(\Bn\) be the set of x∈[0,1) such that Tbn(x) Bn for all but finitely many n≥ 0. Assuming n∞diam (Bn) exists, we show that H K(\Bn\)=1 if and only if n∞diam (Bn)=0. For any positive function φ on N, let E(φ) be the set of x∈[0,1) satisfying |Tbn (x)-x|≥ φ(n) for all but finitely many n. If n∞φ(n) exists, then H E(φ)=1 if and only if n∞φ(n)=0. Our results can be applied to study joint spectral radius of matrices. We show that the finiteness property for the joint spectral radius of associated adjacency matrices holds true.