The-Hausdorff-dimension-of-the-survivor-set

Abstract

Let 1<β< 2 , the sequence α(β)=α(β)1α(β)2…b be the quasi-greedy β -expansion of 1 , and t∈ [0,1) be a bifurcation parameter. The β-transformation is defined to be Tβ(x)=β x (mod 1) for x∈ [0,1). The Hausdorff dimension of the survivor set K(t)=\x∈ [0,1) Tβk(x)∈ (0,t), ∀ k≥0\ is equal to -λβ under the condition that Σi=k∞α(β)i βi≥ t for any k≥ 1 , where λ∈ (0,1) is the smallest positive solution of the equation Σn=1∞(α(β)n-tn)xn=1 with (tn) being the quasi-greedy β-expansion of t. And the local H\"older exponent of the Hausdorff dimension function of K(t) is larger than the value of the function itself.