The dimension of irregular set in parameter space
Abstract
For any real number β>1. The nth cylinder of β in the parameter space \β∈ R: β>1\ is a set of real numbers in (1,∞) having the same first n digits in their β-expansion of 1, denote by IPn(β). We study the quantities which describe the growth of the length of IPn(β). The Huasdorff dimension of the set of given growth rate of the length of IPn(β) will be determined in this paper.
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