Assouad dimension of the Takagi function
Abstract
For any integer b≥2 and real series \cn\ such that Σn=0∞|cn|<∞, the generalized Takagi function f c,b(x) is defined by f c,b(x):=Σn=0∞ cnφ(bn x), x∈ [0,1], where φ(x)=dist(x,Z) is the distance from x to the nearest integer. The collection of functions with the form are called the Takagi class. In this paper, we show that in the case that n ∞ bn |cn|<∞, the Assouad dimension of the graph G f c,b=\(x,f c,b(x)):x∈[0,1]\ for the generalized Takagi function f c,b(x) is equal to one, that is, A G f c,b=1. In particular, for each 0<a<1 and integer b ≥ 2, we define Takagi function Ta,b as followed, Ta,b(x):=Σn=0∞ an φ(bn x), x∈ [0,1]. Then A G Ta,b=1 if and only if 0<a ≤ 1/b.
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