Weak tangents and level sets of Takagi functions
Abstract
In this paper we study some properties of Takagi functions and their level sets. We show that for Takagi functions Ta,b with parameters a,b such that ab is a root of a Littlewood polynomial, there exist large level sets. As a consequence we show that for some parameters a,b, the Assouad dimension of graphs of Ta,b is strictly larger than their upper box dimension. In particular we can find weak tangents of those graphs with large Hausdorff dimension, larger than the upper box dimension of the graphs.
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