Local level sets of the Takagi-van der Waerden function

Abstract

In this paper, we investigate the Takagi-van der Waerden function, Tr(x) = Σn=0∞ φ(rn x)rn , x∈ [0,1], r ∈ Z+, where φ(x)= dist(x,Z) represents the distance from x to the nearest integer. %We prove that for every even integer r ≥ 2, the expected number of local level sets contained in the level set Lr(y) is 1 + 1/r, if y is a random variable uniformly distributed over the range of Tr. Lagarias and Maddock [Level sets of the Takagi function: local level sets, Monatsh. Math., 166 (2012), No. 2, 201--238] introduced the notion of local level sets for the classical Takagi function T2. They proved that if y is a random variable uniformly distributed over the range of T2, then the expected number of local level sets contained in the level set L2(y) equals 3/2. We extend the study by defining an analogous concept of local level sets for all even integers r. Then we prove that, for every even integer r≥ 2, if y is a random variable uniformly distributed, then the expected number of local level sets contained in the level set Lr(y) equals 1 + 1/r.