Step roots of Littlewood polynomials and the extrema of functions in the Takagi class

Abstract

We give a new approach to characterizing and computing the set of global maximizers and minimizers of the functions in the Takagi class and, in particular, of the Takagi--Landsberg functions. The latter form a family of fractal functions fα:[0,1] R parameterized by α∈(-2,2). We show that fα has a unique maximizer in [0,1/2] if and only if there does not exist a Littlewood polynomial that has α as a certain type of root, called step root. Our general results lead to explicit and closed-form expressions for the maxima of the Takagi--Landsberg functions with α∈(-2,1/2](1,2). For (1/2,1], we show that the step roots are dense in that interval. If α∈ (1/2,1] is a step root, then the set of maximizers of fα is an explicitly given perfect set with Hausdorff dimension 1/(n+1), where n is the degree of the minimal Littlewood polynomial that has α as its step root. In the same way, we determine explicitly the minima of all Takagi--Landsberg functions. As a corollary, we show that the closure of the set of all real roots of all Littlewood polynomials is equal to [-2,-1/2][1/2,2].