Takagi-van der Waerden functions in metric spaces and its Lipschitz derivatives

Abstract

We introduce the Takagi--van der Waerden function with parameters a>b>0 by setting fa,b(x)=Σn=1∞ bn d(x,Sn), where Sn is a maximal 1an-separated set in a metric space X. So, if X= R and Sn=1an Z then f2,1 is the Takagi function and f10,1 is the van der Waerden function which are the famous examples of nowhere differentiable functions. Then we prove that the big Lipschitz derivative Lip fa,b(x)=+∞ if a>b>2 and x is a non-isolated point of X. Moreover, if the shell porosity ps(X,x)<λ<1 for some λ and each non-isolated point x∈ X then the little Lipschitz derivative lip fa,b(x)=+∞ for large enough a>b and any non-isolated point x∈ X. In particular, this is true for any normed space. Finally, we prove that for any open set A in a metric (normed) space X without isolated points there exists a continuous function f such that Lip f(x)=+∞ (and lip f(x)=+∞) exactly on A.