kantelfunktione

Kantelfunktione, in the standard mathematical literature usually referred to as Cantor-type functions, form a family of monotone functions on the unit interval with a distinctive combination of continuity and singularity. The best known example is the Cantor function, also called the Cantor–Lebesgue function. It maps [0,1] into itself, is continuous and non-decreasing, with F(0)=0 and F(1)=1.

Construction and interpretation: For x in [0,1], one can use a base-3 (ternary) expansion. If the expansion

Properties: Cantor-type functions are continuous and increasing on [0,1], but their derivative is zero almost everywhere.

Generalizations: The term Cantor-type functions covers a broader class built from generalized Cantor sets or alternate

Applications and significance: Cantor-type functions serve as canonical examples distinguishing notions such as monotone but non-absolutely