On one class of nowhere non-monotonic functions with fractal properties that contains a subclass of singular functions
Abstract
We study one class of continuous functions f defined on segment [0,1] by equality f(x)=δα1(x)1+Σ∞k=2[δαk(x)kΠk-1j=1gαj (x)j]G*3α1α2…αk…, where ||q*ik|| is given infinite stochastic positive matrix (i=0,1,2; k ∈ N); β0k=0, β1k=q0k, β2k=q0k+q1k; (k) is given sequence of numbers such that 0≤slant k ≤slant 1 ; g0k=1+k3=g2k, g 1k=1-2k3, δ0k=0, δ1k=g0k, δ2k=g0k+g1k, k∈ N. We found criteria of strict monotonicity, non monotonicity and nowhere monotonicity, non-differentiability and singularity of the functions. We pay attention to properties of level sets of the functions.
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