A class of Tribin functions related to s-symbol encodings of numbers with a zero redundancy

Abstract

In this paper, we consider a continuum class of continuous nowhere monotonic functions that generalize certain non-differentiable functions, including the Bush function, Wunderlich function, continuous Cantor projectors, Tribin function, etc. We consider a construction of the function related to s-symbol representations of numbers with a zero redundancy that are topologically equivalent to the classical s-adic representation (a value of the function has a two-symbol representation). Moreover, the condition on the first digit of a representation for the value of the function is more general than conditions considered before. The main object of study is a continuous function defined by equality gather* f(s*α1α2…αn…) = 2*β1β2…βn…, αn ∈ \ 0, 1, 2, …, s - 1 \ As, β1 = cases 0 & if α1 ∈ A0, 1 & if α1 ∈ A1, cases βn+1 = cases βn & if αn+1 = αn, 1 - βn & if αn+1 ≠ αn. cases gather* where s*α1α2…αn… is an s-symbol representation of a number x ∈ [0, 1] that is topologically equivalent to the classical s-adic representation, 2*β1β2…βn… is a two-symbol representation that is topologically equivalent to the classical binary representation, and A0 A1 = As, A0 ≠ As ≠ A1.