Numeral systems with non-zero redundancy and their applications in the theory of locally complex functions

Abstract

In this paper we study representations of real numbers in a numeral system with the base a>1 and alphabet (digits set) A\0,1,...,r\, a-1<r∈ N given by \[x=Σn=1∞αnan raα1α2...αn..., αn∈ A.\] Since the alphabet is redundant the numbers from the interval [0;ra-1] have not a single representation and can even have a continuous set of different representations. We describe the geometry (topological and metric properties) of such representations (the ra-representations) in terms of cylinders defined by \[rac1c2...cm= \x: x=rac1c2...cma1a2...an..., an∈ A\,\] We analyze their properties in detail, including the specific nature of overlaps. We present results on the structural, variational, topological, metric and partially fractal properties of the function defined by \[f(x=Σn=1∞αn(r+1)n)= raα1α2...αn...,αn ∈ A.\] We prove the function is continuous at all points of the interval [0,1] that have a unique representation in the classical numeral system on the base r+1 and prove the function is discontinuous at points of a countable everywhere dense set in [0,1]. Furthermore, we show that the function is nowhere monotonic and has unlimited variation. In the particular case r=1 and a=1+52, we specify fractal level sets with Hausdorff--Besicovitch dimension not less than -a2.

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