One continuum class of fractal functions defined in terms of Q*s-representation

Abstract

In the paper we study a class F of multiparameter functions defined in terms of a polybasic s-adic Q*s-representation of numbers by equation* fa(x=Q*sα1α2…αn…) = Q*s|a1-α1|\,|a2-α2|\,…\,|an-αn|…, equation* where (an) is the sequence of digits for s-adic representation of the parameter a∈[0,1], and equation* Q*sα1α2…αn…= βα1 1+ Σn=2∞ ( βαn n Πj=1n-1 qαj j ) equation* is the Q*s-representation of real numbers generated by a positive stochastic matrix \|qij\| with βαn n=Σi=0αn-1 qin. In this paper we investigate the continuity of the function fa on the sets of Q*s-binary and Q*s-unary numbers. We prove that the functions in this class are continuous on the set of numbers with a unique Q*s-representation. Furthermore, we show that except for f0 and f1, all functions have a countable set of discontinuities at Q*s-binary points. We classify the topological types of the value sets of fa depending on the parameter a. We prove that, if the value set is of Cantor type, then it is zero-dimensional. We describe the structural properties of the level sets of fa in terms of the digits of the s-adic representation of a. In particular, we establish that a level set of the function fa can be an empty set, a finite set, or a continuum. For certain values of s we provide examples of fractal level sets and calculate its fractal dimensions.

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