Characterization of the algebraic difference of special affine Cantor sets
Abstract
We investigate some self-similar Cantor sets C(l,r,p), which we call S-Cantor sets, generated by numbers l,r,p ∈ N, l+r<p. We give a full characterization of the set C(l1,r1,p)-C(l2,r2,p) which can take one of the form: the interval [-1,1], a Cantor set, an L-Cantorval, an R-Cantorval or an M-Cantorval. As corollaries we give examples of Cantor sets and Cantorvals, which can be easily described using some positional numeral systems.
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