Multiplication on uniform λ-Cantor sets
Abstract
Let C be the middle-third Cantor set. Define C*C=\x*y:x,y∈ C\, where *=+,-,·, (when *=, we assume y≠0). Steinhaus HS proved in 1917 that \[ C-C=[-1,1], C+C=[0,2]. \] In 2019, Athreya, Reznick and Tyson Tyson proved that \[ C C=n=-∞∞[ 3-n23,3-n 32] . \] In this paper, we give a description of the topological structure and Lebesgue measure of C· C. We indeed obtain corresponding results on the uniform λ-Cantor sets.
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