The algebraic difference of a Cantor set and its complement
Abstract
Let C⊂eq[0,1] be a Cantor set. In the classical C problems, modifying the ``size'' of C has a magnified effect on C. However, any gain in C necessarily results in a loss in Cc, and vice versa. This interplay between C and its complement Cc raises interesting questions about the delicate balance between the two, particularly in how it influences the ``size'' of Cc-C. One of our main results indicates that the Lebesgue measure of Cc-C has a greatest lower bound of 32.
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