Intermediate dimensions of complementary sets

Abstract

Given a positive, non-increasing sequence a with finite sum equal to 1, we consider the family of all closed subsets of [0,1] whose complementary open intervals have lengths given by a rearrangement of the sequence a. We study the full range of possible θ-intermediate dimensions of these sets and, under suitable assumptions on the sequence, we show that this range forms a closed interval, whose endpoints we compute explicitly. This paper fills a gap in the literature concerning the dimensional properties of complementary sets.

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