Balázs Bárány, R. Dániel Prokaj
Published 2025-01-17Version 1
In this paper, we investigate the dimension theory of the one parameter family of Okamoto's function. We compute the Hausdorff, box-counting and Assouad dimensions of the graph for a typical choice of parameter. Furthermore, we study the dimension of the level sets. We give an upper bound on the dimension of every level set and we show that for a typical choice of parameters this value is attained for Lebesgue almost every level sets.
Level sets of the run-length function of beta-expansions
Dimension theory for linear solenoids
The Hausdorff dimension of quasi-circles: a result of Ruelle and Bowen
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