On the maximal run-length function in the L\"uroth expansion
Abstract
Let \( n(x) \) denote the maximal run-length among the first \( n \) digits of the L\"uroth expansion of \( x∈(0,1] \). While \( n(x) \) grows logarithmically, we investigate the finer multifractal properties of the exceptional set where n(x) exhibits linear growth. Specifically, we establish the Hausdorff dimension of the set \[ \ x ∈ (0,1] : n ∞ n(x)n = α, \; n ∞ n(x)n = β \, \] for all \( 0 α β 1 \).
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