A useful lemma for calculating the Hausdorff dimension of certain sets in Engel expansions

Abstract

Let \sn\ and \tn\ be two sequences of positive real numbers. Under some mild conditions on \sn\ and \tn\, we give the precise formula of the Hausdorff dimension of the set \[ E(\sn\,\tn\):=\x∈(0,1): sn<dn(x)≤ sn+tn, ∀ n≥1\, \] where dn(x) denotes the digit of the Engel expansion of x. This result improves the Lemma 2.6 of Shang and Wu (2021JNT), and is very useful for calculating the Hausdorff dimension of certain sets in Engel expansions.

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