Hausdorff dimension of exceptional sets arising in θ-expansions

Abstract

For a fixed θ2=1/m, m ∈ N+, let x ∈ [0, θ) and [a1(x) θ, a2(x) θ, …] be the θ-expansion of x. Our first goal is to extend for θ-expansions the results of Jarnik J-1928 concerning the set of badly aproximable numbers and the set of irrationals whose partial quotients do not exceed a positive integer. Define Ln (x)= 1 ≤ i ≤ n ai(x), x ∈ :=[0, θ) Q . The second goal is to complete our result inspired by Philipp Ph-1976 % \[ n ∞ Ln(x) nn = 1 ( 1+ θ2) for a.e. x ∈ [0, θ]. \] % In this regard we prove that for any η > 0 the set \[ E(η) = x ∈ : n ∞ Ln(x) nn = η \] is of full Hausdorff dimension.