Invariant densities for random $\beta$-expansions

“…One aspect of these representations that makes them interesting is that for α ∈ ( 1 M +1 , 1) a generic x ∈ I α,M has many α-expansions (cf. [4,21,22]). This naturally leads researchers to study the set of x ∈ I α,M with a unique α-expansion, the so called univoque set.…”

Section: Preliminariesmentioning

confidence: 99%

“…In fact it can be shown that Lebesgue almost every t ∈ Γ α − Γ α has a continuum of α-expansions (cf. [4,21,22]). Thus within the parameter space (1/3, 1/2) we are forced to have the following more complicated interpretation of Γ α ∩ (Γ α + t) (cf.…”

Section: Introductionmentioning

confidence: 99%

Unique expansions and intersections of Cantor sets

Baker

Kong

2017

Nonlinearity

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Abstract. To each α ∈ (1/3, 1/2) we associate the Cantor setIn this paper we consider the intersection Γ α ∩ (Γ α + t) for any translation t ∈ R. We pay special attention to those t with a unique {−1, 0, 1} α-expansion, and study the setWe prove that there exists a transcendental number α KL ≈ 0.39433 . . . such that: D α is finite for α ∈ (α KL , 1/2), D αKL is infinitely countable, and D α contains an interval for α ∈ (1/3, α KL ). We also prove that D α equals [0, log 2 − log α ] if and only if α ∈ (1/3, 3− √ 5 2 ]. As a consequence of our investigation we prove some results on the possible values of dim H (Γ α ∩ (Γ α + t)) when Γ α ∩ (Γ α + t) is a self-similar set. We also give examples of t with a continuum of {−1, 0, 1} α-expansions for which we can explicitly calculate dim H (Γ α ∩ (Γ α + t)), and for which Γ α ∩ (Γ α + t) is a self-similar set. We also construct α and t for which Γ α ∩ (Γ α + t) contains only transcendental numbers.Our approach makes use of digit frequency arguments and a lexicographic characterisation of those t with a unique {−1, 0, 1} α-expansion.

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“…Unlike integer base expansions, for a given β ∈ (1, 2), it is well-known that typically a real number x ∈ I β := [0, 1/(β − 1)] has a continuum of β-expansions with digits set {0, 1} (cf. [2,19]), i.e., for Lebesuge almost every x ∈ I β there exist a continuum of zero-one sequences (x i ) such that x = behaves like a Devil's staircase. Interestingly, for any k = 2, 3, .…”

Section: Introductionmentioning

confidence: 99%

Multiple expansions of real numbers with digits set $$\left\{ 0,1,q\right\} $$ 0 , 1 , q

et al. 2018

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For q > 1 we consider expansions in base q with digits set {0, 1, q}. Let U q be the set of points which have a unique q-expansion. For k = 2, 3, . . . , ℵ 0 let B k be the set of bases q > 1 for which there exists x having precisely k different q-expansions, and for q ∈ B k letq be the set of all such x's which have exactly k different q-expansions. In this paper we show thatwhere q c ≈ 2.32472 is the appropriate root of x 3 − 3x 2 + 2x − 1 = 0. Moreover, we show that for any integer k ≥ 2 and any q ∈ B k the Hausdorff dimensions of U (k) q and U q are the same, i.e.,Finally, we conclude that the set of points having a continuum of q-expansions has full Hausdorff dimension.

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Invariant densities for random $\beta$-expansions

Cited by 85 publications

References 13 publications

On Small Bases for Which 1 Has Countably Many Expansions

On Small Bases for Which 1 Has Countably Many Expansions

Unique expansions and intersections of Cantor sets

Multiple expansions of real numbers with digits set $$\left\{ 0,1,q\right\} $$ 0 , 1 , q

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