Renewal of singularity sets of random self-similar measures

Barral, Julien; Seuret, Stéphane

doi:10.1017/s0001867800001658

Cited by 7 publications

(15 citation statements)

References 45 publications

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“…The second one contains limits of [0,1] d -martingales considered in the multiplicative chaos in the meaning of [21]. It is shown in [9,10,11] that these measures µ obey conditions P1-3 for suitable systems {(x n , λ n )} n (including those of Section 5·1) when h ranges in the interval where τ • (Random) Gibbs measures.…”

Section: ·2 Random Self-similar Measures Satisfying Conditions P1-3mentioning

confidence: 99%

“…The first examples are the independent multiplicative cascades, or Mandelbrot martingales introduced in [27] and then studied extensively in [27,23,18,29,28,1,15,4,5,10]. They are a particular case of a wider class of [0,1] d -martingales -see [7] which satisfy condition P2(µ, ρ, {(x n , λ n )}, h).…”

Section: ·2 Random Self-similar Measures Satisfying Conditions P1-3mentioning

confidence: 99%

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The multifractal nature of heterogeneous sums of Dirac masses

Barral

Seuret

2008

Math. Proc. Camb. Phil. Soc.

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This article investigates the natural problem of performing the multifractal analysis of heterogeneous sums of Dirac masseswhere (x n ) n≥0 is a sequence of points in [0,1] d and (w n ) n≥0 is a positive sequence of weights such that n≥0 w n < ∞. We consider the case where the points x n are roughly uniformly distributed in [0,1] d , and the weights w n depend on a random self-similar measure µ, a parameter ρ ∈ (0, 1], and a sequence of positive radii (λ n ) n≥1 converging to 0 in the following wayThe measure ν has a rich multiscale structure. The computation of its multifractal spectrum is related to heterogeneous ubiquity properties of the system {(x n , λ n )} n with respect to µ.

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Section: ·2 Random Self-similar Measures Satisfying Conditions P1-3mentioning

confidence: 99%

Section: ·2 Random Self-similar Measures Satisfying Conditions P1-3mentioning

confidence: 99%

The multifractal nature of heterogeneous sums of Dirac masses

Barral

Seuret

2008

Math. Proc. Camb. Phil. Soc.

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“…We made this dyadic choice for sake of simplicity. Nevertheless, we mention that Theorem 4 also holds for measures that depend on a b-adic grid with b greater than 2 (see [12,13]). …”

Section: Multifractal Formalism For Measuresmentioning

confidence: 99%

“…In this work, we detail the example of dyadic Mandelbrot random multiplicative cascades, and we refer the reader to [12,13] for more details on statistical self-similar measures and for the proof of Theorem 4 in these cases. The wavelet series F µ associated with Mandelbrot cascades is particularly interesting, since the perturbations of such series allows us to derive the Hausdorff multifractal spectrum of the "random wavelet cascades" of Arnéodo, Bacry and Muzy [3].…”

Section: Wavelet Series Derived From Statistically Self-similar Measuresmentioning

confidence: 99%