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Let $\mu$ be a self-similar measure on the line satisfying the strong separation condition, or more generally, a Gibbs measure supported on a nonlinear Cantor set on the line. We conduct the one-sided multifractal analysis of $\mu$. This is based on joint work with Cai-Yun Ma.

28A80 ; 28A78 ; 37C45

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In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for explicit values of the parameter.[-]

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for ...[+]

28A80 ; 37C45

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In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for explicit values of the parameter.[-]

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for ...[+]

28A80 ; 37C45

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Déposez votre fichier ici pour le déplacer vers cet enregistrement.

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for explicit values of the parameter.[-]

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for ...[+]

28A80 ; 37C45

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Déposez votre fichier ici pour le déplacer vers cet enregistrement.

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for explicit values of the parameter.[-]

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for ...[+]

28A80 ; 37C45

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Déposez votre fichier ici pour le déplacer vers cet enregistrement.

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for explicit values of the parameter.[-]

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for ...[+]

28A80 ; 37C45

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Déposez votre fichier ici pour le déplacer vers cet enregistrement.

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for explicit values of the parameter.[-]

In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive combinatorics and present some of the main applications, including the smoothness of Bernoulli convolutions outside of a small set of exceptions, and for ...[+]

28A80 ; 37C45

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Documents 37C45 7 results

One-sided multifractal analysis of Gibbs measures on the line - Feng, De-Jun (Author of the conference) | CIRM H NEW

Additive combinatorics methods in fractal geometry - lecture 2 - Shmerkin, Pablo (Author of the conference) | CIRM H NEW

Additive combinatorics methods in fractal geometry - lecture 3 - Shmerkin, Pablo (Author of the conference) | CIRM H NEW

Additive combinatorics methods in fractal geometry - lecture 1 - Varju, Peter (Author of the conference) | CIRM H NEW

Additive combinatorics methods in fractal geometry - lecture 2 - Varju, Peter (Author of the conference) | CIRM H NEW

Additive combinatorics methods in fractal geometry - lecture 1 - Shmerkin, Pablo (Author of the conference) | CIRM H NEW

Additive combinatorics methods in fractal geometry - lecture 3 - Varju, Peter (Author of the conference) | CIRM H NEW