Ilia Binder scite author profile

We consider chordal SLE(kappa) curves for kappa > 4, where the intersection of the curve with the boundary is a random fractal of almost sure Hausdorff dimension min {2-8/kappa,1}. We study the random sets of points at which the curve collides with the real line at a specified "angle" and compute an almost sure dimension spectrum describing the metric size of these sets. We work with the forward SLE flow and a key tool in the analysis is Girsanov's theorem, which is used to study events on which moments concentrate. The two-point correlation estimates are proved using the direct method.Comment: 21 page

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Almost periodicity in time of solutions of the KdV equation

Binder¹,

Damanik²,

Goldstein³

et al. 2018

Duke Math. J.

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Harmonic Measure and Winding of Conformally Invariant Curves

Duplantier

Binder

2002

Phys. Rev. Lett.

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The exact joint multifractal distribution for the scaling and winding of the electrostatic potential lines near any conformally invariant scaling curve is derived in two dimensions. Its spectrum f(alpha,lambda) gives the Hausdorff dimension of the points where the potential scales with distance r as H approximately r(alpha) while the curve logarithmically spirals with a rotation angle phi=lambdalnr. It obeys the scaling law f(alpha,lambda)=(1+lambda(2))f(alpha)-blambda(2) with alpha=alpha/(1+lambda(2)) and b=(25-c)/12, and where f(alpha) identical with f(alpha,0) is the pure harmonic measure spectrum, and c the conformal central charge. The results apply to O(N) and Potts models, as well as to stochastic Löwner evolution.

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Computability of Brolin-Lyubich Measure

Binder

Braverman

Rojas

et al. 2011

Commun. Math. Phys.

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Brolin-Lyubich measure $\lambda_R$ of a rational endomorphism $R:\riem\to\riem$ with $\deg R\geq 2$ is the unique invariant measure of maximal entropy $h_{\lambda_R}=h_{\text{top}}(R)=\log d$. Its support is the Julia set $J(R)$. We demonstrate that $\lambda_R$ is always computable by an algorithm which has access to coefficients of $R$, even when $J(R)$ is not computable. In the case when $R$ is a polynomial, Brolin-Lyubich measure coincides with the harmonic measure of the basin of infinity. We find a sufficient condition for computability of the harmonic measure of a domain, which holds for the basin of infinity of a polynomial mapping, and show that computability may fail for a general domain

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Filled Julia Sets with Empty Interior Are Computable

2006

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Ilia Binder

A Dimension Spectrum for SLE Boundary Collisions

Almost periodicity in time of solutions of the KdV equation

Harmonic Measure and Winding of Conformally Invariant Curves

Computability of Brolin-Lyubich Measure

Filled Julia Sets with Empty Interior Are Computable

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