Log-correlated Gaussian fields: study of the Gibbs measure
50 mins 19 secs,
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Description: |
Zindy, O (Université Pierre & Marie Curie-Paris VI)
Thursday 19 March 2015, 11:30-12:30 |
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Created: | 2015-03-20 17:06 |
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Collection: | Random Geometry |
Publisher: | Isaac Newton Institute |
Copyright: | Zindy, O |
Language: | eng (English) |
Distribution: | World (downloadable) |
Explicit content: | No |
Aspect Ratio: | 16:9 |
Screencast: | No |
Bumper: | UCS Default |
Trailer: | UCS Default |
Abstract: | Co-author: Louis-Pierre ARUIN (CUNY)
Gaussian fields with logarithmically decaying correlations, such as branching Brownian motion and the two-dimensional Gaussian free field, are conjectured to form universality class of extreme value statistics (notably in the work of Carpentier & Le Doussal and Fyodorov & Bouchaud). This class is the borderline case between the class of IID random variables, and models where correlations start to affect the statistics. In this talk, I will describe a general approach based on rigorous works in spin glass theory to describe features of the Gibbs measure of these Gaussian fields. I will focus on the two-dimensional discrete Gaussian free field. At low temperature, we show that the normalized covariance of two points sampled from the Gibbs measure is either 0 or 1. This is used to prove that the joint distribution of the Gibbs weights converges in a suitable sense to that of a Poisson-Dirichlet variable. |
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