We show that, for general convolution approximations to a large class of log-correlated fields, including the 2d Gaussian free field, the critical chaos measures with derivative normalisation converge to a limiting measure µ This limiting measure does not depend on the choice of approximation. Moreover, it is equal to the measure obtained using the Seneta–Heyde renormalisation at criticality, or using a white-noise approximation to the field
This thesis focusses on the properties of, and relationships between, several fundamental objects ar...
Abstract. We study the maximum of a Gaussian field on [0, 1]d (d ≥ 1) whose correlations decay loga-...
We study the zeroes of a family of random holomorphic functions on the unit disc, distinguished by t...
We show that, for general convolution approximations to a large class of log-correlated fields, incl...
Gaussian Multiplicative Chaos is a way to produce a measure on R[superscript d] (or subdomain of R[s...
We consider Gaussian multiplicative chaos measures defined in a general setting of metric measure sp...
1 figure; revised versionIn this paper, we study Gaussian multiplicative chaos in the critical case....
International audienceGaussian Multiplicative Chaos is a way to produce a measure on $\R^d$ (or subd...
Abstract A completely elementary and self-contained proof of convergence of Gaussian multiplicative ...
We study how the Gaussian multiplicative chaos (GMC) measures μγ corresponding to the 2D Gaussian fr...
In this paper, we study Gaussian multiplicative chaos in the critical case. We show that the so-call...
Funder: Österreichischen Akademie der Wissenschaften; doi: http://dx.doi.org/10.13039/501100001822Ab...
Gaussian Multiplicative Chaos is a way to produce a measure on $\R^d$ (or subdomain of $\R^d$) of th...
15 pages, no figures neededInternational audienceWe study how the Gaussian multiplicative chaos (GMC...
For an N×N random unitary matrix U_N, we consider the random field defined by counting the number of...
This thesis focusses on the properties of, and relationships between, several fundamental objects ar...
Abstract. We study the maximum of a Gaussian field on [0, 1]d (d ≥ 1) whose correlations decay loga-...
We study the zeroes of a family of random holomorphic functions on the unit disc, distinguished by t...
We show that, for general convolution approximations to a large class of log-correlated fields, incl...
Gaussian Multiplicative Chaos is a way to produce a measure on R[superscript d] (or subdomain of R[s...
We consider Gaussian multiplicative chaos measures defined in a general setting of metric measure sp...
1 figure; revised versionIn this paper, we study Gaussian multiplicative chaos in the critical case....
International audienceGaussian Multiplicative Chaos is a way to produce a measure on $\R^d$ (or subd...
Abstract A completely elementary and self-contained proof of convergence of Gaussian multiplicative ...
We study how the Gaussian multiplicative chaos (GMC) measures μγ corresponding to the 2D Gaussian fr...
In this paper, we study Gaussian multiplicative chaos in the critical case. We show that the so-call...
Funder: Österreichischen Akademie der Wissenschaften; doi: http://dx.doi.org/10.13039/501100001822Ab...
Gaussian Multiplicative Chaos is a way to produce a measure on $\R^d$ (or subdomain of $\R^d$) of th...
15 pages, no figures neededInternational audienceWe study how the Gaussian multiplicative chaos (GMC...
For an N×N random unitary matrix U_N, we consider the random field defined by counting the number of...
This thesis focusses on the properties of, and relationships between, several fundamental objects ar...
Abstract. We study the maximum of a Gaussian field on [0, 1]d (d ≥ 1) whose correlations decay loga-...
We study the zeroes of a family of random holomorphic functions on the unit disc, distinguished by t...