We characterise the multiplicative chaos measure $\mathcal{M}$ associated to planar Brownian motion introduced in [BBK94,AHS20,Jeg20a] by showing that it is the only random Borel measure satisfying a list of natural properties. These properties only serve to fix the average value of the measure and to express a spatial Markov property. As a consequence of our characterisation, we establish the scaling limit of the set of thick points of planar simple random walk, stopped at the first exit time of a domain, by showing the weak convergence towards $\mathcal{M}$ of the point measure associated to the thick points. In particular, we obtain the convergence of the appropriately normalised number of thick points of random walk to a nondegenerate r...
We study exceptional sets of the local time of the continuous-time simple random walk in scaled-up (...
To trace back to the origin of the study of planar maps we have to go back to the ’60’s, when effort...
By considering a counting-type argument on Brownian sample paths, we prove aresult similar to that o...
We construct the analogue of Gaussian multiplicative chaos measures for the local times of planar Br...
Funder: Österreichischen Akademie der Wissenschaften; doi: http://dx.doi.org/10.13039/501100001822Ab...
We construct a measure on the thick points of a Brownian loop soup in a bounded domain D of the plan...
In this version, we add the assumption \alpha_1+...+\alpha_p< 2 in Section 7.2, and fix some typos....
Abstract A completely elementary and self-contained proof of convergence of Gaussian multiplicative ...
We study a configuration model on bipartite planar maps where, given $n$ even integers, one samples ...
1 figure; revised versionIn this paper, we study Gaussian multiplicative chaos in the critical case....
We investigate the Martin-L�of random sample paths of Brownian motion, applying techniques from algo...
In this paper, we study Gaussian multiplicative chaos in the critical case. We show that the so-call...
We consider a family of fractional Brownian fields {BH}H∈(0,1) on R d , where H denotes their Hurst ...
We show that the range of a critical branching random walk conditioned to survive forever and the Mi...
We study the random walk X on the range of a simple random walk on ℤ d in dimensions d≥4. When d≥...
We study exceptional sets of the local time of the continuous-time simple random walk in scaled-up (...
To trace back to the origin of the study of planar maps we have to go back to the ’60’s, when effort...
By considering a counting-type argument on Brownian sample paths, we prove aresult similar to that o...
We construct the analogue of Gaussian multiplicative chaos measures for the local times of planar Br...
Funder: Österreichischen Akademie der Wissenschaften; doi: http://dx.doi.org/10.13039/501100001822Ab...
We construct a measure on the thick points of a Brownian loop soup in a bounded domain D of the plan...
In this version, we add the assumption \alpha_1+...+\alpha_p< 2 in Section 7.2, and fix some typos....
Abstract A completely elementary and self-contained proof of convergence of Gaussian multiplicative ...
We study a configuration model on bipartite planar maps where, given $n$ even integers, one samples ...
1 figure; revised versionIn this paper, we study Gaussian multiplicative chaos in the critical case....
We investigate the Martin-L�of random sample paths of Brownian motion, applying techniques from algo...
In this paper, we study Gaussian multiplicative chaos in the critical case. We show that the so-call...
We consider a family of fractional Brownian fields {BH}H∈(0,1) on R d , where H denotes their Hurst ...
We show that the range of a critical branching random walk conditioned to survive forever and the Mi...
We study the random walk X on the range of a simple random walk on ℤ d in dimensions d≥4. When d≥...
We study exceptional sets of the local time of the continuous-time simple random walk in scaled-up (...
To trace back to the origin of the study of planar maps we have to go back to the ’60’s, when effort...
By considering a counting-type argument on Brownian sample paths, we prove aresult similar to that o...