We study n non-intersecting Brownian motions corresponding to initial configurations which have a vanishing density in the large n limit at an interior point of the support. It is understood that the point of vanishing can propagate up to a critical time, and we investigate the nature of the microscopic space-time correlations near the critical point and critical time. We show that they are described either by the Pearcey process or by the Airy line ensemble, depending on whether a simple integral related to the initial configuration vanishes or not. Since the Airy line ensemble typically arises near edge points of the macroscopic density, its appearance in the interior of the spectrum is surprising. We explain this phenomenon by showing th...
We consider the Brownian interlacements model in Euclidean space, introduced by Sznitman (2013). We ...
We consider Brownian motions with one-sided collisions, meaning that each particle is reflected at i...
International audienceWe compute analytically the probability $S(t)$ that a set of $N$ Brownian path...
Claeys T, Neuschel T, Venker M. Critical Behavior of Non-intersecting Brownian Motions. COMMUNICATIO...
We consider an ensemble of n nonintersecting Brownian particles on the unit circle with diffusion pa...
A few years ago, Aptekarev, Bleher and Kuijlaars have demonstrated, using an earlier result due to K...
Consider N=n1+n2+...+np non-intersecting Brownian motions on the real line, starting from the origin...
This dissertation studies the late-time critical behavior of interacting many- particle systems. Two...
The extended Airy kernel describes the space-time correlation functions for the Airy proces...
Consider n nonintersecting Brownian particles on R (Dyson Brownian motions), all starting from the o...
We consider n one-dimensional Brownian motions, such that n/2 Brownian motions start at time t=0 in ...
Putting dynamics into random matrix models leads to finitely many nonintersecting Brownian motions o...
AbstractWe consider n one-dimensional Brownian motions, such that n/2 Brownian motions start at time...
Abstract. Consider a time-varying collection of n points on the positive real axis, modeled as Expon...
Finkelshtein DL, Kondratiev Y, Kutoviy OV, Lytvynov E. Binary jumps in continuum. I. Equilibrium pro...
We consider the Brownian interlacements model in Euclidean space, introduced by Sznitman (2013). We ...
We consider Brownian motions with one-sided collisions, meaning that each particle is reflected at i...
International audienceWe compute analytically the probability $S(t)$ that a set of $N$ Brownian path...
Claeys T, Neuschel T, Venker M. Critical Behavior of Non-intersecting Brownian Motions. COMMUNICATIO...
We consider an ensemble of n nonintersecting Brownian particles on the unit circle with diffusion pa...
A few years ago, Aptekarev, Bleher and Kuijlaars have demonstrated, using an earlier result due to K...
Consider N=n1+n2+...+np non-intersecting Brownian motions on the real line, starting from the origin...
This dissertation studies the late-time critical behavior of interacting many- particle systems. Two...
The extended Airy kernel describes the space-time correlation functions for the Airy proces...
Consider n nonintersecting Brownian particles on R (Dyson Brownian motions), all starting from the o...
We consider n one-dimensional Brownian motions, such that n/2 Brownian motions start at time t=0 in ...
Putting dynamics into random matrix models leads to finitely many nonintersecting Brownian motions o...
AbstractWe consider n one-dimensional Brownian motions, such that n/2 Brownian motions start at time...
Abstract. Consider a time-varying collection of n points on the positive real axis, modeled as Expon...
Finkelshtein DL, Kondratiev Y, Kutoviy OV, Lytvynov E. Binary jumps in continuum. I. Equilibrium pro...
We consider the Brownian interlacements model in Euclidean space, introduced by Sznitman (2013). We ...
We consider Brownian motions with one-sided collisions, meaning that each particle is reflected at i...
International audienceWe compute analytically the probability $S(t)$ that a set of $N$ Brownian path...