We consider large-scale point fields which naturally appear in the context of the Kardar-Parisi-Zhang (KPZ) phenomenon. Such point fields are geometrical objects formed by points of mass concentration, and by shocks separating the sources of these points. We introduce similarly defined point fields for processes of coalescing fractional Brownian motions (cfBm). The case of the Hurst index 2/3 is of particular interest for us since, in this case, the power law of the density decay is the same as that in the KPZ phenomenon. In this paper, we present strong numerical evidence that statistical properties of points fields in these two different settings are very similar. We also discuss theoretical arguments in support of the conjecture that the...
We consider the Cole-Hopf solution of the (1+1)-dimensional KPZ equation $\mathcal{H}^f(t,x)$ starte...
We compute the one-point probability distribution for the stationary KPZ equation (i.e. initial data...
We consider first-passage percolation on $\mathbb Z^2$ with independent and identically distributed ...
Last passage percolation (LPP) refers to a broad class of models thought to lie within the Kardar-Pa...
Last passage percolation models are fundamental examples in statistical mechanics where the energy o...
This paper proves an equality in law between the invariant measure of a reflected system of Brownian...
International audienceWe show that simple, stationary point processes of a given intensity on $\mR^d...
For stochastic growth models in the Kardar-Parisi-Zhang (KPZ) class in $1+1$ dimensions, fluctuation...
The conjectured limit of last passage percolation is a scale-invariant, independent, stationary incr...
Percolation has two mean-field theories, the Gaussian fixed point (GFP) and the Landau mean-field th...
48 pages, 6 figuresHeuristics indicate that point processes exhibiting clustering of points have lar...
Two classes of interacting particle systems on Z are shown to be Pfaffian point processes, at any fi...
We construct the analogue of Gaussian multiplicative chaos measures for the local times of planar Br...
We prove that the tagged particles of infinitely many Brownian particles in $ \Rtwo $ interacting vi...
We consider planar directed last-passage percolation on the square lattice with general i.i.d. weigh...
We consider the Cole-Hopf solution of the (1+1)-dimensional KPZ equation $\mathcal{H}^f(t,x)$ starte...
We compute the one-point probability distribution for the stationary KPZ equation (i.e. initial data...
We consider first-passage percolation on $\mathbb Z^2$ with independent and identically distributed ...
Last passage percolation (LPP) refers to a broad class of models thought to lie within the Kardar-Pa...
Last passage percolation models are fundamental examples in statistical mechanics where the energy o...
This paper proves an equality in law between the invariant measure of a reflected system of Brownian...
International audienceWe show that simple, stationary point processes of a given intensity on $\mR^d...
For stochastic growth models in the Kardar-Parisi-Zhang (KPZ) class in $1+1$ dimensions, fluctuation...
The conjectured limit of last passage percolation is a scale-invariant, independent, stationary incr...
Percolation has two mean-field theories, the Gaussian fixed point (GFP) and the Landau mean-field th...
48 pages, 6 figuresHeuristics indicate that point processes exhibiting clustering of points have lar...
Two classes of interacting particle systems on Z are shown to be Pfaffian point processes, at any fi...
We construct the analogue of Gaussian multiplicative chaos measures for the local times of planar Br...
We prove that the tagged particles of infinitely many Brownian particles in $ \Rtwo $ interacting vi...
We consider planar directed last-passage percolation on the square lattice with general i.i.d. weigh...
We consider the Cole-Hopf solution of the (1+1)-dimensional KPZ equation $\mathcal{H}^f(t,x)$ starte...
We compute the one-point probability distribution for the stationary KPZ equation (i.e. initial data...
We consider first-passage percolation on $\mathbb Z^2$ with independent and identically distributed ...