This work deals with the divisible sandpile model when an initial configuration sampled from a heavy-tailed distribution. Extending results of Levine et al. (2015) and Cipriani et al. (2016) we determine sufficient conditions for stabilization and non-stabilization on infinite graphs. We determine furthermore that the scaling limit of the odometer on the torus is an α-stable random distribution
We study sandpile models with stochastic toppling rules and having sticky grains so that with a nonz...
This thesis developed a computer powered simulation study of the divisible sandpile model. It introd...
The current literature on sandpile models mainly deals with the abelian sandpile model (ASM) and its...
This work deals with the divisible sandpile model when an initial configuration sampled from a heavy...
In a recent work [LMPU] prove that the odometer function of a divisible sandpile model on a finite g...
Abstract: We study the stationary distribution of the standard Abelian sandpile model in the box $La...
The sandpile model is a discrete model for diffusion of grains on a graph introduced by physicists B...
This contribution is a review of the deep and powerful connection between the large scale properties...
In this paper we investigate scaling limits of the odometer in divisible sandpiles on d-dimensional ...
A popular theory of self-organized criticality relates the critical behavior of driven dissipative s...
In the divisible sandpile model, we consider a collection of i.i.d. Gaussian heights on a finite gra...
A popular theory of self-organized criticality relates driven dissipative systems to systems with co...
We perform large-scale simulations of directed sandpile models with both deterministic and stochasti...
Le modèle du tas de sable est un modèle de diffusion discret et isotrope introduit par les physicien...
A popular theory of self-organized criticality predicts that the stationary density of the Abelian s...
We study sandpile models with stochastic toppling rules and having sticky grains so that with a nonz...
This thesis developed a computer powered simulation study of the divisible sandpile model. It introd...
The current literature on sandpile models mainly deals with the abelian sandpile model (ASM) and its...
This work deals with the divisible sandpile model when an initial configuration sampled from a heavy...
In a recent work [LMPU] prove that the odometer function of a divisible sandpile model on a finite g...
Abstract: We study the stationary distribution of the standard Abelian sandpile model in the box $La...
The sandpile model is a discrete model for diffusion of grains on a graph introduced by physicists B...
This contribution is a review of the deep and powerful connection between the large scale properties...
In this paper we investigate scaling limits of the odometer in divisible sandpiles on d-dimensional ...
A popular theory of self-organized criticality relates the critical behavior of driven dissipative s...
In the divisible sandpile model, we consider a collection of i.i.d. Gaussian heights on a finite gra...
A popular theory of self-organized criticality relates driven dissipative systems to systems with co...
We perform large-scale simulations of directed sandpile models with both deterministic and stochasti...
Le modèle du tas de sable est un modèle de diffusion discret et isotrope introduit par les physicien...
A popular theory of self-organized criticality predicts that the stationary density of the Abelian s...
We study sandpile models with stochastic toppling rules and having sticky grains so that with a nonz...
This thesis developed a computer powered simulation study of the divisible sandpile model. It introd...
The current literature on sandpile models mainly deals with the abelian sandpile model (ASM) and its...