Add to ORKGWe extend the weak universality of KPZ in [HQ18] to weakly asymmetric interface models with general growth mechanisms beyond polynomials. A key new ingredient is a pointwise bound on correlations of trigonometric functions of Gaussians in terms of their polynomial counterparts. This enables us to reduce the problem of a general nonlinearity with sufficient regularity to that of a polynomial
46 pages, 7 figuresInternational audienceWe study the scaling properties of a one-dimensional interf...
We revisit the anchored Toom interface and use KPZ scaling theory to argue that the interface fluctu...
A series of recent works focused on two-dimensional (2D) interface growth models in the so-called an...
We extend the weak universality of KPZ in [HQ18] to weakly asymmetric interface models with general ...
We present a self-contained proof of a uniform bound on multi-point correlations of trigonometric fu...
This work is about some random interface growth models whose microscopic evolution is typically repr...
We consider three models of evolving interfaces intimately related to the weakly asymmetric simple e...
We consider a large class of -dimensional continuous interface growth models and we show that, in b...
Abstract. There has been much success in describing the limiting spatial fluctuations of growth mode...
Interfaces are created to separate two distinct phases in a situation in which phase coexistence occ...
We describe a class of exactly solvable random growth models of one and two-dimensional interfaces. ...
The probabilities $P_\pm(t_0,t)$ that a growing Kardar-Parisi-Zhang interface remains above or below...
16 pages, 3 figuresInternational audienceA series of recent works focused on two-dimensional interfa...
We report on an extensive numerical investigation of the Kardar-Parisi-Zhang equation describing non...
Abstract. We present a comprehensive numerical investigation of non-universal parameters and correct...
46 pages, 7 figuresInternational audienceWe study the scaling properties of a one-dimensional interf...
We revisit the anchored Toom interface and use KPZ scaling theory to argue that the interface fluctu...
A series of recent works focused on two-dimensional (2D) interface growth models in the so-called an...
We extend the weak universality of KPZ in [HQ18] to weakly asymmetric interface models with general ...
We present a self-contained proof of a uniform bound on multi-point correlations of trigonometric fu...
This work is about some random interface growth models whose microscopic evolution is typically repr...
We consider three models of evolving interfaces intimately related to the weakly asymmetric simple e...
We consider a large class of -dimensional continuous interface growth models and we show that, in b...
Abstract. There has been much success in describing the limiting spatial fluctuations of growth mode...
Interfaces are created to separate two distinct phases in a situation in which phase coexistence occ...
We describe a class of exactly solvable random growth models of one and two-dimensional interfaces. ...
The probabilities $P_\pm(t_0,t)$ that a growing Kardar-Parisi-Zhang interface remains above or below...
16 pages, 3 figuresInternational audienceA series of recent works focused on two-dimensional interfa...
We report on an extensive numerical investigation of the Kardar-Parisi-Zhang equation describing non...
Abstract. We present a comprehensive numerical investigation of non-universal parameters and correct...
46 pages, 7 figuresInternational audienceWe study the scaling properties of a one-dimensional interf...
We revisit the anchored Toom interface and use KPZ scaling theory to argue that the interface fluctu...
A series of recent works focused on two-dimensional (2D) interface growth models in the so-called an...