This paper proves an equality in law between the invariant measure of a reflected system of Brownian motions and a vector of point-to-line last passage percolation times in a discrete random environment. A consequence describes the distribution of the all-time supremum of Dyson Brownian motion with drift. A finite temperature version relates the point-to-line partition functions of two directed polymers, with an inverse-gamma and a Brownian environment, and generalises Dufresne’s identity. Our proof introduces an interacting system of Brownian motions with an invariant measure given by a field of point-to-line log partition functions for the log-gamma polymer
We consider a flip dynamics for directed (1+d)-dimensional lattice paths with length L. The model ca...
We consider two models for directed polymers in space-time independent random media (the O'Connell-Y...
In this article, we try to give a rather complete picture of the behavior of the free energy for a m...
This paper proves an equality in law between the invariant measure of a reflected system of Brownian...
The results of Chapter 2 are related to point-to-line last passage percolation and directed polymers...
We consider an interacting particle system on the lattice involving pushing and blocking interaction...
The conjectured limit of last passage percolation is a scale-invariant, independent, stationary incr...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
Abstract. We prove the scaling relation = 2 1 between the transversal expo-nent and the uctuati...
We consider large-scale point fields which naturally appear in the context of the Kardar-Parisi-Zhan...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
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 thesis deals with some (1 + 1)-dimensional la.ice path models from the KPZ universality class: ...
We consider a flip dynamics for directed (1+d)-dimensional lattice paths with length L. The model ca...
We consider two models for directed polymers in space-time independent random media (the O'Connell-Y...
In this article, we try to give a rather complete picture of the behavior of the free energy for a m...
This paper proves an equality in law between the invariant measure of a reflected system of Brownian...
The results of Chapter 2 are related to point-to-line last passage percolation and directed polymers...
We consider an interacting particle system on the lattice involving pushing and blocking interaction...
The conjectured limit of last passage percolation is a scale-invariant, independent, stationary incr...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
Abstract. We prove the scaling relation = 2 1 between the transversal expo-nent and the uctuati...
We consider large-scale point fields which naturally appear in the context of the Kardar-Parisi-Zhan...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
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 thesis deals with some (1 + 1)-dimensional la.ice path models from the KPZ universality class: ...
We consider a flip dynamics for directed (1+d)-dimensional lattice paths with length L. The model ca...
We consider two models for directed polymers in space-time independent random media (the O'Connell-Y...
In this article, we try to give a rather complete picture of the behavior of the free energy for a m...