Abstracts
Tom Alberts
New York University
Hausdorff dimension of the SLE curve intersected with the real line
Amine Asselah
Université de Paris XII
Intersection and self-intersection local times for random walks in dimension 5 or more
Vincent Beffara
ENS Lyon
Isotropic embeddings
Rafael Benguria
Pontificia Universidad Católica de Chile
Fourier Transform, Null Variety and Laplacian's Eigenvalues
Jean Bérard
Université de Lyon
Large deviations of the front in a one dimensional model of X+Y-->2X
Julien Berestycki
Université de Paris VI
Coalescents and branching processes: how fast do they come down from infinity?
Nathanael Berestycki
University of Cambridge
Velocity gain for some self-repelling processes
Michiel van den Berg
University of Bristol
On the heat equation with singular initial data
Erwin Bolthausen
University of Zurich
A fixed point proof of local central limit theorems
Francis Comets
Université de Paris VII
Stochastic billiards on general tables
Joe Conlon
University of Michigan
The Becker-Doering (B-D) and Lifschitz-Slyozov-Wagner (LSW) equations
María Cristina Depassier
Pontificia Universidad Católica de Chile
Variational results for the speed of pulled and pushed fronts with cutoff
Joaquín Fontbona
Universidad de Chile
Measurabiliy of Optimal Transportation and Convergence Rate for Landau Type Interacting Particle Systems
Luiz Renato Fontes
Universidade de Sao Paulo
Aging scaling limits for trap models related to the REM
Mark Holmes
University of Auckland, New Zealand
Monotonicity for excited random walk in high dimensions
Milton Jara
Université de Louvain
Interacting particle systems with long jumps: an example of superdiffusivity
Leonid Koralov
Princeton University
Mathematical model for polymers
Elena Kosygina
Baruch College and CUNY Graduate Center
Positively and negatively excited random walks on integers
Yevgeniy Kovchegov
Oregon State University
Tunneling to the future and perfect coupling
Servet Martínez
Universidad de Chile
Quasi-stationary distributions for a system of birth and death chains whose traits are located in a continuum
Tom Mountford
EPF Lausanne
Signed voter models
Chuck Newman
New York University
Dynamical discrete web and its continuum analogues
Serguei Popov
Universidade de Sao Paulo
Shape and local growth for multidimensional branching random walks in random environment
José Ramírez
Universidad de Costa Rica
Diffusion limits of eigenvalues of random matrices
Leonardo Rolla
IMPA, Rio de Janeiro
Phase transition for activated random walk models
Jeremy Quastel
University of Toronto
Efect of noise on front propagation in KPP equations
Valentin Sisko
Universidade Federal Fluminense, Niteroi
Escape of mass in zero-range processes with random rates
Alain-Sol Sznitman
ETH Zurich
Random walks and random interlacements
Pierre Tarres
University of Oxford
An asymptotic result for Brownian polymers
Glauco Valle
Universidade Federal do Rio de Janeiro
Hydrodynamics for a one-dimensional model with dissipation of mass at the boundary
Nobuo Yosida
Kyoto University
Branching random walks in random environment: diffusive behavior and localization