Blanchet, Adrien - Groupe de Recherche en Economie Math�matique et Quantitative, Universit� de Toulouse 1

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Blanchet, Adrien - Groupe de Recherche en Economie Math�matique et Quantitative, Universit� de Toulouse 1

On the continuity of the time derivative of the solution to the parabolic obstacle problem with variable coefficients
Improved intermediate asymptotics for the heat equation$,$$ Jean-Philippe Bartiera
Asymptotic behaviour for small mass in the two-dimensional parabolic-elliptic Keller-Segel model
Travelling fronts in stochastic Stokes' drifts Adrien Blanchet a
Infinite Time Aggregation for the Critical Patlak-Keller-Segel model in R2
CONVERGENCE OF THE MASS-TRANSPORT STEEPEST DESCENT SCHEME FOR THE SUB-CRITICAL
On the singular set of the parabolic obstacle problem Adrien BLANCHET a
STOCHASTIC STOKES' DRIFT, HOMOGENIZED FUNCTIONAL INEQUALITIES, AND LARGE TIME BEHAVIOR OF BROWNIAN
ASYMPTOTICS OF THE FAST DIFFUSION EQUATION VIA ENTROPY ESTIMATES
On the regularity of the exercise boundary for American options Adrien BLANCHET a,b
On the one-dimensional parabolic obstacle problem with variable coefficients
Functional inequalities, thick tails and asymptotics for the critical mass Patlak-Keller-Segel model
Large time asymptotics of the doubly nonlinear equation in the non-displacement convexity regime
Universite Paris Dauphine D.F.R Mathematiques de la Decision
FINITE MASS SELF-SIMILAR BLOWING-UP SOLUTIONS OF A CHEMOTAXIS SYSTEM WITH NON-LINEAR DIFFUSION
Two-dimensional Keller-Segel model: Optimal critical mass and qualitative properties of the solutions
Critical mass for a Patlak-Keller-Segel model with degenerate diffusion in higher dimensions
ON THE PARABOLIC-ELLIPTIC PATLAK-KELLER-SEGEL SYSTEM IN DIMENSION 2 AND HIGHER