Contact
For internal use only
Christian Hagendorf
Position
Academic staff
Address
Université catholique de Louvain
2, Chemin du Cyclotron - Box L7.01.02
B-1348 Louvain-la-Neuve
Belgium
2, Chemin du Cyclotron - Box L7.01.02
B-1348 Louvain-la-Neuve
Belgium
Phone
+32 10 47 3353
Office
Personal homepage
UCL member card
People responsibilities
Postdocs
PhD students
Former members
Alexandre Lazarescu
(member since September 2019)
I am a post-doctoral researcher in the field of non-equilibrium statistical physics, specialised in large deviation theory and interacting particle models. I completed my PhD in 2013 at the Institut de Physique Théorique (CEA Saclay), where I worked on the large deviations of the Asymmetric Simple Exclusion Process (ASEP). I then worked as a postdoc at the Instituut voor Theoretische Fysica (KU Leuven) and the University of Luxembourg, and at the Centre de Physique Théorique in Ecole Polytechnique, before coming to the GPP group at IRMP. My topics of interests include large deviations and hydrodynamic limits of interacting particle systems far from equilibrium, exactly solvable models and their combinatorial structure, quantum integrability methods (as applied to exactly solvable driven interacting particle systems, such as the ASEP), and more general properties of rare events in non-equilibrium statistical models.
I am a post-doctoral researcher in the field of non-equilibrium statistical physics, specialised in large deviation theory and interacting particle models. I completed my PhD in 2013 at the Institut de Physique Théorique (CEA Saclay), where I worked on the large deviations of the Asymmetric Simple Exclusion Process (ASEP). I then worked as a postdoc at the Instituut voor Theoretische Fysica (KU Leuven) and the University of Luxembourg, and at the Centre de Physique Théorique in Ecole Polytechnique, before coming to the GPP group at IRMP. My topics of interests include large deviations and hydrodynamic limits of interacting particle systems far from equilibrium, exactly solvable models and their combinatorial structure, quantum integrability methods (as applied to exactly solvable driven interacting particle systems, such as the ASEP), and more general properties of rare events in non-equilibrium statistical models.
PhD students
Nathan Vanbeneden
Exact results in physical systems with finite or infinite number of particles.
Exact results in physical systems with finite or infinite number of particles.
Former members
Publications in IRMP
All my publications on Inspire