[ Editors-in-Chief ]
Name / Email	Address / Area of experties
Editor-in-Chief: Pierre Degond pierre.degond@math.univ-toulouse.fr	Institute of Mathematics , University Paul Sabatier, 118, route de Narbonne,31062 Toulouse cedex, France Kinetic Theory, Nonlinear PDE’s, Numerical Analysis, Modeling
Editor-in-Chief: Seiji Ukai mcukai@cityu.edu.hk	City University of Hong Kong, Dept. Math., Kowloon, Hong Kong Peoples R China Kinetic theory
Editor-in-Chief: Tong Yang matyang@cityu.edu.hk	City University of Hong Kong, Dept. Math., Kowloon, Hong Kong Peoples R China Mathematical theories of conservation laws and kinetic equations
[ Editorial Board ]
Name / Email	Address / Area of experties
Radjesvarane Alexandre radja.alexandre@univ-evry.fr	IRENAv, Research Institute French Naval Academy Ecole Navale 29240 BREST ARMEES FRANCE Kinetic equations, Harmonic analysis, Homogenization
Kazuo Aoki aoki@aero.mbox.media.kyoto-u.ac.jp	Department of Mechanical Engineering and Science Graduate School of Engineering Kyoto University Yoshida-honmachi, Sakyo-ku, Kyoto 606-8501, Japan Molecular gas dynamics
Guillaume Bal gb2030@columbia.edu	Department of Applied Physics and Applied Mathematics (APAM) Columbia University, New York, NY 10027, USA Kinetic models in random media; partial differential equations with random coefficients; inverse transport theory
Claude Bardos claude.bardos@gmail.com	University Paris 6, Lab JL Lions, F-75252, Paris, France Kinetic theory, Macroscopic limits in classical and quantum dynamic. Euler and Navier Stokes equations
Alexander V. Bobylev alexander.bobylev@kau.se	Karlstads Universitet, Universitetsgatan 2, 651 88 Karlstad, Sweden Kinetic theory
Yann Brenier brenier@math.unice.fr	CNRS FR 2800, Universite de Nice, France Vlasov type equations Optimal transportation methods
Alberto Bressan bressan@math.psu.edu	Department of Mathematics, Penn State University, US Partial Differential Equations and Control theory
Eric Carlen carlen@math.rutgers.edu	Department of Mathematics, Hill center Rutgers University 110 Frelinghuysen Rd. Piscataway NJ 08854 Probabilistic models, functional inequalities and anlytic methods in kinetic theory
Jose Antonio Carrillo carrillo@mat.uab.es	ICREA and Departament de Matemàtiques Departament de Matemàtiques, Edifici C, Universitat Autònoma de Barcelona, 08193-Bellaterra, Barcelona, Spain Kinetic and related nonlinear PDEs: asymptotics, modelling and numerics
Hua Chen chenhua@whu.edu.cn	School of Mathematics and Statistics Wuhan University, Wuhan 430072, P. R. China Partial Differential Equations
Laurent Desvillettes desville@cmla.ens-cachan.fr	Ecole Normale Superieure de Cachan, CMLA, 61, Av. du Pdt. Wilson, 94235 Cachan Cedex, FRANCE Applied PDE and numerical analysis, kinetic theory
Miguel Escobedo miguel.escobedo@ehu.es	Departamento de Matemáticas Universidad del País Vasco (UPV/EHU) Apartado 644, Bilbao 48080 Nonlinear pde`s- Asymptotic behaviour-Singularities
Raffaele Esposito esposito@univaq.it esposito@roma2.infn.it	Dipartimento di Matematica pura ed Applicata Universita' di L'Aquila V. Vetoio- Coppito 67100 L 'Aquila Italy Kinetic theory, Hydrodynamical Limits, Particle Systems
Irene M. Gamba gamba@math.utexas.edu	Department of Mathematics and Institute for Computational Engineering and Sciences, The University of Texas at Austin, 78712 Austin TX Nonlinear Kinetic theory and PDE's, Analysis and numerical methods
Robert T. Glassey glassey@indiana.edu	Dept. of Mathematics Indiana University Bloomington IN 47405 Kinetic Theory, Nonlinear Partial Differential Equations, Numerical Analysis
Francois Golse golse@math.polytechnique.fr	Ecole polytechnique, Centre de mathematiques Laurent Schwartz 91128 Palaiseau cedex France Mathematical analysis of kinetic models Macroscopic limits for particle systems
Yan Guo guoy@dam.brown.edu	Division of Applied Mathematics Brown University Providence, RI 02912 USA Kinetic theory
Shi Jin jin@math.wisc.edu	Department of Mathematics University of Wisconsin-Madison Madison, WI 53706 USA Numerical methods for hyperbolic systems and kinetic equations, computational high frequency waves
Shuichi Kawashima kawashim@math.kyushu-u.ac.jp	Faculty of Mathematics, Kyushu University, Fukuoka 812-8581, Japan Partial differential equations
Axel Klar klar@itwm.fraunhofer.de	TU Kaiserslautern, Erwin Schrödingerstr., 67663 Kaiserslautern Numerical methods for transport equations, network models
C. David Levermore lvrmr@math.umd.edu	Institute for Physical Science and Technology, University of Maryland, College Park, MD 20742-2431 Boltzmann equations, transport equations, transition regime models
Pierre-Louis Lions lions@ceremade.dauphine.fr	I.F.D. Institut Finance Dauphine, Universite Paris Dauphine, Place du Marechal de Lattre De Tassigny 75775 Paris cedex 16, France Applied Mathematics, nonlinear partial differential equations
Chun Liu liu@math.psu.edu	Department of Mathematics Penn State University University Park, PA 16802 Complex fluids, multiscale modeling
Peter Markowich peter.markowich@univie.ac.at P.A.Markowich@damtp.cam.ac.uk	Professor of Applied Mathematics, University of Cambridge, DAMTP, Centre for Mathematical Sciences, Wilberforce Road, Cambridge CB3 0WA, United Kingdom and Professor of Mathematics, University of Vienna, Austria Kinetic equations in semiconductors, nanotechnology and quantum physics
Barbara Niethammer niethammer@maths.ox.ac.uk	Barbara Niethammer, Mathematical Institute, University of Oxford, Ox1 3LB, United Kingdom Kinetic models in materials science, coagulation-fragmentaion equations
Shinya Nishibata shinya@is.titech.ac.jp	Tokyo Institute of Technology Department of Mathematical and Computing Sciences Graduate School of Information Science and Engineering 2-12-1-W8-32, O-okayama, Meguro-ku Tokyo 152-8552, Japan Hyperbolic-elliptic systems of PDE, Fluid equations, Discrete Boltzmann equations
Anne Nouri nouri@cmi.univ-mrs.fr	Laboratoire d'Analyse, Topologie et robabilités,Université d'Aix-Marseille I, 39 rue F. Joliot Curie, 13453 Marseille Cedex 13, France Kinetic theory
Lorenzo Pareschi lorenzo.pareschi@unife.it	Department of Mathematics University of Ferrara Via Machiavelli 35 44100 Ferrara, Italy kinetic equations and nonlinear PDEs, numerical analysis
Benoit Perthame Perthame@ann.jussieu.fr	Laboratoire J. L. Lions Universit\'e P. et M. urie BC187, 4, place Jussieu, F-75252 Paris cedex 5 Theory of kinetic equations, applications in biology
Mario Pulvirenti pulvirenti@mat.uniroma1.it	Department of Mathematics, University of Rome-La Sapienza, Italy Scaling limits in classical and quantum kinetic theory, In compressible flows
Laure Saint-Raymond Laure.Saint-Raymond@ens.fr	Département de Mathématiques et Applications Ecole Normale Supérieure 45 rue d'Ulm 75230 Paris Cedex 05 FRANCE Kinetic equations hydrodynamic limits fluid mechanics singular perturbations
Giuseppe Toscani toscani@dimat.unipv.it	Dipartimento di Matematica "F. Casorati", Università di Pavia, Via Ferrata 1, 27100 PAVIA (ITALY). Kinetic models in socio-economic and environmental sciences, nonlinear PDE's
Eric Vanden-Eijnden eve2@cims.nyu.edu	Courant Institute of Mathamtical Sciences, New York University, NY 10027, US Applied mathematics, statistical mechanics, scientific computing
Bernt Wennberg wennberg@math.chalmers.se	Mathematical Sciences, Chalmers University of Technology and Göteborg University address: Chalmers University of Technology, SE41296 Göteborg, Sweden Nonlinear kinetic equations, mathematical modelling
Zhouping Xin zpxin@ims.cuhk.edu.hk	The Institute of Mathematical Sciences, The Chinese University of Hong Kong, Room 701, Acedemic Building #1, Shatin, New Territories, Hong Kong Nonlinear PDEs, Applied Mathematics, Numerical Analysis
Shih-Hsien Yu mashyu@cityu.edu.hk matysh@nus.edu.sg	Department of Mathematics, National University of Singapore, 2, Science Drive 2, Singapore 117543 Boltzmann equation, Viscous Conservation Laws, Finite Difference method
Huijiang Zhao hhjjzhao@whu.edu.cn	School of Mathematics and Statistics Wuhan University, Wuhan 430072, P. R. China Conservation laws, Boltzmann equation
Changjiang Zhu cjzhu@mail.ccnu.edu.cn	School of Mathematics and Statistics Central China Normal University, Wuhan 430079, P. R. China Hyperbolic systems of conservation laws