期刊名称:KINETIC AND RELATED MODELS
 期刊简介(About the journal)
投稿须知(Instructions to Authors)
编辑部信息(Editorial Board)
About the journal
KRM is now SCI-E, covered in Science Citation Index-Expanded (SCIE) including the Web of Science ISI Alerting Service Current Contents/Physical, Chemical & Earth Sciences (CC/PC&ES).
KRM publishes high quality papers of original research in the areas of kinetic equations spanned from mathematical theory to numerical analysis, simulations and modelling. It includes studies on models arising from physics, engineering, finance, biology, human and social sciences, together with their related fields such as fluid models, interacting particle systems and quantum systems. A more detailed indication of its scope is given by the subject interests of the members of the Board of Editors. Invited expository articles are also published from time to time.
KRM is launched in 2008 as quarterly publication in March, June, September and December. It is edited by a group of energetic leaders to guarantee the journal's highest standard and closest link to the scientific communities. A unique feature of this journal is its streamlined review process and rapid publication. The direct and personal communication between authors and the editors makes it possible that authors are kept informed at all time of the process.
Instructions to Authors
Kinetic and Related Models publishes original research papers of the highest quality in the area of kinetic equations spanned from mathematical theory to numerical analysis including simulations and modelling. It includes the studies on models arising from the areas of physics, engineering, finance, biology or human and social sciences, together with their related fields such as fluid models, quantum systems and interacting particle systems. A more detailed indication of its scope is given by the subject interests of the members of the Board of Editors. Invited expository articles are also published from time to time.
Review Procedures All papers will undergo a thorough peer review unless the subject matter of the paper does not fit the Journal; in this case, the author will be informed promptly. Every effort will be made to secure a decision in two months and to publish accepted papers within six months.
Manuscripts should be in English and must meet common standards of usage and grammar. To submit a paper, send a file in PDF format or PS format, or three hard copies, to a member on the Board of Editors whose interest is closest to topics of the paper. An acknowledgement from the editor is an indication that the paper has been properly submitted.
Submission of a manuscript is a representation that the work has not been previously published, has not been copyrighted, is not being submitted for publication elsewhere, and that its submission has been approved by all of the authors and by the institution where the work was carried out; furthermore, that any person cited as a source of personal communications has approved such citation, and that the authors have agreed that the copyright in the article shall be assigned exclusively to the Publisher upon acceptance of the article. The manuscript will not be returned.
Manuscripts should be typed on one side of 8.5 X 11 in (21.5 X 28 cm) white paper, double-spaced, with wide margins. Number each page. Page 1 should contain the title, authors names and complete affiliations. Place any footnotes to the title at the bottom of Page 1. Each paper requires an abstract not exceeding 200 words summarizing the techniques, methods and main conclusions. AMS subject classifications must accompany all articles, placed at the bottom of Page 1 before any other footnotes. Electronic mail addresses, if available, can be placed at the very end of the paper. Each paper requires a separate page containing a proposed running head (abbreviated form of the title) of no more than 40 characters, and the name and mailing address of the author to whom proofs should be sent.
Equations should be centered with the number placed in parentheses at the right margin.
Figures should be in eps format or otherwise drafted in high resolution and high contrast on separate pieces of white paper, in a form suitable for photographic reproduction and reduction.
References should be listed alphabetically, typed and punctuated according to the following examples:
[1] S.N. Chow and J.K. Hale, "Methods of Bifurcation Theory," Springer-Verlag, New York, 1982.
[2] J. Serrin, Gradient estimates for solutions of nonlinear elliptic and parabolic equations, in "Contributions to Nonlinear Functional Analysis" (ed. E.H. Zarantonello), Academic Press (1971).
[3] S. Smale, Stable manifolds for differential equations and diffeomorphisms, Ann. Scuola Norm. Sup. Pisa Cl. Sci., 18 (1963), 97--116.
For journal abbreviations used in bibliographies, consult the list of serials in the latest Mathematical Reviews annual index.
Manuscripts typeset using AmSTeX (amsppt) or AmS-LaTeX (amsart) can move much more quickly through the production process, hence these two TeX forms are strongly recommended to authors for preparing their manuscripts.
Contributions to this journal are published free of charge. Please also note KRM does not offer reprints.
Editorial Board
[ 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
suk03919@ec.catv-yokohama.ne.jp
17-26 Iwasaki, Hodogaya, Yokohama, 240-0015
Japan
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
radjesvarane.alexandre@ecole-navale.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
Feimin Huang
fhuang@amt.ac.cn
Academy of Mathematics and System Sciences, Academia Sinica, Beijing 100190, China
Hyperbolic conservation laws and viscous conservation laws
Reinhard Illner
rillner@math.uvic.ca
Department of Mathematics and Statistics,University of Victoria,PO Box 3045 STN CSC, Victoria, B.C. Canada
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
Ansgar Jüngel
juengel@anum.tuwien.ac.at
Institute for Analysis and Scientific Computing, Vienna University of Technology Wiedner Hauptstr. 8-10, 1040 Wien, Austria
Kinetic models and diffusive limits, semiconductor and finance applications, numerics
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
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