期刊名称:MATHEMATICAL CONTROL AND RELATED FIELDS
 期刊简介(About the journal)
投稿须知(Instructions to Authors)
编辑部信息(Editorial Board)
About the journal
MCRF aims to publish original research as well as expository papers on mathematical control theory and related fields. The goal is to provide a complete and reliable source of mathematical methods and results in this field. The journal will also accept papers from some related fields such as differential equations, functional analysis, probability theory and stochastic analysis, inverse problems, optimization, numerical computation, mathematical finance, information theory, game theory, system theory, etc., provided that they have some intrinsic connections with control theory.
MCRF is a quarterly publication in March, June, September and December. The journal will be online only. It is edited by a group of international leading experts in mathematical control theory and related fields. A key feature of MCRF is the journal's rapid publication, with a special emphasis on the highest scientific standard. The journal is essential reading for scientists and researchers who wish to keep abreast of the latest developments in the field. MCRF is a publication of the American Institute of Mathematical Sciences. All rights reserved.
Instructions to Authors
MCRF is a rapid publication of research work on mathematical control theory in a considerably broad sense (see Aims and Scope). All contributions must be original research papers or invited surveys of expository nature of the highest quality.
Review Procedures All papers will undergo a thorough peer review unless the subject matter of the paper does not fit the Journal, in which case, it will be returned promptly to the author. Every effort will be made to secure a quick decision and a rapid publication if accepted.
Submission Procedure All papers must be submitted electronically in PDF format or PS format (file size should be less than 2M, or send an email to alert first) to one of the Editors in Chief listed below.
Editors in Chief:
Jean-Michel Coron, email address: coron@ann.jussieu.fr;
Xu Zhang, email address: xuzhang@amss.ac.cn.
You may suggest two associate editors who are familiar with the topic to handle your paper. The list of all associate editors and their homepages are posted on the Editorial Board.
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, it indicates 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.
Manuscripts should be in English and must meet common standards of usage and grammar and should be typed on one side of 8.5 X 11in (21.5 X 28cm) white paper, double-spaced, with 5 in. of text width. 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 and must be placed at the bottom of Page 1 before any other footnotes. Electronic mail addresses can be placed at the very end of the paper.
After a paper is accepted, author(s) may prepare their files using AIMS journals templates and provide high resolution figures (if any) to ensure a speedy quality production.
The authors of all accepted papers should retrieve a Consent to Publish and Copyright Agreement Form, fill it out, sign it, and email the pdf of a scanned copy to editorial@aimsciences.org, fax the signed form to (417)-889-0336, or send the hard copy to American Institute of Mathematical Sciences, P.O. Box 2604, Springfield, MO 65801-2604, USA.
Equations should be centered with the number placed in parentheses at the right margin.
Figures must be 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.
Editorial Board
Editors in Chief
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Jean-Michel Coron
coron@ann.jussieu.fr |
Laboratoire Jacques-Louis Lions, Université Pierre et Marie Curie 4, place Jussieu, 75005 Paris, France |
|
Xu Zhang
zhang_xu@scu.edu.cn |
Yangtze Center of Mathematics, Sichuan University, Chengdu 610064, China |
Editorial Board
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Guillaume Bal
gb2030@columbia.edu |
Department of Applied Physics and Applied Mathematics, Columbia University, USA
Inverse problems, imaging, hybrid inverse problems, imaging in random media |
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Karine Beauchard
Karine.Beauchard@cmla.ens-cachan.fr |
CMLA, Ecole Normale Supérieure de Cachan, France
PDE control, Schrödinger equation |
|
Vivek S. Borkar
borkar@tifr.res.in |
Tata Institute of Fundamental Research, India
Controlled diffusions, controlled Markov chains, stochastic approximation and related algorithms |
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Ugo Boscain
boscain@cmap.polytechnique.fr |
CMAP, Ecole Polytechnique, France
Geometric control, sub-Riemannian geometry, quantum control |
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Piermarco Cannarsa
cannarsa@mat.uniroma2.it |
Dipartimento di Matematica, Università di Roma“Tor Vergata”, Rome, Italy
Control of partial differential equations of evolution, viscosity solutions of Hamilton-Jacobi equations, optimal control, and nonsmooth analysis |
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Eduardo Casas
eduardo.casas@unican.es |
Depto. Matematica Aplicada y Ciencias de la Computacion, E.T.S. Ingenieros Industriales y de Telecomunicacion, Universidad de Cantabria, Spain
Optimal control of partial differential equations, first and second order optimality conditions, numerical analysis of optimal control problems |
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Thomas Duyckaerts
duyckaer@math.univ-paris13.fr |
Département de Mathématiques, Institut Galilée, Université Paris 13, France
Stability, blow-up, linear/nonlinear wave and Schrödinger equations |
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Sylvain Ervedoza
sylvain.ervedoza@math.univ-toulouse.fr |
Institut de Mathématiques de Toulouse,Equipe MIP, Université Paul Sabatier & CNRS, France
PDE Control and numerical methods for control |
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Olivier Glass
glass@ceremade.dauphine.fr |
CEREMADE, Universit´e Paris-Dauphine, France
PDE control, fluid mechanics, hyperbolic systems |
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Sergio Guerrero
guerrero@ann.jussieu.fr |
Laboratoire Jacques-Louis Lions, Université Pierre et Marie Curie, France
Carleman inequalities, control theory, Navier-Stokes equations, parabolic equations |
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Jérôme Le Rousseau
jlr@univ-orleans.fr |
Laboratoire Mathématiques et Applications, Physique Mathématique d'Orléans, Université d'Orléans, France
PDE control, microlocal analysis |
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Günter Leugering
leugering@am.uni-erlangen.de |
Lehrstuhl für Angewandte Mathematik II, Universität Erlangen -Nürnberg, Germany
Control theory of ordinary and partial differential equations, Optimization, Calculus of variations |
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Hartmut Logemann
hl@maths.bath.ac.uk |
Department of Mathematical Sciences, University of Bath, United Kingdom
Hysteresis, infinite-dimensional systems and control, sampled-data control, stability theory |
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Hongwei Lou
hwlou@fudan.edu.cn |
Fudan University, China
Relaxed control, optimal control, controls in systems biology |
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Qi Lü
luqi59@163.com |
School of Mathematical Sciences, University of Electronic Science and Technology of China, China
Stochastic control,PDE control |
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Frederic Mazenc
Frederic.MAZENC@lss.supelec.fr |
Laboratoire des Signaux et Systèmes, L2S - CNRS - Supélec, France
Stabilization, feedback design tools, finite dimensional control systems, delay systems, distributed parameter systems |
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Sorin Micu
sd_micu@yahoo.com |
Departamentul de Matematica,Facultatea de Stiinte Exacte, Universitatea din Craiova, Romania
Control theory, partial differential equations, numerical analysis |
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Axel Osses
axosses@dim.uchile.cl |
Dpto. Ing. Matemática & Centro de Modelamiento Matemático CMM, Universidad de Chile, Chile
Inverse problems, Carleman inequalities, controllability theory |
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Jean-Pierre Raymond
raymond@mip.ups-tlse.fr |
Equipe MIP, Institut de Mathématiques, Université Paul Sabatier, France
Control of partial differential equations, optimal control, robust control, stabilizabity, controllability, observability |
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Pierpaolo Soravia
soravia@math.unipd.it |
Dipartimento di Matematica Pura e Applicata, Universita di Padova, Italy
Optimal control and Hamilton-Jacobi-Bellman equation, viscosity solutions, differential games |
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Andrzej Swiech
swiech@math.gatech.edu |
School of Mathematics, Georgia Institute of Technology, USA
Stochastic and deterministic optimal control, nonlinear PDE, viscosity solutions, PDE control |
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Gianmario Tessitore
gianmario.tessitore@unimib.it |
Dipartimento di Matematica e Applicazioni, Scuola Normale Superiore di Pisa, Italy
Stochastic control, stochastic differential equations |
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Nizar Touzi
nizar.touzi@polytechnique.edu |
Centre de Mathematiques Appliquees, Ecole Polytechnique, France
Mathematical finance, stochastic control |
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Emmanuel Trélat
emmanuel.trelat@ljll.math.upmc.fr |
Laboratoire Jacques-Louis Lions, Université Pierre et Marie Curie, CNRS, UMR 7598,4 place Jussieu, BC 187, 75252 Paris cedex 05, France
Optimal control, geometric control, PDE control, numerical methods |
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Gengsheng Wang
cocdm1@mail.ccnu.edu.cn |
School of Mathematics and Statistics Wuhan University, China
Optimal control theory and numerical analyses on PDEs, Stabilization of PDEs |
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Masahiro Yamamoto
myama@ms.u-tokyo.ac.jp |
Department of Mathematical Sciences, The University of Tokyo, Japan
Inverse problems |
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Jiongmin Yong
jyong@mail.ucf.edu |
Department of Mathematics, University of Central Florida, USA
Control theory, differential games, stochastic differential and integral equations, mathematical finance |
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Bing-Yu Zhang
zhangb@ucmail.uc.edu |
Department of Mathematics, University of Cincinnati, USA
Analysis and control of dispersive wave equations |
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Jianfeng Zhang
jianfenz@usc.edu |
Department of Mathematics, University of Southern California, USA
Backward SDEs, Stochastic numerics, Stochastic Control, Mathematical Finance |
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Qing Zhang
qingz@math.uga.edu |
Department of Mathematics, University of Georgia, USA
Stochastic control and applications in finance |
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Enrique Zuazua
zuazua@bcamath.org |
Basque Center for Applied Mathematics, Basque Country, Spain
PDEs: control, stability, numerics and applications |
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