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The Journal of Mathematical Psychology includes articles, monographs and reviews, notes and commentaries, and book reviews in all areas of mathematical psychology. Empirical and theoretical contributions are equally welcome.Areas of special interest include, but are not limited to, fundamental measurement and psychological process models, such as those based upon neural network or information processing concepts. A partial listing of substantive areas covered include sensation and perception, psychophysics, learning and memory, problem solving, judgment and decision-making, and motivation.The Journal of Mathematical Psychology is affiliated with the Society for Mathematical Psychology.Research Areas include:• Models for sensation and perception, learning, memory and thinking• Fundamental measurement and scaling• Decision making• Neural modeling and networks• Psychophysics and signal detection• Neuropsychological theories• Psycholinguistics• Motivational dynamics• Animal behavior• Psychometric theoryBenefits to authorsWe also provide many author benefits, such as free PDFs, a liberal copyright policy, special discounts on Elsevier publications and much more. Please click here for more information on our author services.Please see our Guide for Authors for information on article submission. If you require any further information or help, please visit our support pages: http://support.elsevier.com

Journal of Mathematical Sciences integrates authoritative reports on current mathematical advances from outstanding Russian-language publications. Articles cover a wide range of topics, including mathematical analyses, probability, statistics, cybernetics, algebra, geometry, mathematical physics, wave propagation, stochastic processes, boundary value problems, linear operators, and number and function theory. The journal is a valuable resource for pure and applied mathematicians, statisticians, systems theorists and analysts, and information scientists. To submit articles to the Russian publications please see the Instructions for Authors (right hand side).

Journal of Mathematics is a peer-reviewed, open access journal that publishes original research articles as well as review articles in all areas of mathematics.

The Journal of Mathematics Teacher Education (JMTE) is devoted to research into the education of mathematics teachers and development of teaching that promotes students' successful learning of mathematics. JMTE focuses on all stages of professional development of mathematics teachers and teacher-educators and serves as a forum for considering institutional, societal and cultural influences that impact on teachers' learning, and ultimately that of their students. Critical analyses of particular programmes, development initiatives, technology, assessment, teaching diverse populations and policy matters, as these topics relate to the main focuses of the journal, are welcome. All papers are rigorously refereed.Papers may be submitted to one of three sections of JMTE as follows: Research papers: these papers should reflect the main focuses of the journal identified above and should be of more than local or national interest.Mathematics Teacher Education Around the World: these papers focus on programmes and issues of national significance that could be of wider interest or influence.Reader Commentary: these are short contributions: for example, offering a response to a paper published in JMTE or developing a theoretical idea. Authors should state clearly the section to which they are submitting a paper. As general guidance, papers should not normally exceed the following word lengths: (1) 10,000 words: (2) 5,000 words: (3) 3,000 words. Maximum word lengths exclude references, figures, appendices, etc.Critiques of reports or books that relate to the main focuses of JMTE appear as appropriate.

Don't miss the 3rd International Conference on Mathematics and Computation in Music, June 15-17th, IRCAM Journal of Mathematics and Music aims to advance the use of mathematical modelling and computation in music theory. The Journal focuses on mathematical approaches to musical structures and processes, including mathematical investigations into music-theoretic or compositional issues as well as mathematically motivated analyses of musical works or performances. In consideration of the deep unsolved ontological and epistemological questions concerning knowledge about music, the Journal is open to a broad array of methodologies and topics, particularly those outside of established research fields such as acoustics, sound engineering, auditory perception, linguistics etc. For more information on this Journal please contact katie.chandler@tandf.co.uk. To join the SMCM, please visit http://www.smcm-net.info/. All published research articles in this journal have undergone rigorous peer review, based on initial editor screening and anonymous refereeing by independent expert referees. Disclaimer Taylor & Francis makes every effort to ensure the accuracy of all the information (the 'Content') contained in its publications. However, Taylor & Francis and its agents and licensors make no representations or warranties whatsoever as to the accuracy, completeness or suitability for any purpose of the Content and disclaim all such representations and warranties whether express or implied to the maximum extent permitted by law. Any views expressed in this publication are the views of the authors and are not the views of Taylor & Francis.

Journal of Mathematics and the Arts is a peer reviewed journal that focuses on connections between mathematics and the arts. It publishes articles of interest for readers who are engaged in using mathematics in the creation of works of art, who seek to understand art arising from mathematical or scientific endeavors, or who strive to explore the mathematical implications of artistic works. The term 8221;art8221; is intended to include, but not be limited to, two and three dimensional visual art, architecture, drama (stage, screen, or television), prose, poetry, and music. The Journal welcomes mathematics and arts contributions where technology or electronic media serve as a primary means of expression or are integral in the analysis or synthesis of artistic works. The following list, while not exhaustive, indicates a range of topics that fall within the scope of the Journal:8226; Artists' descriptions providing mathematical context, analysis, or insight about their work;8226; The exposition of mathematics intended for interdisciplinary mathematics and arts educators and classroom use;8226; Mathematical techniques and methodologies of interest to practice-based artists;8226; Critical analysis or insight concerning mathematics and art in historical and cultural settings.The Journal also features exhibition reviews, book reviews, and correspondence relevant to mathematics and the arts.Listen to an interview with the Journal's Editor Gary Greenfield. All published research articles in this journal have undergone rigorous peer review, based on initial editor screening and anonymous refereeing by independent expert referees.DisclaimerTaylor & Francis makes every effort to ensure the accuracy of all the information (the 8220;Content8221;) contained in its publications. However, Taylor & Francis and its agents and licensors make no representations or warranties whatsoever as to the accuracy, completeness or suitability for any purpose of the Content and disclaim all such representations and warranties whether express or implied to the maximum extent permitted by law. Any views expressed in this publication are the views of the authors and are not the views of Taylor & Francis.

Journal of Mathematics in Industry is a peer-reviewed open access journal published under the brand SpringerOpen. It collects worldwide research on mathematical theory and methods applied to problems of modern industry. It brings together research on developments in mathematics for industrial applications, including both methods and the computational challenges they entail. Here, 'industry' is understood as any activity of economic and/or social value. As such, 'mathematics in industry' concerns the field as it actually improves industrial processes and helps to master the major challenges presented by cost and ecological issues. By publishing high-quality, innovative articles, it serves as an essential resource for academic researchers and practitioners alike. At the same time, it provides a common platform for scholars interested in precisely those types of mathematics needed in concrete industrial applications, and articles focusing on the interaction of academia and industry are preferred. In terms of theory, the journal seeks articles with demonstrable mathematical developments motivated by problems of modern industry. With regard to computational aspects, it publishes works introducing new methods and algorithms that represent significant improvements on the existing state of the art of modern numerical and simulations methods. The journal welcomes proposals for special issues on carefully selected topics, reflecting the trends of research and development in the broad area of mathematics in industry. Insightful survey articles may also be submitted for publication by invitation.The journal is initiated and run by the European Consortium for Mathematics in Industry (ECMI) in collaboration with Springer, and it is set up as a global journal with a world-wide editorial board, consisting of scientists in industry, academia and contract research organisations. The managing editor is Vincenzo Capasso, University of Milano.

Journal of the body is CEPS available to corporate clients and publishing unit of service. If the A 's publishing units have a, b, c three journals, the publishing unit of organization in the A link IEEE , visit the "organization journal" to see a, b, c three journals, and download the full text of this three journals are no point deduction.

The Journal of Modern Dynamics (JMD) is dedicated to publishing research articles in active and promising areas of the theory of dynamical systems with particular emphasis on the mutual interaction between dynamics and other major areas of mathematical research, including:Number theorySymplectic geometryDifferential geometryRigidityQuantum chaosTeichmüller theoryGeometric group theoryHarmonic analysis on manifolds.

A central medium for the publication of important research in the general area of multivariate analysis, the Journal of Multivariate Analysis presents articles on fundamental theoretical aspects of the field as well as on other aspects concerned with significant applications of new theoretical methods. Although articles addressing univariate analysis are considered for publication, particular attention is given to papers that discuss problems concerned with more than one variable.In addition to helping to stimulate research in multivariate analysis, the journal aims to bring about interactions among mathematical statisticians, probabilists, and scientists in other disciplines broadly interested in the area.Research Areas Include:• Asymptotic theory• Bayes models• Cluster analysis• Decision theory• Discriminant analysis• Distributions and tests• Estimation• Factor analysis• Limit laws• Measures of association• Multidimensional scaling and general multivariate methods• Multivariate ANOVA• Sequential analysis• Stochastic analysis and inference• Testing of hypothesis• Time series

The Journal of Nanoparticle Research is a monthly peer-reviewed journal that explores the specific concepts, properties, phenomena and processes of structures at the nanoscale size range. Coverage includes synthesis, assembly, transport, reactivity, and stability, and emphasizes realization and application of systems, structures and devices with novel functions obtained via precursor nanoparticles. The Journal fosters the interdisciplinary dissemination of knowledge by encouraging synergetic approaches originating from a wide range of disciplines, such as Physics, Chemistry, Biology and Health Care. Perspectives now available for free onlinePerspective articles have a wide breadth of appeal because they evaluate research, industrial and societal trends centered around nanotechnology. See the bigger picture!

Subjects considered suitable for the journal include the following (not necessarily in order of importance):

• Theoretical, computational and experimental studies of naturally or technologically relevant flow problems where the non-Newtonian nature of the fluid is important in determining the character of the flow. We seek in particular studies that lend mechanistic insight into flow behavior in complex fluids or highlight flow phenomena unique to complex fluids. Examples include
  • Instabilities, unsteady and turbulent or chaotic flow characteristics in non-Newtonian fluids,
  • Multiphase flows involving complex fluids,
  • Problems involving transport phenomena such as heat and mass transfer and mixing, to the extent that the non-Newtonian flow behavior is central to the transport phenomena,
  • Novel flow situations that suggest the need for further theoretical study,
  • Practical situations of flow that are in need of systematic theoretical and experimental research. Such issues and developments commonly arise, for example, in the polymer processing, petroleum, pharmaceutical, biomedical and consumer product industries.

  This list is meant to be representative, not exhaustive.

• Mathematical analysis of equations relevant to non-Newtonian flows
• Numerical methods suited to problems in flowing complex fluids
• Development of rheological constitutive equations for non-Newtonian fluids from both continuum and microstructural starting points.
• Experimental assessment of predictions from rheological constitutive equations.
• Devices and methodologies for rheological measurements at both macro- and microscopic levels, including microrheology.

Overly abstract, formalistic or artificial developments will not be welcomed.