FDA Express    Vol. 13, No. 5, Dec. 15, 2014

Editors: http://em.hhu.edu.cn/fda/Editors.htm

Institute of Soft Matter Mechanics, Hohai University
For contribution: fdaexpress@163.com, pangguofei2008@126.com
For subscription: http://em.hhu.edu.cn/fda/subscription.htm

PDF download:http://em.hhu.edu.cn/fda/Issues/FDA_Express_Vol13_No5_2014.pdf

◆  Latest SCI Journal Papers on FDA

(Searched on 15th December 2014)

◆  Conferences

54th IEEE Conference on Decision and Control – CDC 2015

The 2015 Symposium on Fractional Derivatives and Their Applications (FDTA’15)

◆  Books

Selected Aspects of Fractional Brownian Motion

Topics in Fractional Differential Equations

Fractional differential calculus for nondifferentiable functions: Mechanics, Geometry, Stochastics, Information Theory

◆  Journals

Communications in Nonlinear Science and Numerical Simulation

◆  Paper Highlight

Hydraulic conductivity, velocity, and the order of the fractional dispersion derivative in a highly heterogeneous system

Quantitative analysis of single particle trajectories: mean maximal excursion method

◆  Websites of Interest

Fractional Calculus & Applied Analysis

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 Latest SCI Journal Papers on FDA

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(Searched on 15th December 2014)

ATTRACTORS AND THEIR PROPERTIES FOR A CLASS OF NONLOCAL EXTENSIBLE BEAMS

By: Jorge da Silva, Marcio Antonio; Narciso, Vando

DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS  Volume: 35   Issue: 3   Pages: 985-1008   Published: MAR 2015

A mechanical picture of fractional-order Darcy equation

By: Deseri, Luca; Zingales, Massimiliano

COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION  Volume: 20   Issue: 3   Pages: 940-949   Published: MAR 2015

Theoretical Models of Ion Pair Chromatography: A Close Up of Recent Literature Production

By: Cecchi, Teresa

JOURNAL OF LIQUID CHROMATOGRAPHY & RELATED TECHNOLOGIES  Volume: 38   Issue: 3   Special Issue: SI   Pages: 404-414   Published: FEB 7 2015

Numerical approximation of distributed order reaction-diffusion equations

By: Morgado, M. L.; Rebelo, M.

JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS  Volume: 275   Pages: 216-227   Published: FEB 2015

On the numerical solution of the eigenvalue problem in fractional quantum mechanics

By: Guerrero, Alejandro; Moreles, Miguel Angel

COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION  Volume: 20   Issue: 2   Pages: 604-613   Published: FEB 2015

A Fractal Conservation Law for Simultaneous Denoising and Enhancement of Seismic Data

By: Meng, Fanlei; Li, Yue; Wu, Ning; et al.

IEEE GEOSCIENCE AND REMOTE SENSING LETTERS  Volume: 12   Issue: 2   Pages: 374-378   Published: FEB 2015

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Conferences

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54th IEEE Conference on Decision and Control – CDC 2015

http://www.cdc2015.ctrl.titech.ac.jp/index.php

December 15-18, 2015 in Osaka, Japan

   Special session invitation
Fractional order models and signals

Call for Papers

The goal of this special session is to gather colleagues that work in the field of fractional calculus in order to present the latest results in fractional order models and signals domain. Papers describing original research work that reflects the recent theoretical advances and experimental results as well as open new issues for research are invited. This session will cover the following topics (but not limited to):
　

- Signal analysis and filtering with fractional tools (restoration, reconstruction, analysis of fractal noises);
- Fractional modeling especially of (but not limited to) thermal systems, electrical systems (motors, transformers, skin effect, …), dielectric materials, electrochemical systems (batteries, ultracapacitors, fuel cells, …), mechanical systems (vibration insulation, viscoelastic materials, …), biological systems (muscles, lungs, …);
- System identification (linear, non linear, MIMO methods, …);
- Models implementation (fractional controllers and filters implementation, …);
- Systems analysis (stability, observability, controllability, …);
- Observers;
- Control (Fractional PID, CRONE, H∞, …);
- Diagnosis based on fractional models.
　

Submission Deadline: Contributed Papers and special issues must be submitted before March 24, 2015 but the session proposal deadline is March 12, 2015

Submission Guidelines: Prepare your papers according to recommendations available at http://www.cdc2015.ctrl.titech.ac.jp/cfp.php

Contact if you intend to participate

Christophe Farges, Jocelyn Sabatier
IMS laboratory – Bordeaux University - UMR 5218 CNRS

Email: christophe.farges@ims-bordeaux.fr

          jocelyn.sabatier@ims-bordeaux.fr

Please indicate [Invited Session - CDC 2015] in the email subjectt

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The 2015 Symposium on Fractional Derivatives and Their Applications (FDTA’15)

as a part of the

The 2015 ASME/IEEE International Conference on Mechatronics and Embedded Systems and Applications (ASME/IEEE MESA2015)

August 2-5, 2015, Boston, MA, USA

http://iel.ucdavis.edu/mesa/conferences.php and http://www.asmeconferences.org/idetc2015/

Full CFP: http://mechatronics.ucmerced.edu/FDTA2015

Papers with the e-mail addresses of the authors must be submitted online abstract(s) at  http://www.asmeconferences.org/idetc2015/  by January 12, 2015. After the abstract submission, you MUST also submit a full length paper for peer review by Jan. 26, 2015.
　

Director, MESA LAB, http://mechatronics.ucmerced.edu/

University of California, Merced, CA 95343, USA

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Books

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Selected Aspects of Fractional Brownian Motion

Ivan Nourdin

Book Description

The goal of this book is to develop some aspects of fBm (as well as related topics), without seeking for completeness at all. To be comprehensive would have been an impossible task to fulfill anyway, given the huge amount of works that are nowadays dedicated to fBm1. Instead, my guiding thread was to develop the topics I found the most aesthetic (with all the subjectivity it implies!) by trying to avoid technicalities as much as possible, in order to show the reader that solving questions involving fBm may lead to beautiful mathematics. In fact, it was often an excuse for the development of a more general theory, for which the fBm then becomes a concrete and significant example.

More information on this book can be found by the following link: http://link.springer.com/book/10.1007/978-88-470-2823-4

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Topics in Fractional Differential Equations

Saïd Abbas, Mouffak Benchohra, Gaston M. N'Guérékata

Book Description

The content of this book is new and complements the existing literature in fractional calculus. It is useful for researchers and graduate students for research, seminars, and advanced graduate courses, in pure and applied mathematics, engineering, biology, and all other applied sciences. 　

More information on this book can be found by the following link: http://link.springer.com/book/10.1007/978-1-4614-4036-9

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Fractional differential calculus for nondifferentiable functions: Mechanics, Geometry, Stochastics, Information Theory

Guy Jumarie

Book Description

Most books which deal with fractional derivative refer to the Riemann-Liouvile definition in terms of integral: one first defines integral and then one defines derivative. On the contrary, this book provides a systematic self-contained presentation of fractional calculus, via fractional difference, and expands a fractional differential calculus which is quite parallel to the Leibniz calculus (therefore the expression of fractional differential calculus) and which is also quite physically meaningful. Whilst the standard fractional calculus applies to differentiable functions only, the present calculus holds for both differentiable functions and nondifferentiable functions. Summary of content. Theory and application of this fractional differential calculus Proposals for some new approaches to analytical mechanics, differential geometry in fractal space-time, fractional white noise calculus, and information theory. Readership. Any scientist who is interested in fractals and in the applications of fractional calculus to natural science, either for the appications or for the foundations of physics.

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 Journals

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Communications in Nonlinear Science and Numerical Simulation

Volume 22, Issues 1–3 (selected)

Critical desertification transition in semi-arid ecosystems: The role of local facilitation and colonization rate

Raffaele Corrado, Anna Maria Cherubini, Cecilia Pennetta

Jacobian matrix algorithm for Lyapunov exponents of the discrete fractional maps

Guo-Cheng Wu, Dumitru Baleanu    

Non-standard extensions of gradient elasticity: Fractional non-locality, memory and fractality

Vasily E. Tarasov, Elias C. Aifantis

Pseudo Phase Plane and Fractional Calculus modeling of western global economic downturn

J.A. Tenreiro Machado, Maria Eugénia Mata

Nonlinear dynamic analysis and characteristics diagnosis of seasonally perturbed predator–prey systems

Huayong Zhang, Tousheng Huang, Liming Dai

Linear stability of a generalized multi-anticipative car following model with time delays

D. Ngoduy 

Fractional model for pharmacokinetics of high dose methotrexate in children with acute lymphoblastic leukaemia

Jovan K. Popović, Dragan T. Spasić, Jela Tošić, Jovanka L. Kolarović, Rachid Malti, Igor M. Mitić, Stevan Pilipović, Teodor M. Atanacković

A mathematical model of dengue transmission with memory

Tridip Sardar, Sourav Rana, Joydev Chattopadhyay

A new difference scheme for the time fractional diffusion equation

Anatoly A. Alikhanov

Stability and resonance conditions of the non-commensurate elementary fractional transfer functions of the second kind

A. Ben Hmed, M. Amairi, M. Aoun

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