Theory, Methods and Applications of Fractional Differential Equations
Submission Deadline: May 30, 2016
Lead Guest Editor
Department of Applied Mathematics, Faculty of Mathematical Sciences, University of Guilan,
Rasht, Guilan, Iran
Amirhossein Refahi Sheikhani
Department of Applied Mathematics, Faculty of Mathematical Sciences, Islamic Azad University of Lahijan,
Department of Applied, Mathematics, Faculty of Mathematical Sciences, Shahrekord University,
Guidelines for Submission
Manuscripts can be submitted until the expiry of the deadline. Submissions must be previously unpublished and may not be under consideration elsewhere.
Papers should be formatted according to the guidelines for authors (see: http://www.sciencepublishinggroup.com/journal/guideforauthors?journalid=147). By submitting your manuscripts to the special issue, you are acknowledging that you accept the rules established for publication of manuscripts, including agreement to pay the Article Processing Charges for the manuscripts. Manuscripts should be submitted electronically through the online manuscript submission system at http://www.sciencepublishinggroup.com/login. All papers will be peer-reviewed. Accepted papers will be published continuously in the journal and will be listed together on the special issue website.
The special issue currently is open for paper submission. Potential authors are humbly requested to submit an electronic copy of their complete manuscript by clicking here.
In recent years, fractional differential equations are increasingly utilized to model many problems in biology, chemistry, engineering, physics, economic and other areas of applications. The fractional differential equations have become a useful tool for describing nonlinear phenomena of science and engineering models. The objective of this special issue is to report and review the latest progresses in the Theory, Methods and Applications of fractional differential equations.
Aims and Scope:
1. Analytical and numerical methods of fractional differential equations 2. Mathematical modeling of fractional differential equations 3. Applications of fractional calculus in physics, mechanics, chemistry, economics and biology, engineering, etc. 4. Applications of fractional calculus in Finance and economy dynamics 5. Fractional Modeling and Control applications