Recent Advances in PDE and Their Applications
Boundary Value Problems welcomes submissions to the new Special Collection on "Recent Advances in PDE and their Applications".
Partial differential equations (PDE) govern many natural phenomena, and play an important role in the progress of engineering and technology. Essentially all fundamental partial differential equations are very difficult to solve explicitly. The studies of well-posed and ill-posed classical and nonclassical boundary value problems for partial differential equations are driven not only by a theoretical interest, but also by the fact that several phenomena in engineering and various fields of applied mathematics can be modeled and investigated in this way.
The present special issue is devoted to the publication of high-quality research papers presented in ICAAM-2016 in the fields of the construction and investigation of solutions of well-posed and ill-posed boundary value problems for partial differential equations and their related applications.
The special issue will provide a forum for researchers and scientists to communicate their recent developments and to present recent results in theory and applications of partial differential equations.
Potential topics include, but are not limited to:
- Problems involving positive operators with classical and non-classical boundary conditions
- Equations of gas and hydrodynamics
- New methods in theory and applications of partial differential equations
- Stochastic partial differential equation models and applications
- Computational methods in partial differential equations
- Fractional differential equations and applications
- Identification problems
- Quantitative theory of differential equations
- Control problems
Before submitting your manuscript, please ensure you have carefully read the Instructions for Authors for Boundary Value Problems. The complete manuscript should be submitted through the Boundary Value Problems submission system. To ensure that you submit to the correct thematic series please select the appropriate section in the drop-down menu upon submission. In addition, indicate within your cover letter that you wish your manuscript to be considered as part of the thematic series on "Recent Advances in PDE and their Applications". All submissions will undergo rigorous peer review and accepted articles will be published within the journal as a collection.
Submissions to this thematic series are entitled to a 25% discount on the article processing charges. To receive this discount, authors should mention the thematic series within the "waiver request" box on the 'Payment' screen during submission of their manuscript.
Deadline for submissions
10th December, 2016
Lead guest editor
Ravi P. Agarwal, Department of Mathematics, Texas A&M University - Kingsville, USA 78363
Allaberen Ashyralyev, Fatih University, Turkey
Tynysbek Sh. Kalmenov, Institute of Mathematics and Mathematical Modeling, Almaty Kazakhstan
Submissions will also benefit from the usual advantages of open access publication:
Rapid publication: Online submission, electronic peer review and production make the process of publishing your article simple and efficient
High visibility and international readership in your field: Open access publication ensures high visibility and maximum exposure for your work - anyone with online access can read your article
No space constraints: Publishing online means unlimited space for figures, extensive data and video footage
Authors retain copyright, licensing the article under a Creative Commons license: articles can be freely redistributed and reused as long as the article is correctly attributed
For editorial enquiries please contact email@example.com
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