FDA 2015 - International Symposium on Fractional Differentiation with Applications

The theory and applications of fractional differential equations (FDEs) are gaining more important applications in dynamics of most complex systems of the real world phenomena. Especially, the differentiable arising in science and engineering were modeled by the fractional differential equations (nonlocal FDEs). On the other hand, the non-differentiable problems were solved by using the local fractional differential equations (local FDEs). Thus, advanced computational methods are of important interest for (nonlocal and local) fractional differential equations.
This special issue is to highlight the latest advanced analytical and numerical techniques. The aim is to establish an international forum where to present newest coverage of the advanced computational methods for fractional differential equations (FDEs).
Potential topics include, but are not limited to:
Mathematical models for fractional order differential equations arising in mathematical physics
Approximate and analytical solutions for fractional order differential equations
Numerical and asymptotical solutions for fractional order differential equations
Fractional integral transforms of operator with applications to fractional differential equations
Computational methods in fractional differential equations
Computational problems in fractal theory, fractal sets, unsmooth functions
Analysis with local fractional operators and other applications
Real word application of fractional differential equations from science and engineering