Advances in Mathematical Physics

Fractal theory is a compact branch of nonlinear science and has significant applications in porous media, aquifers, turbulence, and other media which usually exhibit fractal properties. Fractional calculus has great importance where all the elements can be found such as the idea of fractional-order integration and differentiation, and the mutually inverse relationship between them. Fractional calculus has its applications in miscellaneous fields of engineering and science such as electromagnetics, viscoelasticity, fluid mechanics, electrochemistry, biological population models, optics, and signal processing.

The theory and applications of fractional calculus greatly prolonged over the 19th and 20th centuries, and numerous contributors have given definitions for fractional derivatives and integrals. Mathematical research on fractals has now reached such a level, where beautiful concepts of fractional calculus are developed in direct contact with engineering concerns. Numerous analytical and numerical investigations have played a decisive role in particular areas but there are still many challenges to find out the exact solution.

This Special Issue aims to collect ideas and significant contributions to the theories and applications of analytic inequalities, functional equations, and differential equations involving fractals and fractional calculus including theoretical and numerical features in future directions. We welcome original research and review articles.

Potential topics include but are not limited to the following: