The conference is one of the Thematic Conferences of the European Community on Computational Methods in Applied Sciences (ECCOMAS) and a Special Interest Conference of the International Association for Computational Mechanics (IACM). It is also supported by other scientific organizations in Europe and worldwide.

A special issue of Mathematical and Computational Applications journal will be finalized at the end of the conference. Contributions will be by invitation

The previous eight editions of this conference were held on the islands of Santorini (Greece) on 25-28 May 2005, Ibiza (Spain) on 21-23 May 2007, Ischia (Italy) on 8-11 June 2009, Kos (Greece) on 20-22 June 2011, Ibiza (Spain) on June 17 - 19 June 2013, San Servolo, Venice, Italy on May 18 - 20 2015, on Rhodes Island, Greece on June 12 - 14 2017 and in Sitges, Spain on June 3-5, 2019

Conference organized by CIMNE Congress Bureau.

A publication of the Mexican Association of Numerical Modelling in Engineering

ISSN 2604-4374
Rev. mex. métodos numér.

The theory and applications of fractional calculus prolonged greatly 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 are developed in direct contact with engineering concerns. Numerous analytical and numerical investigations have played a decisive role in a particular area, but still there are many challenges to find out the exact solution.

This special issue will collect ideas and significant contributions to the theories and applications of analytic inequalities, functional equations, and differential equations involving fractals and fractional calculus.

The topics of interest include, but are not limited to:

• The two-scale fractal derivative
• Fractal geometry
• Applications of fractal theory in science and engineering
• Analytical and numerical solution of fractional differential equations
• Fractal and fractional calculus
• Fractal derivative and fractal space
• Variational theory and variational principle
• Fractal semi-inverse method
• New numerical schemes for fractal-fractional operators.
• Fractal fractional calculus
• Applications of Fractional Calculus in mathematical physics
• Fractional differential equations in fractal media

Lead Guest Editor: 

Dr. Muhammad Nadeem

Qujing Normal University, China

Email: nadeem@mail.qjnu.edu.cn

Guest Editors:

Prof. Omar Abu Arqub

Al-Balqa Applied University, Salt, Jordan

Email: o.abuarqub@bau.edu.jo

The theory and applications of fractional calculus prolonged greatly 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 are developed in direct contact with engineering concerns. Numerous analytical and numerical investigations have played a decisive role in a particular area, but still there are many challenges to find out the exact solution.

This special issue will 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 the future direction. 

The topics of interest include, but are not limited to:

• The two-scale fractal derivative
• Fractal geometry
• Applications of fractal theory in science and engineering
• Analytical and numerical solution of fractional differential equations
• Fractal and fractional calculus
• Fractal derivative and fractal space
• Variational theory and variational principle
• Fractal semi-inverse method
• New numerical schemes for fractal-fractional operators.
• Fractal fractional calculus
• Applications of Fractional Calculus in mathematical physics
• Fractional differential equations in fractal media