Progress in Fractional Differentiation and Applications (PFDA) is an international and interdisciplinary journal publishing original and high quality manuscripts in the emerging field of fractional differentiation and its potential applications.
The scope of the PFDA covers all theoretical and experimental aspects of the fractional differentiation and related approaches. Reviews, letters and original research articles dealing with topics as fractional and integral equations, fractional discrete calculus and fractional dynamics are welcome. The original submissions concerning the applications of fractional differentiation in signal analysis, bifurcations, chaos, bioengineering, economics, finance, fractal theory, optics, control systems, artificial intelligence, and fractional differential equations with uncertainty, mathematical biology and nanotechnology are encouraged.
Plagiarism, or copying text or results from other sources, is unethical behavior and is not tolerated at this journal. All manuscripts will be checked for originality using the CrossCheck database. For more information on CrossCheck please visit https://www.crossref.org/crosscheck.html
Progress in Fractional Differentiation and Applications is indexed in SCOPUS.
Frequency: 4 issues annually
Current Issue: Volume 7, Issue 1 (2021) Jan. 2021
Holomorphic Solutions of a Class of 3-D Propagated Wave Dynamical Equations Indicated by a Complex Conformable Calculus
Rabha W. Ibrahim, Samir B. Hadid, and Shaher Momani
Soliton Solutions for Fractional Choquard Equations
Quanqing Li, Jian Zhang, Wenbo Wang, and Jianjun Nie
Dynamics and Sensitivity of Fractional-Order Delay Differential Model for Coronavirus (COVID-19) Infection
Fathalla A. Rihan and Velmurugan Gandhi
SVIM for Solving Burger’s and Coupled Burger’s Equations of Fractional Order
Hassan Kamil Jassim and Saad Abdul Hussain Khafif