Fractional Differential Equations Solutions Open access

Fractional Differential Equations

Igor Podlubný

Jul 31, 2025 | 20,450 citations

Abstract

Abstract

In recent times, researchers across various fields have become interested in the topic of fractional calculus based on integrals and derivatives of fractional order. This area has numerous and widespread applications in fields of science and engineering, including wave and fluid dynamics, mathematical biology, financial systems, structural dynamics, robotics, and artificial intelligence, among others. Therefore, fractional models have become relevant in the context of phenomena with memory effects, in place of the conventional reliance on ordinary or partial differential equations. Fractional calculus offers superior tools for addressing time-dependent effects compared to integer-order calculus, which forms the foundation of most mathematical systems. As a result, fractional calculus is crucial to modeling real-life problems, and finding mathematical solutions is a great challenge in this regard.

Direct answer

What can I do from this paper page?

Use this page to scan "Fractional Differential Equations" quickly: start with the summary and abstract, then check the authors, source, topics, and related papers. From here, open Scollr to follow Fractional Differential Equations Solutions research, save the paper, or map adjacent work.

Authors

Researchers on this paper

Igor Podlubný

first | ORCID 0000-0003-0183-9249

Research areas

Follow related topics

Citation

BibTeX

@article{Podlubn2025Fractional,
  title = {Fractional Differential Equations},
  author = {Igor Podlubný},
  year = {2025},
  doi = {10.3390/books978-3-7258-4742-6},
  url = {https://doi.org/10.3390/books978-3-7258-4742-6}
}

FAQ

Using this paper in a discovery workflow

How do I find related work for this paper?

Use the related papers and topic links on this page as starting points. In Scollr, you can also open the paper and build a literature map around its references, citing papers, and related work.

How can I keep up with new Fractional Differential Equations Solutions research papers?

Follow Fractional Differential Equations Solutions research in Scollr. New papers from the topic flow into a personalized feed, and you can save useful studies to revisit later.

Can I cite this paper from this page?

This page includes a static BibTeX block for Fractional Differential Equations. Always verify the DOI, source, and publication details against the publisher record before submitting a manuscript.

Follow this research in Scollr

Follow the topics and authors behind this paper, save useful studies, and build a literature map when you are ready to go deeper.

Get the app