Mathematical Physics
A section of Fractal and Fractional (ISSN 2504-3110).
Section Information
Mathematical Physics is a section of the journal Fractal and Fractional, which publishes advanced theoretical works and practical applications on the field of real world problems.
Today, experts use mathematical norms to observe the general and specific properties of real world problems arising in the fields of applied science, physics, mathematics, computers, engineering and environmental science. Usually, these norms help us manage problems in application. Thus, to study newly developed methods and algorithms and also their applications is one of the main aims of this section.
The study of mathematical physics can present a variety tools. Therefore, novel perspectives of newly extracted data are possible using mathematical tools. Mathematical physics is one of the most important ways of understanding the problems arising in nature and in human-related activities, including economy, engineering, comunications and networks, information science, economical problems, graph theory, molecular dynamics, immunology, living organisms, computational systems, physics and mathematical industry. The main aim of Mathematical Physics is to develop a unique understanding of the real world problems through the language of mathematical forms. Its scope contains theoretical perspectives and the application of newly developed ideas arising in mathematical physical fields of nonlinear sciences. All fields of engineering, applied science, health problems, physics, economy, statistics, mathematics, chemistry and other disciplines dealing with Mathematical Physics are within the scope of the Section.
Keywords
- engineering problems;
- analytical methods;
- numerical methods;
- computational mathematics;
- nonlinear system and applied in physics;
- information science;
- comunications theory;
- bioinformatics;
- health problems;
- networks;
- physics;
- engineering and applied sciences;
- economy;
- statistics;
- fractals;
- fractional calculus;
- nonlinear dynamical systems;
- graph theory;
- statistical learning theory;
- computation topics on energy and environmental science;
- artificial intelligence;
- data science;
- discrete dynamical system.
Editorial Board
Topical Advisory Panel
Special Issues
Following special issues within this section are currently open for submissions:
- Stochastic and Fractional Differential Equations: Attractor, Invariant Measure and Their Relationship (Deadline: 30 November 2024)
- Recent Advances in Computational Physics with Fractional Application, 2nd Edition (Deadline: 31 December 2024)
- Fractal Theory and Models in Nonlinear Dynamics and Their Applications (Deadline: 31 December 2024)
- Fractional Equations and Calculation Methods in Exploration Seismology (Deadline: 31 December 2024)
- Advanced Research in Fractal Properties of Nanoparticle and Its Application (Deadline: 28 February 2025)
- Fractal and Multifractal Analysis in Econometric Models and Empirical Finance (Deadline: 28 February 2025)
- General Fractional Calculus: Theory, Methods and Applications in Mathematical Physics (Deadline: 25 March 2025)
- Applications of Fractals and Fractional Calculus in Nuclear Reactors (Deadline: 25 April 2025)
- Analysis of Heat Conduction and Anomalous Diffusion in Fractional Calculus (Deadline: 30 May 2025)
- Fractional Gravity/Cosmology in Classical and Quantum Regimes, Second Edition (Deadline: 30 June 2025)
- Recent Computational Methods for Fractal and Fractional Nonlinear Partial Differential Equations (Deadline: 31 July 2025)
- Analysis and Applications of Fractional Calculus in Computational Physics (Deadline: 31 August 2025)
- Numerical and Exact Methods for Nonlinear Differential Equations and Applications in Physics, 2nd Edition (Deadline: 1 October 2025)