Department of mathematics, faculty of science, Azad university, central Tehran, Iran
10.22034/jdgaa.2024.2021475.1005
Abstract
Lie theory, was pioneered by mathematician Sophus Lie. Caprasse, and Élie Cartan, have evolved into a powerful mathematical framework for understanding the symmetries inherent in differential equations. Employing Lie group analysis, we aim to systematically explore the inherent symmetries of the nonlinear PDE. This analysis provides valuable insights into the invariance properties, unveiling hidden structures that can contribute to a deeper understanding of the equation. Through the scrutiny of Lie symmetries, our objective is to facilitate the identification of exact solutions for the nonlinear PDE. This contributes to the development of analytical methods and enhances our ability to comprehend the physical implications of the solutions.
Alizadeh,F. (2024). Investigating the Lie symmetry method for generalized modified heat
equation. Journal of Differential Geometry, Applications and Aspects, 1(1), 28-33. doi: 10.22034/jdgaa.2024.2021475.1005
MLA
Alizadeh,F. . "Investigating the Lie symmetry method for generalized modified heat
equation", Journal of Differential Geometry, Applications and Aspects, 1, 1, 2024, 28-33. doi: 10.22034/jdgaa.2024.2021475.1005
HARVARD
Alizadeh F. (2024). 'Investigating the Lie symmetry method for generalized modified heat
equation', Journal of Differential Geometry, Applications and Aspects, 1(1), pp. 28-33. doi: 10.22034/jdgaa.2024.2021475.1005
CHICAGO
F. Alizadeh, "Investigating the Lie symmetry method for generalized modified heat
equation," Journal of Differential Geometry, Applications and Aspects, 1 1 (2024): 28-33, doi: 10.22034/jdgaa.2024.2021475.1005
VANCOUVER
Alizadeh F. Investigating the Lie symmetry method for generalized modified heat
equation. JDGAA, 2024; 1(1): 28-33. doi: 10.22034/jdgaa.2024.2021475.1005
Journal of Differential Geometry, Applications and Aspects