Lie symmetries, invariant subspace method, and conservation laws for a time fractional generalized Broer–Kaup system

In this paper, we investigate the Lie group formalism for the time fractional generalized nonlinear Broer–Kaup system in the sense of Riemann–Liouville fractional partial derivative. The Lie algebra corresponding to the symmetry groups in which the studied equation remains invariant is established,...

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Bibliographic Details
Published in:Computational & applied mathematics 2024-02, Vol.43 (1), Article 36
Main Authors: Rahioui, Mohamed, El Kinani, El Hassan, Ouhadan, Abdelaziz
Format: Article
Language:English
Subjects:
Applications of Mathematics
Computational Mathematics and Numerical Analysis
Conservation laws
Exact solutions
Invariants
Lie groups
Mathematical Applications in Computer Science
Mathematical Applications in the Physical Sciences
Mathematics
Mathematics and Statistics
Power series
Subspace methods
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Summary:In this paper, we investigate the Lie group formalism for the time fractional generalized nonlinear Broer–Kaup system in the sense of Riemann–Liouville fractional partial derivative. The Lie algebra corresponding to the symmetry groups in which the studied equation remains invariant is established, and the similarity reductions are performed. Next, based on the invariant subspace method as well as the power series method, including the convergence analysis, some exact solutions of the time fractional generalized Broer–Kaup system and its standard form are derived. Moreover, in order to show the dynamical behavior and the impact of the fractional order on the profile of solutions, some figures in 2D and 3D have been depicted. Finally, in accordance with the nonlinear self-adjointness property, conservation laws are successfully formulated using infinitesimal symmetries.
ISSN:2238-3603
1807-0302
DOI:10.1007/s40314-023-02556-8