Painlevé Analysis and Chiral Solitons from Quantum Hall Effect
DOI:
https://doi.org/10.37256/cm.5420245313Keywords:
generalized Schödinger equation, chiral soliton, Painlevé test, traveling wave solution, first integralAbstract
This study examines the generalized Schrödinger equation governing chiral solitons. We assess its integrability using the Painlevé test for nonlinear partial differential equations. Our analysis shows that the equation fails the Painlevé test, suggesting the Cauchy problem cannot be solved using the inverse scattering transform. However, through a traveling wave reduction, we find that the resulting nonlinear ordinary differential equation does satisfy the Painlevé test. Therefore, we establish a general solution for this reduced equation, which we outline accordingly.
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2024-10-18
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1.
Kudryashov NA, Biswas A, Zhou Q, Yildirim Y. Painlevé Analysis and Chiral Solitons from Quantum Hall Effect. Contemp. Math. [Internet]. 2024 Oct. 18 [cited 2024 Nov. 21];5(4):4384-98. Available from: https://ojs.wiserpub.com/index.php/CM/article/view/5313
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Copyright (c) 2024 Nikolay A. Kudryashov, Anjan Biswas, Qin Zhou, Yakup Yildirim
This work is licensed under a Creative Commons Attribution 4.0 International License.