Email this article Weak nonlinear asymptotic solutions for the fourth order analogue of the second Painlevé equation
- Authors: Gaiur I.Y.1, Kudryashov N.A.1
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Affiliations:
- Department of Applied Mathematics
- Issue: Vol 22, No 3 (2017)
- Pages: 266-271
- Section: Article
- URL: https://ogarev-online.ru/1560-3547/article/view/218626
- DOI: https://doi.org/10.1134/S1560354717030066
- ID: 218626
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Abstract
The fourth-order analogue of the second Painlevé equation is considered. The monodromy manifold for a Lax pair associated with the P22 equation is constructed. The direct monodromy problem for the Lax pair is solved. Asymptotic solutions expressed via trigonometric functions in the Boutroux variables along the rays ϕ = \(\frac{2}{5}\)π(2n + 1) on the complex plane have been found by the isomonodromy deformations technique.
About the authors
Ilia Yu. Gaiur
Department of Applied Mathematics
Author for correspondence.
Email: IYGaur@mephi.ru
Russian Federation, Kashirskoe sh. 31, Moscow, 115409
Nikolay A. Kudryashov
Department of Applied Mathematics
Email: IYGaur@mephi.ru
Russian Federation, Kashirskoe sh. 31, Moscow, 115409
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