Convergence of Formal Solutions to the Second Member of the Fourth Painlevé Hierarchy in a Neighborhood of Zero

Convergence of Formal Solutions to the Second Member of the Fourth Painlevé Hierarchy in a Neighborhood of Zero

The second member of the fourth Painlevé hierarchy is considered. Convergence of certain power asymptotic expansions in a neighborhood of zero is proved. New families of power asymptotic expansions are found. Computations are carried out using a computer algebra system. Reference to a code that can...

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Veröffentlicht in:Computational mathematics and mathematical physics 2023, Vol.63 (1), p.86-95
Hauptverfasser: Anoshin, V. I., Beketova, A. D., Parusnikova, A. V., Prokopenko, E. D.
Format: Artikel
Sprache:eng
Schlagworte:
Asymptotic series
Computational Mathematics and Numerical Analysis
Computer algebra
Convergence
Differential equations
Mathematics
Mathematics and Statistics
Partial Differential Equations
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Zusammenfassung:The second member of the fourth Painlevé hierarchy is considered. Convergence of certain power asymptotic expansions in a neighborhood of zero is proved. New families of power asymptotic expansions are found. Computations are carried out using a computer algebra system. Reference to a code that can be used for computing the Gevrey order of the formal expansion of the solution to the second-order differential equation in a symbolic computation packet is given.
ISSN:0965-5425
1555-6662
DOI:10.1134/S0965542523010049