Basic asymptotic expansions of solutions to the sixth Painlevé equation
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Publication:844377
DOI10.1007/s10958-009-9489-9zbMath1196.34114OpenAlexW2024356552MaRDI QIDQ844377
Publication date: 19 January 2010
Published in: Journal of Mathematical Sciences (New York) (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10958-009-9489-9
Painlevé and other special ordinary differential equations in the complex domain; classification, hierarchies (34M55) Singularities, monodromy and local behavior of solutions to ordinary differential equations in the complex domain, normal forms (34M35)
Related Items (2)
Power geometry and elliptic expansions of solutions to the Painlevé equations ⋮ The sixth Painlevé transcendents and the associated Schlesinger equation
Cites Work
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- Expansions of solutions to the sixth Painlevé equation
- Complicated expansions of solutions to an ordinary differential equation
- Studies of the Painlevé equations. I: Sixth Painlevé equation \(P_{VI}\)
- A family of solutions of a nonlinear ordinary differential equation and its application to Painlevé equations (III), (V) and (VI)
- Painlevé differential equations in the complex plane
- Expansions of solutions to the sixth Painlevé equation in the cases \(a= 0\) and \(b = 0\)
- Asymptotic behaviour and expansions of solutions of an ordinary differential equation
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