ASYMPTOTIC EXPRESSION AND A SUFFICIENT CONDITION ON THE OSCILLATING SOLUTIONS EQUATION TO THE GENERAL SECOND PAINLEV E

Huizeng Qin; Youmin Lu

Title	ASYMPTOTIC EXPRESSION AND A SUFFICIENT CONDITION ON THE OSCILLATING SOLUTIONS EQUATION TO THE GENERAL SECOND PAINLEV E
Publication Type	Journal Article
Year of Publication	2006
Authors	Qin, H
Secondary Authors	Lu, Y
Secondary Title	Communications in Applied Analysis
Volume	10
Issue	3
Start Page	271
Pagination	283
Date Published	07/2006
Type of Work	scientific: mathematics
ISSN	1083–2564
AMS	35E99
Abstract	In this paper, we study the general second Painlev ́e equation and find a sufficient condition for its solutions to be oscillating and the corresponding asymptotic expression as its independent variable x approaches negative infinity by using the uniform asymptotics and the monodromic data methods.
URL	http://www.acadsol.eu/en/articles/10/3/1.pdf
Short Title	General Second Painlev ́e Equation
Refereed Designation	Refereed
Full Text	REFERENCES [1] A.P. Bassom, P.A. Clarkson, C.K. Law, and J. B. McLeod, Application of uniform asymptotics to the second Painleve transcendent. [2] S.P. Hastings and J.B. McLeod, A boundary value problem associated with the second Painleve transcendent and the Korteweg-de-Vries equation, Arch. Rational Mech. Anal., 73 (1980), no. 1, 31-51 [3] A.R. Its and V.Yu. Novokshnov, The Isomonodromic Deformation Method in the Theory of Painleve Equations, Lect. Notes in Math., 1991, Springer-Verlag, Berlin, 1986. [4] N. Joshi and M.D. Kruskal, An asymptotic approach to the connection problem for the first and second Painleve equations, Phys. Lett. A, 130 (1988), 129-137. [5] Hui-zeng Qin and Ni-na Shang, Asymptotic analysis of numerical solutions of Painlev ́e equations, Journal on Numerical Methods and Computer Applications, To Appear. [6] Hui-zeng Qin and Ni-na Shang, Asymptotic analysis of a bounded solution to the general third Painleve equation, MJMS, To Appear.