Painleve Integrability of Nonlinear SchrSdinger Equations with both Space- and Time-Dependent Coefficients

• Published in: Communications in theoretical physics no. 12; pp. 1101 - 1108
• Main Author: Kyoung Ho Han H.J. Shin
• Format: Journal Article
• Language: English
• Published: 2010
• Subjects: Lax对; Painleve分析; 可积性; 时变系数; 时间依赖性; 非线性方程; 非齐次方程
• ISSN: 0253-6102

We investigate the Painleve integrabiiity of nonautonomous nonlinear Schr6dinger （NLS） equations with both space-and time-dependent dispersion, nonlinearity, and external potentials. The Painleve analysis is carried out without using the Kruskal＇s simplification, which results in more generalized form of inhomogeneous equations. The obtained equations are shown to be reducible to the standard NLS equation by using a point transformation. We also construct the corresponding Lax pair and carry out its Kundu-type reduction to the standard Lax pair. Special cases of equations from choosing limited form of coefficients coincide with the equations from the previous Painleve analyses and/or become unknown new equations.