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International Journal of Computer Mathematics Volume 62, 1996 - Issue 1-2
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Original Articles

Finite difference method with cubic spline for solving nonlinear schrödinger equation

M. S. Ismail Department of Math, College of Science, King Abdulaziz University, P.O.Box 9028, Jeddah, 21413, Saudi Arabia
Pages 101-112 | Received 19 Jan 1996, Published online: 30 Mar 2007

References

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  • Bullough , R. K. and Caudrey , P. J. 1980 . “ The soliton and its history ” . In Topics in Current Phys , Vol. 17 , Springer Verlag .
  • Delfour , M. , Fortin , M. and Payne , G. 1981 . Finite difference scheme for the nonlinear Schrodinger equation . J. Comp. Phys , 44 : 277 – 288 .
  • Griffiths , D. F. , Mitchell , A. R. and Morris , J. 1982 . “ A numerical study of the nonlinear Schrodinger equation ” . NA : Dundee Univ .
  • Mitchell , A. R. and Morris , J. Li. 1983 . A self adaptive difference scheme for the nonlinear Schrodinger equation . Arab Gulf Journal of Scientific Research , 1 ( 1 ) : 461 – 472 .
  • Rubin , S.G. and Graves , R. A. 1975 . Viscous flow solutions with a cubic spline approximation . Computers and fluids , 3 ( 1 ) : 1 – 36 .
  • Sanz-Serna and Verwer , J. G. 1986 . Conservative and nonconservative schemes for the solution of the nonlinear Schrodinger equation . IMA journal of Numerical analysis , 6 ( 1 ) : 25 – 42 .
  • Shamardan , A. B. 1990 . The numerical treatment of the nonlinear Schrodinger equation . Computers Math. Applic , 19 ( 7 ) : 67 – 73 .

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