Exponentially - Fitted Multiderivative Methods for the Numerical Solution of the Schrödinger Equation
暂无分享,去创建一个
[1] T. E. Simos,et al. New P-Stable Eighth Algebraic Order Exponentially-Fitted Methods for the Numerical Integration of the Schrödinger Equation , 2002 .
[2] Moawwad E. A. El-Mikkawy,et al. Families of Runge-Kutta-Nystrom Formulae , 1987 .
[3] Liviu Gr Ixaru,et al. Numerical methods for differential equations and applications , 1984 .
[4] J. W. Cooley,et al. An improved eigenvalue corrector formula for solving the Schrödinger equation for central fields , 1961 .
[5] M. M. Chawla,et al. Numerov made explicit has better stability , 1984 .
[6] Tom E. Simos,et al. A Modified Phase-Fitted Runge–Kutta Method for the Numerical Solution of the Schrödinger Equation , 2001 .
[7] T. E. Simos. A Family of Trigonometrically-Fitted Symmetric Methods for the Efficient Solution of the Schrödinger Equation and Related Problems , 2003 .
[8] M H Chawla,et al. A Noumerov-type method with minimal phase-lag for the integration of second order periodic initial-value , 1986 .
[9] Symplectic Methods for the Numerical Solution of the Radial Shrödinger Equation , 2003 .
[10] A new explicit Bessel and Neumann fitted eighth algebraic order method for the numerical solution of the Schrödinger equation , 2000 .
[11] Family of Twelve Steps Exponential Fitting Symmetric Multistep Methods for the Numerical Solution of the Schrödinger Equation , 2002 .
[12] G. Herzberg,et al. Spectra of diatomic molecules , 1950 .
[13] T. E. Simos,et al. Symmetric Eighth Algebraic Order Methods with Minimal Phase-Lag for the Numerical Solution of the Schrödinger Equation , 2002 .
[14] T. E. Simos,et al. Eighth order methods with minimal phase‐lag for accurate computations for the elastic scattering phase‐shift problem , 1997 .
[16] Theodore E. Simos,et al. On Finite Difference Methods for the Solution of the Schrödinger Equation , 1999, Comput. Chem..
[17] Zacharoula Kalogiratou,et al. Construction of Trigonometrically and Exponentially Fitted Runge–Kutta–Nyström Methods for the Numerical Solution of the Schrödinger Equation and Related Problems – a Method of 8th Algebraic Order , 2002 .
[18] Embedded eighth order methods for the numerical solution of the Schrödinger equation , 1999 .
[19] L.Gr. Ixaru,et al. A numerov-like scheme for the numerical solution of the Schrödinger equation in the deep continuum spectrum of energies , 1980 .
[20] T. E. Simos,et al. Some embedded modified Runge-Kutta methods for the numerical solution of some specific Schrödinger equations , 1998 .
[21] T. E. Simos,et al. A Family of P-stable Eighth Algebraic Order Methods with Exponential Fitting Facilities , 2001 .
[22] T. E. Simos,et al. A family of P-stable exponentially‐fitted methods for the numerical solution of the Schrödinger equation , 1999 .
[23] Moawwad E. A. El-Mikkawy,et al. High-Order Embedded Runge-Kutta-Nystrom Formulae , 1987 .
[25] A. Messiah. Quantum Mechanics , 1961 .