EXPONENTIAL-FITTING METHODS FOR NUMERICAL-SOLUTION OF SCHRODINGER EQUATION
RAPTIS A, ALLISON AC
COMPUTER PHYSICS COMMUNICATIONS
14 (1-2): 1-5 1978
Psihoyios G, Simos TE
Trigonometrically fitted predictor-corrector methods for IVPs with oscillating solutions
J COMPUT APPL MATH 158 (1): 135-144 SEP 1 2003

Williams PS, Simos TE
A new family of exponentially fitted methods
MATH COMPUT MODEL 38 (5-6): 571-584 SEP 2003

Simos TE
A family of trigonometrically-fitted symmetric methods for the efficient solution of the Schrodinger equation and related problems
J MATH CHEM 34 (1-2): 39-58 JUL 2003

Psihoyios G, Simos TE
Exponentially and trigonometrically fitted explicit advanced step-point (EAS) methods for initial value problems with oscillating solutions
INT J MOD PHYS C 14 (2): 175-184 FEB 2003

Simos TE, Vigo-Aguiar J
A dissipative exponentially-fitted method for the numerical solution of the Schrodinger equation and related problems
COMPUT PHYS COMMUN 152 (3): 274-294 MAY 15 2003

Simos TE
Dissipative trigonometrically-fitted methods for second order IVPs with oscillating solution
INT J MOD PHYS C 13 (10): 1333-1345 DEC 2002

Vigo-Aguiar J, Simos TE
Family of twelve steps exponential fitting symmetric multistep methods for the numerical solution of the Schrodinger equation
J MATH CHEM 32 (3): 257-270 OCT 2002

Ixaru LG, Vanden Berghe G, De Meyer H
Exponentially fitted variable two-step BDF algorithm for first order ODEs
COMPUT PHYS COMMUN 150 (2): 116-128 FEB 1 2003

Avdelas G, Kefalidis E, Simos TE
New P-stable eighth algebraic order exponentially-fitted methods for the numerical integration of the Schrodinger equation
J MATH CHEM 31 (4): 371-404 MAY 2002

Simos TE, Williams PS
A new Runge-Jutta-Nystrom method with phase-lag of order infinity for the numerical solution of the Schrodinger equation
MATCH-COMMUN MATH CO (45): 123-137 MAR 2002

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