Fourth order Trigonometrically-fitted and Exponentially-fitted Symplectic Methods for the Numerical Integration of the Schrödinger Equation 
                     1

doi:10.1201/9780429081385-95

Chapter

Fourth order Trigonometrically-fitted and Exponentially-fitted Symplectic Methods for the Numerical Integration of the Schrödinger Equation
1

Chapter

ABSTRACT

The solution of the one-dimensional time-independent Schrödinger equation is considered by trigonometrically-fitted and exponentially-fitted symplectic integrators. A modified Yoshida-type fourth order method is proposed. The Schrödinger equation is first transformed into a Hamiltonian canonical equation. Numerical results are obtained for the one-dimensional harmonic oscillator and Morse potential.

Fourth order Trigonometrically-fitted and Exponentially-fitted Symplectic Methods for the Numerical Integration of the Schrödinger Equation 1

ABSTRACT