On an Eighth Order Formula for Solving a Schrödinger Equation

The spectrum of the two-dimensional Schrodinger equation for polynomial oscillators bounded by infinitely high potentials, where the eigenvalue problem is defined on a w . finite interval r g 0, L , is variationally studied. The wave function is expanded into a Fourier᎐Bessel series, and matrix elem

A numerical procedure is suggested for the solution of multidimensional inhomogeneous Helmholtz/Schro ¨dinger equations. The procedure is based on coordinate-space (grid) representations in which all the coupling terms (V ˆ) between different degrees of freedom are local (diagonal) and therefore the

In this paper I prove a L p &L p estimate for the solutions to the one-dimensional Schro dinger equation with a potential in L 1 # where in the generic case #>3Â2 and in the exceptional case (i.e., when there is a half-bound state of zero energy) #>5Â2. I use this estimate to construct the scatterin

been employed in bound state calculations, where the spectrum of the Hamiltonian can be obtained from the solution A grid method for obtaining eigensolutions of bound systems is presented. In this, the block-Lanczos method is applied to a Chebyof the TDSE. The problem usually encountered is the shev