Solutions to N-dimensional time-dependent Schrödinger equations

explicit and local. Its novel features include the exact evaluation of a major contribution to an approximation to the The matrix elements of the exponential of a finite difference realization of the one-dimensional Laplacian are found exactly. This evolution operator (Eq. ( )) and a first-order ap

## Abstract Using a general symmetry approach we establish transformations between different non‐linear space–time dependent evolution equations of Schrödinger type and their respective solutions. As a special case we study the transformation of the standard non‐linear Schrödinger equation (NLS)‐eq

## Abstract In this paper we study local and global well‐posedness in __L__^2^ and __H__^1^ of the Cauchy problem for the following nonlinear Schrödinger equations equation image in the space ℝ^1+__n__^ , with __n__ ≥ 2. The coefficient __a__ (__t__) is assumed to be positive, and possibly vanish

Title of program: FRICTION Catalogue number: ACWT Computers and installations: IBM 360/91-370/145 at IPP Garching, IBM 370/165 at GSI Darmstadt Operating system: HASP Program language used: FORTRAN High speed storage required: 140 K bytes No. of bits in a byte: 8 Overlay structure: none No. of magne