The method of splitting for solving systems of time-dependent non-linear equations of the Schrödinger type

Cheap and easy to implement fourth-order methods for the Schrodinger equation with time-dependent Hamiltonians are ïntroduced. The methods require evaluations of exponentials of simple unidimensional integrals, and can be considered an averaging technique, preserving many of the qualitative propert

## 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

We determine optimal stability polynomials p(x) for splitting method solutions of differential equations, building on previous work by L6pez-Marcos, Sanz-Sema and Skeel (1996). The methods have a variety of stage numbers and are up to eighth order. Knowledge of p(x) allows construction of the most s