(Berlin: Weierstraß-Institut für Angewandte Analysis und Stochastik, 2012) Radziunas, Mindaugas; Čiegis, Raimondas; Mirinavičius, Aleksas
In the present paper a general technique is developed for construction
of compact high-order finite difference schemes to approximate Schrödinger
problems on nonuniform meshes. Conservation of the finite difference schemes
is investigated. Discrete transparent boundary conditions are constructed for
the given high-order finite difference scheme. The same technique is applied
to construct compact high-order approximations of the Robin and Szeftel type
boundary conditions. Results of computational experiments are presented
