We analyze a numerical method to solve the time-dependent linear Pauli equation in three space dimensions. The Pauli equation is a semi-relativistic generalization of the Schrodinger equation for 2-spinors which accounts both for magnetic fields and for spin, with the latter missing in preceding numerical work on the linear magnetic Schrodinger equation. We use a four term operator splitting in time, prove stability and convergence of the method and derive error estimates as well as meshing strategies for the case of given time-independent electromagnetic potentials, thus providing a generalization of previous results for the magnetic Schrodinger equation.
Gutleb, T.S., Mauser, N.J., Ruggeri, M., Stimming, H.P. (2024). A Time Splitting Method for the Three-Dimensional Linear Pauli Equation. COMPUTATIONAL METHODS IN APPLIED MATHEMATICS, 24(2), 407-420 [10.1515/cmam-2023-0094].
A Time Splitting Method for the Three-Dimensional Linear Pauli Equation
Ruggeri, Michele;
2024
Abstract
We analyze a numerical method to solve the time-dependent linear Pauli equation in three space dimensions. The Pauli equation is a semi-relativistic generalization of the Schrodinger equation for 2-spinors which accounts both for magnetic fields and for spin, with the latter missing in preceding numerical work on the linear magnetic Schrodinger equation. We use a four term operator splitting in time, prove stability and convergence of the method and derive error estimates as well as meshing strategies for the case of given time-independent electromagnetic potentials, thus providing a generalization of previous results for the magnetic Schrodinger equation.| File | Dimensione | Formato | |
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