期刊
HIGH ENERGY DENSITY PHYSICS
卷 47, 期 -, 页码 -出版社
ELSEVIER
DOI: 10.1016/j.hedp.2023.101042
关键词
Schrodinger equation; Spherical symmetry; Radial grid; Linear-logarithmic mesh; Lambert W function; Explicit and implicit forms
In this note, the choice of radial grid in the numerical resolution of the Schrodinger equation is discussed. The transformation of the equation resulting from a change of variable and function for a generic radial grid is detailed, using either the explicit or implicit form of the relation describing the change of variable, and applied to the log-linear mesh. It is shown that the complication of requiring the first three derivatives of the Lambert function becomes unnecessary if the implicit relation is adopted.
In this note, we discuss the choice of radial grid in the numerical resolution of the Schrodinger equation. We detail the transformation of the equation resulting from a change of variable and function for a generic radial grid, using either the explicit or implicit form of the relation describing the change of variable, and apply it to the ������ ������+ ������ln(������) log-linear mesh. It is shown that, in the former case, the first three derivatives of the Lambert ������function are required. This complication becomes unnecessary if we adopt the implicit relation instead.
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