Electromagnetic Response Theory with Relativistic Corrections: Selfconsistency and Validity of Variables

Kikuo Cho
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Abstract

Schr\"odinger-Pauli equation (SP-eq) derived from weakly relativistic approximation (WRA) of Dirac eq, combined with Electromagnetic (EM) field Lagrangian for variational principle, is expected to give a new level of EM response theory. A complete process of this formulation within the second order WRA is given, with explicit forms of charge and current densities, $\rho , \vec{J}$, and electric and magnetic polarizations, $\vec{P}$, $\vec{M}$ containing correction terms. They fulfill, not only the continuity equation, but also the relations $\nabla \cdot \vec{P}=-\rho, \ \partial \vec{P}/\partial t + c \nabla \times \vec{M} = \vec{J}$, known in the classical EM theory for the corresponding macroscopic variables. This theory should be able to describe all the EM responses within the second order WRA, and the least necessary variables are ${\phi, \vec{A}, \rho, \vec{J}}$ (six independent components). From this viewpoint, there emerges a problem about the use of "spin current" popularly discussed in spintronics, because it does not belong to the group of least necessary variables.
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电磁响应理论与相对论修正:变量的自洽性和有效性
从狄拉克方程的弱相对论近似(WRA)导出的薛定谔-保利方程(SP-eq),结合电磁场拉格朗日的变分原理,有望给出电磁响应理论的新水平。本文给出了二阶 WRA 中这一表述的完整过程,其中包括电荷和电流密度($\rho ,\vec{J}$)以及电极化和磁极化($\vec{P}$, $\vec{M}$)的显式修正项。它们不仅满足连续性方程,还满足$\nabla \cdot \vec{P}=-\rho, \partial \vec{P}/\partialt + c \nabla \times \vec{M} = \vec{J}$,这些关系在经典电磁理论中对于相应的宏观变量是已知的。这一理论应该能够描述二阶 WRA 内的所有电磁响应,而最小必要变量是 ${\phi,\vec{A},\rho,\vec{J}}$(六个独立分量)。
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