临界相对论性物质的磁斯科特校正

Gonzalo A. Bley, S. Fournais
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引用次数: 0

摘要

我们提供了在磁场存在下伪相对论分子的最小能量的领先渐近性的第一个校正的证明,即所谓的“相对论斯科特校正”,当$\max{Z_k\alpha} \leq 2/\pi$,其中$Z_k$是$k$ -核的电荷,$\alpha$是精细结构常数。我们的定理将Erdős, Fournais和Solovej先前的结果扩展到相对论Hardy不等式$|p| - \frac{2}{\pi |x|} \geq 0$中的临界常数$2/\pi$。
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The magnetic Scott correction for relativistic matter at criticality
We provide a proof of the first correction to the leading asymptotics of the minimal energy of pseudo-relativistic molecules in the presence of magnetic fields, the so-called "relativistic Scott correction", when $\max{Z_k\alpha} \leq 2/\pi$, where $Z_k$ is the charge of the $k$-th nucleus and $\alpha$ is the fine structure constant. Our theorem extends a previous result by Erdős, Fournais, and Solovej to the critical constant $2/\pi$ in the relativistic Hardy inequality $|p| - \frac{2}{\pi |x|} \geq 0$.
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