Relativistic Scott correction in self-generated magnetic fields.

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Relativistic Scott correction in self-generated magnetic fields. / Erdos, Laszlo; Fournais, Søren; Solovej, Jan Philip.

I: Journal of Mathematical Physics, Bind 53, Nr. 9, 2012, s. 095202 .

Publikation: Bidrag til tidsskriftTidsskriftartikelForskningfagfællebedømt

Harvard

Erdos, L, Fournais, S & Solovej, JP 2012, 'Relativistic Scott correction in self-generated magnetic fields.', Journal of Mathematical Physics, bind 53, nr. 9, s. 095202 . https://doi.org/10.1063/1.3697417

APA

Erdos, L., Fournais, S., & Solovej, J. P. (2012). Relativistic Scott correction in self-generated magnetic fields. Journal of Mathematical Physics, 53(9), 095202 . https://doi.org/10.1063/1.3697417

Vancouver

Erdos L, Fournais S, Solovej JP. Relativistic Scott correction in self-generated magnetic fields. Journal of Mathematical Physics. 2012;53(9):095202 . https://doi.org/10.1063/1.3697417

Author

Erdos, Laszlo ; Fournais, Søren ; Solovej, Jan Philip. / Relativistic Scott correction in self-generated magnetic fields. I: Journal of Mathematical Physics. 2012 ; Bind 53, Nr. 9. s. 095202 .

Bibtex

@article{1e3f04fe3321487497935c30c04529e0,
title = "Relativistic Scott correction in self-generated magnetic fields.",
abstract = "We consider a large neutral molecule with total nuclear charge $Z$ in a model with self-generated classical magnetic field and where the kinetic energy of the electrons is treated relativistically. To ensure stability, we assume that $Z \alpha < 2/\pi$, where $\alpha$ denotes the fine structure constant. We are interested in the ground state energy in the simultaneous limit $Z \rightarrow \infty$, $\alpha \rightarrow 0$ such that $\kappa=Z \alpha$ is fixed. The leading term in the energy asymptotics is independent of $\kappa$, it is given by the Thomas-Fermi energy of order $Z^{7/3}$ and it is unchanged by including the self-generated magnetic field. We prove the first correction term to this energy, the so-called Scott correction of the form $S(\alpha Z) Z^2$. The current paper extends the result of \cite{SSS} on the Scott correction for relativistic molecules to include a self-generated magnetic field. Furthermore, we show that the corresponding Scott correction function $S$, first identified in \cite{SSS}, is unchanged by including a magnetic field. We also prove new Lieb-Thirring inequalities for the relativistic kinetic energy with magnetic fields. ",
author = "Laszlo Erdos and S{\o}ren Fournais and Solovej, {Jan Philip}",
year = "2012",
doi = "10.1063/1.3697417",
language = "English",
volume = "53",
pages = "095202 ",
journal = "Journal of Mathematical Physics",
issn = "0022-2488",
publisher = "A I P Publishing LLC",
number = "9",

}

RIS

TY - JOUR

T1 - Relativistic Scott correction in self-generated magnetic fields.

AU - Erdos, Laszlo

AU - Fournais, Søren

AU - Solovej, Jan Philip

PY - 2012

Y1 - 2012

N2 - We consider a large neutral molecule with total nuclear charge $Z$ in a model with self-generated classical magnetic field and where the kinetic energy of the electrons is treated relativistically. To ensure stability, we assume that $Z \alpha < 2/\pi$, where $\alpha$ denotes the fine structure constant. We are interested in the ground state energy in the simultaneous limit $Z \rightarrow \infty$, $\alpha \rightarrow 0$ such that $\kappa=Z \alpha$ is fixed. The leading term in the energy asymptotics is independent of $\kappa$, it is given by the Thomas-Fermi energy of order $Z^{7/3}$ and it is unchanged by including the self-generated magnetic field. We prove the first correction term to this energy, the so-called Scott correction of the form $S(\alpha Z) Z^2$. The current paper extends the result of \cite{SSS} on the Scott correction for relativistic molecules to include a self-generated magnetic field. Furthermore, we show that the corresponding Scott correction function $S$, first identified in \cite{SSS}, is unchanged by including a magnetic field. We also prove new Lieb-Thirring inequalities for the relativistic kinetic energy with magnetic fields.

AB - We consider a large neutral molecule with total nuclear charge $Z$ in a model with self-generated classical magnetic field and where the kinetic energy of the electrons is treated relativistically. To ensure stability, we assume that $Z \alpha < 2/\pi$, where $\alpha$ denotes the fine structure constant. We are interested in the ground state energy in the simultaneous limit $Z \rightarrow \infty$, $\alpha \rightarrow 0$ such that $\kappa=Z \alpha$ is fixed. The leading term in the energy asymptotics is independent of $\kappa$, it is given by the Thomas-Fermi energy of order $Z^{7/3}$ and it is unchanged by including the self-generated magnetic field. We prove the first correction term to this energy, the so-called Scott correction of the form $S(\alpha Z) Z^2$. The current paper extends the result of \cite{SSS} on the Scott correction for relativistic molecules to include a self-generated magnetic field. Furthermore, we show that the corresponding Scott correction function $S$, first identified in \cite{SSS}, is unchanged by including a magnetic field. We also prove new Lieb-Thirring inequalities for the relativistic kinetic energy with magnetic fields.

U2 - 10.1063/1.3697417

DO - 10.1063/1.3697417

M3 - Journal article

VL - 53

SP - 095202

JO - Journal of Mathematical Physics

JF - Journal of Mathematical Physics

SN - 0022-2488

IS - 9

ER -

ID: 40301930