狄拉克材料与非简并统计热力学体系的大势恒等式

IF 1.8 Q3 MATERIALS SCIENCE, MULTIDISCIPLINARY

IEEE Open Journal of Nanotechnology Pub Date : 2023-01-10 DOI:10.1109/OJNANO.2023.3234042

NORMAN J. M. HORING

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引用次数: 0

摘要

我们考察了“狄拉克材料能否存在于非简并统计状态?”在低密度非简并统计体系中，推导并采用热力学大势$\Omega$(每单位体积/面积)的恒等式，将其与密度$n$联系为$\Omega = -\beta ^{-1} n$ ($\beta ^{-1} = \kappa _{B} T$为热能，$\kappa _{B}$为玻尔兹曼常数，$T$为开尔文温度)。对狄拉克材料的这种同一性的含义进行了探讨。这一恒等式对所有处于非简并、低密度统计体系平衡状态的热力学系统是普遍有效的，与大小、维数或施加的静态场无关。讨论了可能有助于在狄拉克材料中实现这种非简并统计平衡态的现象。

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Dirac Materials and an Identity for the Grand Potential of the Nondegenerate Statistical Thermodynamic Regime

We examine the question “Can Dirac materials exist in a nondegenerate statistical state?,” deriving and employing an identity for the thermodynamic Grand Potential

$\Omega$

(per unit volume/area) in the low density nondegenerate statistical regime, relating it to the density

$n$

$\Omega = -\beta ^{-1} n$

(

$\beta ^{-1} = \kappa _{B} T$

is thermal energy,

$\kappa _{B}$

is the Boltzmann constant, and

$T$

is Kelvin temperature). The implications of this identity for Dirac materials are explored. The identity is universally valid for all thermodynamic systems in equilibrium in the nondegenerate, low density statistical regime, irrespective of size, dimensionality or applied static fields. Phenomena that may contribute to the realization of such a nondegenerate statistical equilibrium state in Dirac materials are discussed.

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来源期刊

IEEE Open Journal of Nanotechnology Multiple-

CiteScore

3.90

自引率

17.60%

发文量

审稿时长

12 weeks