Cr二维单层薄片中Jahn-Teller效应的第一性原理研究

张薇; 陈凯彬; 陈震东

doi:10.7498/aps.67.20181669

摘要

采用基于密度泛函理论的第一性原理计算，本文对Cr单层薄片的一系列二维结构（长方、正方、六角、斜方和中心长方晶格）进行了结构稳定性和电子性质研究.结果表明，在Cr的二维体系中，对称性较低的斜方晶格和中心长方晶格是稳定的，对称性较高的正方和六角晶格是不稳定的，而长方晶格的形成能很小.Cr二维原子薄片的两种稳定结构都是六角结构畸变的结果，六角晶格的键角减小时会形变成斜方晶格，键角增大时会形变成中心长方晶格，这是由于Jahn-Teller效应使简并能级自发破缺，继而结构产生降低对称性的形变，最终使得体系变得稳定.

关键词:

Abstract

Computational physics has been used in many scientific research fields, in which first-principles calculation based on density functional theory has made brilliant achievements. Unlike three-dimensional materials, low-dimensional materials present fantastic physical effect, due to the reduction of material dimensions. With the rapid development of two-dimensional materials, people have a more in-depth understanding of them. Requirements for high performance of two-dimensional materials are raised for potential applications, so the exploration of some effects affecting the stability of two-dimensional materials becomes more and more important. Based on the pioneers' work, Jahn-Teller effect is found to have a certain influence on the stabilities of two-dimensional structure of some elements. In the present paper, we explain the stable structure of Cr monolayer film through theoretical calculation, providing a guidance for experimental synthesis. Using first-principles calculation, we study a series of two-dimensional structures (rectangular, square, hexagonal, oblique and centered rectangular) of Cr monolayer film, focusing on the structural stability and electronic properties. Firstly, the equilibrium lattice constant and cohesive energy of each structure are calculated. Then, the bond angle and lattice constant dependence of the total energy are analyzed in detail. Finally, we investigate the energy band structures, total electronic densities of states, charge densities and electron occupation numbers of orbitals. The results show that low-symmetry oblique and centered rectangular lattice are stable in the two-dimensional system of Cr, while high-symmetry square and hexagonal lattices are not stable and the adhesive energy of the rectangular lattices is very small. Two stable structures of Cr monolayer sheet are formed due to hexagonal structure distortion. The hexagonal structure can shape into a centered rectangular structure with the increase of bond angle, while it changes into an oblique structure with the decrease of bond angle. Because of Jahn-Teller effect, the degenerate energy level spontaneously splits. Then the structure deforms into two reduced-symmetry structures, resulting in a stable system. Therefore, we can infer that the Jahn-Teller effect plays a crucial role in the structural stability of monolayer sheet.

Keywords:

作者及机构信息

1. 福建师范大学物理与能源学院, 福建省量子调控与新能源材料重点实验室, 福州 350117;

2. 福建省半导体光电材料及其高效转换器件协同创新中心, 厦门 361005

基金项目: 国家自然科学基金（批准号：11504051）和福建省杰出青年科学基金（批准号：2018J06001）资助的课题.

Authors and contacts

1. Fujian Provincial Key Laboratory of Quantum Manipulation and New Energy Materials, College of Physics and Energy, Fujian Normal University, Fuzhou 350117, China;

2. Fujian Provincial Collaborative Innovation Center for Optoelectronic Semiconductors and Efficient Devices, Xiamen 361005, China

Funds: Project supported by the National Natural Science Foundation of China (Grant No. 11504051) and the Science Fund for Distinguished Young Scholars of Fujian Province, China (Grant No. 2018J06001).

参考文献

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施引文献

[1]	Chhowalla M, Shin H S, Eda G, Li L, Loh K P, Zhang H 2013 Nat. Chem. 5 263
[2]	Novoselov K S, Geim A K, Morozov S V, Jiang D, Zhang Y, Dubonos S V, Grigorieva I V, Firsov A A 2004 Science 306 666
[3]	Li S S, Wang S F, Tang D M, Zhao W J, Xu H L, Chu L Q, Bando Y, Golberg D, Eda G 2015 Appl. Mater. Today 1 60
[4]	Zhou J D, Lin J H, Huang X W, Zhou Y, Chen Y, Xia J, Wang H, Xie Y, Yu H M, Lei J C, Wu D, Liu F C, Fu Q D, Zeng Q S, Hsu C H, Yang C L, Lu L, Yu T, Shen Z X, Lin H, Yakobson B I, Liu Q, Suenaga K, Liu G T, Liu Z 2018 Nature 556 355
[5]	Liu C C, Feng W X, Yao Y G 2011 Phys. Rev. Lett. 107 76802
[6]	Xu Y, Yan B H, Zhang H J, Wang J, Xu G, Tang P Z, Duan W H, Zhang S C 2013 Phys. Rev. Lett. 111 136804
[7]	Ezawa M 2012 Phys. Rev. Lett. 109 55502
[8]	Liu N, Jin S F, Guo L W, Wang G, Shao H Z, Chen L, Chen X L 2017 Phys. Rev. B 95 155311
[9]	Kresse G, Hafner J 1993 Phys. Rev. B 47 558
[10]	Kresse G, Furthmuller J 1996 Phys. Rev. B 54 11169
[11]	Blöchl P E 1994 Phys. Rev. B 50 17953
[12]	Kresse G, Joubert D 1999 Phys. Rev. B 59 1758
[13]	Perdew J P, Chevary J A, Vosko S H, Jackson K A, Pederson M R, Singh D J, Fiolhais C 1992 Phys. Rev. B 46 6671
[14]	Monkhors H J, Pack J D 1976 Phys. Rev. B 13 5188
[15]	Blöchl P E, Jepsen O, Andersen O K 1994 Phys. Rev. B 49 16223
[16]	TonKov E T, Ponyatovsky E G 2005 Phase Transformations of Elements Under High Pressure (Boca Raton: CRC Press) pp242-244
[17]	Olle M, Ceballos G, Serrate D, Gambardella P 2012 Nano Lett. 12 4431
[18]	Robertson A W, Warner J H 2011 Nano Lett. 11 1182

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