Jia Li-Ping


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http://vinar.vin.bg.ac.rs/APP/faces/author.xhtml?author_id=2172a1f2-d087-407a-87e3-8346f63fd8c6&item_offset=0&project_offset=0&sort_by=dc.date.issued

Authority Key	Name Variants
2172a1f2-d087-407a-87e3-8346f63fd8c6	Jia Li-Ping (1)

Projects

Photonics of micro and nano structured materials	National Magnetic Confinement Fusion Science Program of China [2014GB104002], Strategic Priority Research Program of Chinese Academy of Sciences [XDA03030100], National Natural Science Foundation of China [11275156, 11304324], Open Project Program of State Key Laboratory of Theoretical Physics of Institute of Theoretical Physics of Chinese Academy of Sciences [Y4KF201CJ1]

Author's Bibliography

Propagation and Interaction of Edge Dislocation (Kink) in the Square Lattice

Jia Li-Ping; Tekić, Jasmina; Duan Wen-Shan

(2015)

TY  - JOUR
AU  - Jia Li-Ping
AU  - Tekić, Jasmina
AU  - Duan Wen-Shan
PY  - 2015
UR  - https://vinar.vin.bg.ac.rs/handle/123456789/493
AB  - The propagation of kink or edge dislocations in the underdamped generalized two-dimensional Frenkel-Kontorova model with harmonic interaction is studied with numerical simulations. The obtained results show that exactly one line of atoms can be inserted into the lattice, which remains at standstill. However, if more than one line of atoms are inserted into the lattice, then they will split into several lines with alpha = 1, where alpha presents the atoms inserted. In other words, only the kink with alpha = 1 is stable, while the other kinks are unstable, and will split into alpha = 1 kinks, which remain at standstill.
T2  - Chinese Physics Letters
T1  - Propagation and Interaction of Edge Dislocation (Kink) in the Square Lattice
VL  - 32
IS  - 4
DO  - 10.1088/0256-307X/32/4/040501
ER  -

@article{
author = "Jia Li-Ping and Tekić, Jasmina and Duan Wen-Shan",
year = "2015",
abstract = "The propagation of kink or edge dislocations in the underdamped generalized two-dimensional Frenkel-Kontorova model with harmonic interaction is studied with numerical simulations. The obtained results show that exactly one line of atoms can be inserted into the lattice, which remains at standstill. However, if more than one line of atoms are inserted into the lattice, then they will split into several lines with alpha = 1, where alpha presents the atoms inserted. In other words, only the kink with alpha = 1 is stable, while the other kinks are unstable, and will split into alpha = 1 kinks, which remain at standstill.",
journal = "Chinese Physics Letters",
title = "Propagation and Interaction of Edge Dislocation (Kink) in the Square Lattice",
volume = "32",
number = "4",
doi = "10.1088/0256-307X/32/4/040501"
}

Jia Li-Ping, Tekić, J.,& Duan Wen-Shan. (2015). Propagation and Interaction of Edge Dislocation (Kink) in the Square Lattice. in Chinese Physics Letters, 32(4).
https://doi.org/10.1088/0256-307X/32/4/040501

Jia Li-Ping, Tekić J, Duan Wen-Shan. Propagation and Interaction of Edge Dislocation (Kink) in the Square Lattice. in Chinese Physics Letters. 2015;32(4).
doi:10.1088/0256-307X/32/4/040501 .

Jia Li-Ping, Tekić, Jasmina, Duan Wen-Shan, "Propagation and Interaction of Edge Dislocation (Kink) in the Square Lattice" in Chinese Physics Letters, 32, no. 4 (2015),
https://doi.org/10.1088/0256-307X/32/4/040501 . .

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