Compute the Real Orthogonal Form of [n—1,1] Representation of S<SUB>n</SUB> Group in a Special Representation Space

LIU Da-Qing

Chinese Physics C> 2007, Vol. 31> Issue(12) : 1099-1101

Compute the Real Orthogonal Form of [n—1,1] Representation of S_n Group in a Special Representation Space

LIU Da-Qing ^,

School of Science, Xi'an Jiaotong University, Xi'an 710049, China

Abstract
HTML
Reference
Related

PDF

Abstract：
We show how to obtain the real orthogonal form of [n—1, 1] representation of S_n group by using a trick, representing S_n group in a special representation space. At last, we exemplify one of the applications of the trick.

References

[1]

. MA Zhong-Qi. Group Theory in Physics. Beijing: SciencePress, 2006. 203-243 (in Chinese)(马中骥. 物理学中的群论. 北京: 科学出版社, 2006. 203-243)2. HAN Qi-Zhi, SUN Hong-Zhou. Group Theory. Beijing:Peiking University Publishers, 1987. 56-62(in Chinese)(韩其智, 孙洪洲. 群论. 北京: 北京大学出版社, 1987. 56-62)3. CHEN Jin-Quan, GAO Mei-Juan. Reduced Coeffcients of Permutation Groups and Their Application. Beijing: Sci-ence Press, 1981. 1-5 (in Chinese)(陈金全, 高美娟. 置换群约化系数及其应用. 北京: 科学出版社, 1981. 1-5)4. CHEN Jin-Quan. New Approach to Group Representation Theory. Shanghai: Shanghai Scienti c and Technique Publishers, 1984. 101-133(in Chinese)(陈金全. 群表示论的新途径. 上海: 上海科技出版社, 1984. 101-133)

[1]	CHEN Shi-Bin , ZHANG Yi-Men , CHEN Yu-Sheng , HUANG Liu-Xing , ZHANG Yu-Ming . Simulation of Energy Deposition of Protons and 1MeV Neutrons in Silicon. Chinese Physics C, 2001, 25(4): 365-370.
[2]	JIANG JunQin , LI JieMing . Improved Scheme of the Lattice Hamiltonian in 1+1 Dimensional QCD. Chinese Physics C, 2000, 24(3): 208-212.
[3]	Jiang Junqin , Luo Xiangqian , Guo Shuohong , Liu Jinming . Calculation of the Vacuum Wave Function in 2+1 Dimensional U(1) Gauge Theory by Using the Improved Lattice Hamiltonian. Chinese Physics C, 1999, 23(12): 1152-1157.
[4]	Jiang Junqin , Luo Xiangqian . Calculation of the Vector Meson Mass in 1+1 Dimensional Lattice QCD by Using the Improved Hamiltonian. Chinese Physics C, 1999, 23(7): 644-649.
[5]	Hui Ping . Fifth Order Approximate Analytic Calculation of (2+1)-D SU(2) Vacuum Wavefunction. Chinese Physics C, 1998, 22(4): 322-325.
[6]	Hui Ping , Chen Qizhou . Fourth Order Approximate Analytic Calculation of (2+1)-D SU(2) Vacuum Wavefunction. Chinese Physics C, 1995, 19(9): 820-825.
[7]	Li Yuxiao , Shi Wanzhong , Liu Li . Non-contractable Loops and Sphalerons in 1+1-dimension U(1) Higgs Model. Chinese Physics C, 1994, 18(11): 1003-1011.
[8]	Chen Qizhou , Li Zhibing , Li Lei , Guo Shuohong . Infrared Vacuum Wavefunction of (2+1)-Dimensional SU(2) Gauge Field. Chinese Physics C, 1994, 18(1): 37-42.
[9]	ZHENG Xi-Te , REN Xue-Zao . Calculation on U(1) Lattice Gauge Theory at Finite Temperature. Chinese Physics C, 1993, 17(2): 134-139.
[10]	Zheng Bo , Guo Shuohong . Exact Solution for a 1 + 1 Dimensional Lattice U (1) Gauge Model. Chinese Physics C, 1990, 14(S2): 163-167.
[11]	Zheng Bo , Guo Shuohong . A Solvable 1 + 1 Dimensional U(l) gauge model. Chinese Physics C, 1990, 14(S1): 65-69.
[12]	ZHENG Bo , GUO Shuo-Hong . A SOLVABLE (1+1)-DIMENSIONAL LATTICE U(1) GAUGE MODEL. Chinese Physics C, 1990, 14(3): 282-285.
[13]	ZHENG Bo , GUO Shuo-Hong . A SOLVABLE 1+1-DIMENSIONAL U(1) GAUGE THEORY. Chinese Physics C, 1990, 14(2): 152-155.
[14]	LUO Xiang-Qian , CHEN Qi-Zhou , GUO Shuo-Hong . VACUUM OF 2+1 DIMENSIONAL SU(2) LGT WITH FERMIONS AND SPONTANEOUS CHIRAL SYMMETRY BREAKING. Chinese Physics C, 1989, 13(4): 328-333.
[15]	ZHENG Wei-Hong , GUO Shuo-Hong . THE VARIATIONAL CALCULATION OF MASS GAP IN 2+1 DIMENSIONAL SU(2) LGT. Chinese Physics C, 1989, 13(1): 83-86.
[16]	LI Zhi-Bing , ZHENG Wei-Hong , GUO Shuo-Hong . THE MC CALCULATION OF MASS GAP IN 2+1 DIMENSIONAL SU(2) LATTICE GAUGE THEORY. Chinese Physics C, 1989, 13(4): 316-319.
[17]	LIU Jin-Ming , ZHENG Wei-Hong , GUO Shuo-Hong . THE MASS GAP IN 2+1 DIMENSIONAL SU(3) LATTICE CAUGE THEORY. Chinese Physics C, 1988, 12(3): 420-424.
[18]	SONG Xiao-Tong , CHING Cheng-Rui , HO Tso-Hsiu . APPROXIMATE B.S. WAVE FUNCTIONS FOR AN ELECTROMAGNETIC BOUND SYSTEM OF SPINS (1/2, 1/2) OR (1/2, 1/2) WITH UNEQUAL MASSES. Chinese Physics C, 1984, 8(5): 531-538.
[19]	WAN Wu-Yi , LIU Rong-Guang , LIU Jie , LI Ru-Bai , DU Yun-He , ZHOU Jie , XIE Pei-Pei , DONG Xue-Sheng . 1m×1m LARGE SCALE DRIFT CHAMBER. Chinese Physics C, 1983, 7(2): 269-272.
[20]	LIAO JI-ZHI . SHELL MODEL CALCULATIONS ON 1f_7/2 NUCLEI. Chinese Physics C, 1979, 3(6): 734-748.

Access

Get Citation

LIU Da-Qing. Compute the Real Orthogonal Form of [n—1,1] Representation of S_n Group in a Special Representation Space[J]. Chinese Physics C, 2007, 31(12): 1099-1101.

LIU Da-Qing. Compute the Real Orthogonal Form of [n—1,1] Representation of S_n Group in a Special Representation Space[J]. Chinese Physics C, 2007, 31(12): 1099-1101. shu

RIS(for EndNote,Reference Manager,ProCite)

BibTex

Txt

Milestone

Received: 2007-02-05
Revised: 2007-04-05

Article Metric

Article Views(3871)
PDF Downloads(701)
Cited by(0)

Policy on re-use

To reuse of subscription content published by CPC, the users need to request permission from CPC, unless the content was published under an Open Access license which automatically permits that type of reuse.

通讯作者: 陈斌, bchen63@163.com

1.
沈阳化工大学材料科学与工程学院沈阳 110142

Compute the Real Orthogonal Form of [n—1,1] Representation of S_n Group in a Special Representation Space

LIU Da-Qing ^,

Corresponding author: LIU Da-Qing,

School of Science, Xi'an Jiaotong University, Xi'an 710049, China

Received Date: 2007-02-05
Accepted Date: 2007-04-05
Available Online: 2007-12-05

Abstract: We show how to obtain the real orthogonal form of [n—1, 1] representation of S_n group by using a trick, representing S_n group in a special representation space. At last, we exemplify one of the applications of the trick.

HTML

Reference (1)

Link: IOPScience; SCOAP³; arXiv; Chinese Physical Society

Journal information: Introduction; Editorial Board; Others; Subscribe

Contact us: QQ: 1307685413; Tel: +86-010-88235947; Fax: +86-010-88233126; E-mail: cpc@ihep.ac.cn

CPC Website
IOP Website
CPC WeChat

Supported by: Beijing Renhe Information Technology Co. Ltd E-mail: info@rhhz.net

DownLoad: Full-Size Img PowerPoint

Return

Compute the Real Orthogonal Form of [n—1,1] Representation of S_n Group in a Special Representation Space

Abstract：

References

Access

Article Metrics

Metrics

通讯作者: 陈斌, bchen63@163.com

Email This Article

Compute the Real Orthogonal Form of [n—1,1] Representation of S_n Group in a Special Representation Space

Corresponding author: LIU Da-Qing,

HTML

目录

Compute the Real Orthogonal Form of [n—1,1] Representation of Sn Group in a Special Representation Space

Abstract：

References

Access

Article Metrics

Metrics

通讯作者: 陈斌, bchen63@163.com

Email This Article

Compute the Real Orthogonal Form of [n—1,1] Representation of Sn Group in a Special Representation Space

Corresponding author: LIU Da-Qing,

HTML

目录

Compute the Real Orthogonal Form of [n—1,1] Representation of S_n Group in a Special Representation Space

Compute the Real Orthogonal Form of [n—1,1] Representation of S_n Group in a Special Representation Space