Antibunching Effect of the Excited Two-Parameter Deformed Even and Odd Coherent States

  • The excited odd qs-coherent state aqs+m|α〉qso and excited even qs-coherent state aqs+m|α〉qseare constructed. The q,s, and m dependences of the antibunching effect are numerically studied. It is shown that for smallr , the excited even qs-coherent state aqs+m|α〉qse exhibits strong antibunching effect but the even qs-coherent state |α〉qse exhibits strong bunching effect; When the q (q≤1) is far from 1,as r2 increase, the second-order qs-correlation function exhibits oscillating phenomenon (i.e. alternates between antibunching effect and bunching effect), whose amplitude and period increase as s and q decrease, but are approximately independent of m; When q→1, the second-order qs-correlation function also exhibits oscillating phenomenon, whose amplitude and period not only increase as 5 decreases but also are dependent on m; In general, the second-order qs -correlation function is more sensitive to s than to q.
  • 加载中
  • [1] Haret C.Rosu, Carlos Castro. Phys. Lett., 2000, A264:350-3562 Raychev P P, Roussev R P, Smimov Yu F. J. Phys., 1990, G16:1.137; Iwao S. Prog. Them. Phys, 1990, 83:3633 FANG Xiang-Zheng, RUAN Tu-Nan. High Energy Phys. and Nucl. Phys., 2001, 25 : 212-219 ; 2001, 25:315-321(in Chinese)(方向正, 阮图南.高能物理与核物理, 2000,25:212-219; 2001,25:315-321)4 WANG F B, KUANG L M. Phya. Lett., 1992, A169(4):225-2285 RUANG L M, WANG F B.Phys. Lett., 1993, A173(3):221-2276 ZHU Cong-Xu, WANG Fa-Bo, KUANG Le-Man. Acta Physica Sinica,1994、43(8):1262- 1267(in Chinese)(朱从旭, 王发伯, 匡乐满.物理学报, 1994, 43(8):1262-1267)7 WANG Zhong-Qing. Acts Physics Sinica, 2001, 50 (4): 690-692 ( inChinese)(汪仲清.物理学报, 2001, 50(4):690-692)8 ZHOU Huan-Qiang, HE Jing-Song, ZHANG Xin-Ming. High Energy Phys. and Nucl. Phys., 1995, 19:251-257(in Chinese)(周焕强, 贺劲松, 张新明.高能物理与核物理, 1995, 19:251-257)9 WANG Ji-Suo, SUN Chang-Yong, ZHAO Ming-Jian. Acts Optics Sini-ca, 1997, 17(3):293-297(in Chinese)(王继锁, 孙长勇, 赵铭健.光学学报, 1997, 17(3):293-297)10 WANG Zhong-Qing. High Energy Phys. and Nucl. Phys., 2001, 25(12):1158-1164( in Chinese) (汪仲清.高能物理与核物理, 2001, 25(12):1158-1164)11 Agarwal G S, Tara K. Phys. Rev., 1991, A43(1):492-49712 JIANG Jun-Qin. High Energy Phys. and Nucl. Fhys., 2002, 26(4):331-337(in Chinese) (江俊勤.高能物理与核物理, 2002, 26(4):331-337)13 JIANG Jun-Qin. High Energy Phys. and Nucl. Phys., 2002, 26(8):786-790(in Chinese) (江俊勤.高能物理与核物理, 2002, 26(8):786-790)
  • 加载中

Get Citation
JIANG Jun-Qin. Antibunching Effect of the Excited Two-Parameter Deformed Even and Odd Coherent States[J]. Chinese Physics C, 2003, 27(1): 15-18.
JIANG Jun-Qin. Antibunching Effect of the Excited Two-Parameter Deformed Even and Odd Coherent States[J]. Chinese Physics C, 2003, 27(1): 15-18. shu
Milestone
Received: 2002-03-18
Revised: 1900-01-01
Article Metric

Article Views(4197)
PDF Downloads(658)
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

  1. 本站搜索
  2. 百度学术搜索
  3. 万方数据库搜索
  4. CNKI搜索

Email This Article

Title:
Email:

Antibunching Effect of the Excited Two-Parameter Deformed Even and Odd Coherent States

    Corresponding author: JIANG Jun-Qin,
  • Department of Physics, Guangdong Institute of Education, Guangzhou 510303, China

Abstract: The excited odd qs-coherent state aqs+m|α〉qso and excited even qs-coherent state aqs+m|α〉qseare constructed. The q,s, and m dependences of the antibunching effect are numerically studied. It is shown that for smallr , the excited even qs-coherent state aqs+m|α〉qse exhibits strong antibunching effect but the even qs-coherent state |α〉qse exhibits strong bunching effect; When the q (q≤1) is far from 1,as r2 increase, the second-order qs-correlation function exhibits oscillating phenomenon (i.e. alternates between antibunching effect and bunching effect), whose amplitude and period increase as s and q decrease, but are approximately independent of m; When q→1, the second-order qs-correlation function also exhibits oscillating phenomenon, whose amplitude and period not only increase as 5 decreases but also are dependent on m; In general, the second-order qs -correlation function is more sensitive to s than to q.

    HTML

Reference (1)

目录

/

DownLoad:  Full-Size Img  PowerPoint
Return
Return