Generalized Wigner Functions for Damped Systems in Deformation Quantization
Generalized Wigner Functions for Damped Systems in Deformation Quantization
基金
The project supported by National Natural Science Foundation of China under Grant Nos. 10375056 and 10675106
关键词
维格纳函数
阻尼系统
量子化
物理分析
Wigner function, damped system, deformation quantization
参考文献14
-
1E.Wigner,Phys.Rev.40 (1932) 749.
-
2D.Fairlie and C.Manogue,J.Phys.A:Math.Gen.24 (1991) 3807.
-
3C.Zachos,hep-th/0110114 v3.
-
4F.Bayen,M.Flato,C.Fronsdal,A.Lichnerrowicz,and D.Sternheimei,Ann.Phys.(NY) 111 (1978) 61.
-
5F.Bayen,M.Flato,C.Fronsdal,A.Lichnerrowicz,and D.Sternheimei,Ann.Phys.(NY) 111 (1978) 111.
-
6T.Curtright,D.Fairlie,and C.Zachos,Phys.Rev.D 58 (1998) 025002.
-
7A.Kossakowski,Open Sys.Information Dyn.9 (2001) 1.
-
8D.Chru(s)ci(n)ski,math-ph/0206009.
-
9Reports on Math.Phys.57 (2006) 319.
-
10D.Chru(s)ci(n)ski,math-ph/0209008.
-
1叶永华,高坚.Wigner function of coherent state of N components[J].Chinese Physics B,2007,16(6):1554-1558. 被引量:2
-
2衡太骅,李平,井思聪.Modified Form of Wigner Functions for Non-Hamiltonian Systems[J].Chinese Physics Letters,2007,24(3):592-595. 被引量:2
-
3ZHANG Xiao.Deformation quantization and noncommutative black holes[J].Science China Mathematics,2011,54(11):2501-2508. 被引量:1
-
4张倬,孙金祚.结构参数对三量子阱超晶格单元结构伏安特性的影响[J].聊城大学学报(自然科学版),2006,19(2):36-39.
-
5张克福,王中结.增光子圆态及其性质[J].光学学报,2008,28(5):992-996. 被引量:3
-
6张晓燕.非简谐振子Klauder-Perelomov相干态的维格纳函数[J].吉林师范大学学报(自然科学版),2012,33(1):24-26.
-
7蓝海江,侯邦品.增、减光子压缩真空态的维格纳函数及其非经典特性[J].四川师范大学学报(自然科学版),2011,34(1):80-85. 被引量:2
-
8张智明.A Simple Scheme for Directly Measuring the Wigner Functions of Cavity Fields[J].Chinese Physics Letters,2003,20(2):227-229.
-
9庞华锋,杨庆怡.增光子相干态光场与二能级原子相互作用中的含时维格纳函数[J].广西科学院学报,2008,24(3):186-188.
-
10解惠青,戴华.Derivatives of repeated eigenvalues and corresponding eigenvectors of damped systems[J].Applied Mathematics and Mechanics(English Edition),2007,28(6):837-845. 被引量:1