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Author ID: luo.shaokai Recent zbMATH articles by "Luo, Shaokai"
Published as: Luo, Shaokai; Luo, Shao-Kai; Luo, Shao Kai; Luo, S. K.; Luo, ShaoKai; Luo, Shaoka
External Links: ORCID
Documents Indexed: 78 Publications since 1989
Co-Authors: 29 Co-Authors with 56 Joint Publications
376 Co-Co-Authors

Publications by Year

Citations contained in zbMATH Open

63 Publications have been cited 529 times in 132 Documents Cited by Year
A new type of non-Noether exact invariants and adiabatic invariants of generalized Hamiltonian systems. Zbl 1312.70012
Jiang, Wenan; Luo, Shaokai
32
2012
Fractional Birkhoffian mechanics. Zbl 1357.70017
Luo, Shao-Kai; Xu, Yan-Li
31
2015
A Lie symmetrical basic integral variable relation and a new conservation law for generalized Hamiltonian systems. Zbl 1356.70024
Luo, Shao-Kai; Li, Zhuang-Jun; Peng, Wang; Li, Lin
29
2013
Birkhoffian formulations of nonholonomic constrained systems. Zbl 0988.70013
Guo, Yongxin; Luo, S. K.; Shang, M.; Mei, F. X.
26
2001
Lie symmetrical perturbation and a new type of non-Noether adiabatic invariants for disturbed generalized Birkhoffian systems. Zbl 1312.70011
Jiang, Wenan; Li, Lin; Li, Zhuangjun; Luo, Shaokai
25
2012
Fractional generalized Hamiltonian mechanics and Poisson conservation law in terms of combined Riesz derivatives. Zbl 1281.70026
Luo, Shaokai; Li, Lin
23
2013
Fractional generalized Hamiltonian mechanics. Zbl 1321.70015
Li, Lin; Luo, Shao-Kai
22
2013
Lie symmetries, symmetrical perturbation and a new adiabatic invariant for disturbed nonholonomic systems. Zbl 1316.70016
Li, Zhuangjun; Jiang, Wenan; Luo, Shaokai
21
2012
Fractional generalized Hamiltonian equations and its integral invariants. Zbl 1281.70025
Luo, Shaokai; Li, Lin
21
2013
A new Lie symmetrical method of finding a conserved quantity for a dynamical system in phase space. Zbl 1307.70015
Luo, Shao-Kai; Li, Zhuang-Jun; Li, Lin
18
2012
Mei symmetry inducing Mei conserved quantity of a generalized Hamiltonian system. Zbl 1249.70031
Jiang, Wen’an; Luo, Shaokai
16
2011
Stability for manifolds of equilibrium states of generalized Hamiltonian systems. Zbl 1293.70059
Jiang, WenAn; Luo, ShaoKai
16
2012
Lie algebraic structure and generalized Poisson conservation law for fractional generalized Hamiltonian systems. Zbl 1302.70046
Luo, Shao-Kai; Li, Lin; Xu, Yan-Li
15
2014
Generalized Noether’s theorem for nonholonomic nonpotential system in noninertial reference frames. Zbl 0755.70016
Luo, Shaokai
14
1991
A new Lie symmetrical method of finding conserved quantity for Birkhoffian systems. Zbl 1268.34047
Li, Zhuangjun; Luo, Shaokai
14
2012
Fractional Lorentz-Dirac model and its dynamical behaviors. Zbl 1327.78011
Luo, Shao-Kai; Xu, Yan-Li
12
2015
Stability for manifolds of equilibrium states of fractional generalized Hamiltonian systems. Zbl 1319.34018
Xu, Yanli; Luo, Shaokai
12
2014
Stability for manifolds of the equilibrium state of fractional Birkhoffian systems. Zbl 1325.70046
He, Jin-Man; Xu, Yan-Li; Luo, Shao-Kai
10
2015
Fractional Nambu dynamics. Zbl 1344.37088
Xu, Yan-Li; Luo, Shao-Kai
9
2015
Lie symmetrical perturbation and adiabatic invariants of generalized Hojman type for relativistic Birkhoffian systems. Zbl 1355.35008
Luo, Shao-Kai; Guo, Yong-Xin
9
2007
A new method of fractional dynamics, i.e., fractional Mei symmetrical method for finding conserved quantity, and its applications to physics. Zbl 1406.70025
Luo, Shao-Kai; Dai, Yun; Zhang, Xiao-Tian; He, Jin-Man
9
2016
Fractional relativistic Yamaleev oscillator model and its dynamical behaviors. Zbl 1394.70051
Luo, Shao-Kai; He, Jin-Man; Xu, Yan-Li; Zhang, Xiao-Tian
8
2016
A new method of dynamical stability, i.e. fractional generalized Hamiltonian method, and its applications. Zbl 1410.70021
Luo, Shao-Kai; He, Jin-Man; Xu, Yan-Li
8
2015
Mei, Noether and Lie symmetries of Hamiltonian systems. Zbl 1202.70077
Luo, Shao Kai
8
2003
Basic theory of fractional Mei symmetrical perturbation and its applications. Zbl 1390.70046
Luo, Shao-Kai; Yang, Ming-Jing; Zhang, Xiao-Tian; Dai, Yun
8
2018
Relativistic variation principles and equation of motion for variable mass controllable mechanical system. Zbl 0891.70017
Luo, Shaokai
7
1996
Form invariance and hojman conserved quantity for nonholonomic mechanical systems. Zbl 1202.70035
Luo, Shao Kai; Guo, Yong Xin; Mei, Feng Xiang
7
2004
The impact of public information on insider trading. Zbl 0968.91011
Luo, S.
6
2001
First integrals and integral invariants of relativistic Birkhoffian systems. Zbl 1167.70324
Luo, Shao-Kai
6
2003
Fractional generalized Hamilton method for equilibrium stability of dynamical systems. Zbl 1346.34013
Luo, Shao-Kai; He, Jin-Man; Xu, Yan-Li; Zhang, Xiao-Tian
6
2016
A form invariance of constrained Birkhoffian system. Zbl 1014.70016
Chen, Xiangwei; Luo, Shaokai; Mei, Fengxiang
6
2002
Mei symmetry, Noether symmetry and Lie symmetry of Hamiltonian canonical equations for a singular system. Zbl 1202.70076
Luo, Shao Kai
6
2004
A general method of fractional dynamics, i.e., fractional Jacobi last multiplier method, and its applications. Zbl 1376.37105
Luo, Shao-Kai; Zhang, Xiao-Tian; He, Jin-Man
5
2017
A new type of fractional Lie symmetrical method and its applications. Zbl 1432.34017
Zhang, Xiao-Tian; He, Jin-Man; Luo, Shao-Kai
5
2017
Stability for manifolds of equilibrium state of generalized Hamiltonian system with additional terms. Zbl 1268.34103
Li, Lin; Peng, Wang; Xu, Yanli; Luo, Shaokai
5
2013
Basic theory of relativistic Birkhoffian dynamics of rotational system. Zbl 1202.70065
Luo, Shao Kai; Fu, Jing Li; Chen, Xiang Wei
5
2001
The theory of relativistic analytical mechanics of the rotational systems. Zbl 0903.70015
Luo, Shaokai
4
1998
Stability theorems for the equilibrium state manifold of nonholonomic systems in a noninertial reference frame. Zbl 0998.70015
Luo, Shaokai; Chen, Xiangwei; Fu, Jingli
4
2001
Mei conserved quantity deduced from Mei symmetry of Appell equation in a dynamical system of relative motion. Zbl 1240.70027
Jia, Liqun; Xie, Yinli; Luo, Shaokai
3
2011
On the families of fractional dynamical models. Zbl 1380.26004
Luo, Shao-Kai; Zhang, Xiao-Tian; He, Jin-Man; Xu, Yan-Li
3
2017
Poincaré-Cartan integral variants and invariants of nonholonomic constrained systems. Zbl 0997.70012
Guo, Y. X.; Shang, M.; Luo, S. K.; Mei, F. X.
3
2001
Algebraic structures and Poisson integrals of relativistic dynamical equations for rotational systems. Zbl 0957.70016
Fu, Jingli; Chen, Xiangwei; Luo, Shaokai
3
1999
Integral theory for the dynamics of nonlinear nonholonomic system in noninertial reference frames. Zbl 0783.70012
Luo, Shaokai
3
1993
Form invariance and Noether symmetrical conserved quantity of relativistic Birkhoffian systems. Zbl 1063.70016
Luo, Shaokai
3
2003
Influence of nonholonomic constraints on variations, symplectic structure, and dynamics of mechanical systems. Zbl 1152.81458
Guo, Yong-Xin; Liu, Shi-Xing; Liu, Chang; Luo, Shao-Kai; Wang, Yong
3
2007
The Appell equations and their form invariance for rotational relativistic systems. Zbl 1202.70102
Luo, Shao Kai
3
2002
Mei symmetry and Mei conserved quantity of Nielsen equations for nonholonomic systems of unilateral non-Chetaev’s type in the event space. Zbl 1189.70065
Jia, Liqun; Zhang, Yaoyu; Luo, Shaokai; Cui, Jinchao
2
2009
The generalized relativistic dynamical equations of a second-order nonholonomic system. Zbl 1056.70502
Luo, Shaokai
2
1989
A new type of non-Noether adiabatic invariants, i.e. adiabatic invariants of Lutzky type, for Lagrangian systems. Zbl 1150.70343
Luo, Shaokai
2
2007
Form invariance and Noether symmetries of rotational relativistic Birkhoff systems. Zbl 1267.70031
Luo, Shao-Kai
2
2002
Study on dynamics of relativistic Birkhoff systems. Zbl 1202.70096
Fu, Jing Li; Chen, Li Qun; Luo, Shao Kai; Chen, Xiang Wei; Wang, Xin Min
2
2001
Noether symmetry and Hojman conserved quantity for nonholonomic mechanical systems. Zbl 1202.70036
Luo, Shao Kai; Guo, Yong Xin; Mei, Feng Xiang
2
2004
Stability of the equilibrium state in relativistic Birkhoff systems. Zbl 1202.70098
Fu, Jing Li; Chen, Li Qun; Xue, Yun; Luo, Shao Kai
2
2002
Lie symmetries and conserved quantities of rotational relativistic systems. Zbl 0972.70018
Fu, Jingli; Chen, Xiangwei; Luo, Shaokai
1
2000
Integration theory of the vakonomic dynamics of nonlinear nonholonomic systems. Zbl 0964.70501
Luo, Shaokai
1
1993
Relativistic generalized Appell equations for variable-mass nonholonomic systems of arbitrary order. Zbl 1056.70503
Luo, Shaokai
1
1990
On covariance and quantum Fisher information. Zbl 1188.81119
Luo, S.
1
2009
First integrals and integral invariants for variable mass nonholonomic system in noninertial reference frames. Zbl 0796.70020
Luo, Shaokai
1
1994
A set of Lie symmetrical conservation law for rotational relativistic Hamiltonian systems. Zbl 1167.70330
Luo, Shao-Kai; Jia, Li-Qun
1
2003
Mei conserved quantities for systems with unilateral non-Chetaev nonholonomic constraints in the event space. Zbl 1150.70350
Jia, Liqun; Luo, Shaokai; Zhang, Yaoyu
1
2007
A non-Noether conserved quantity, i.e. Hojman conserved quantity, for nonholonomic mechanical systems. Zbl 1202.70037
Luo, Shao Kai; Mei, Feng Xiang
1
2004
A unified theory of generalized classical mechanics and nonholonomic mechanics. Zbl 1202.70034
Luo, Shao Kai
1
2002
Basic theory of fractional conformal invariance of Mei symmetry and its applications to physics. Zbl 1391.70054
Luo, Shao-Kai; Dai, Yun; Yang, Ming-Jing; Zhang, Xiao-Tian
1
2018
Basic theory of fractional Mei symmetrical perturbation and its applications. Zbl 1390.70046
Luo, Shao-Kai; Yang, Ming-Jing; Zhang, Xiao-Tian; Dai, Yun
8
2018
Basic theory of fractional conformal invariance of Mei symmetry and its applications to physics. Zbl 1391.70054
Luo, Shao-Kai; Dai, Yun; Yang, Ming-Jing; Zhang, Xiao-Tian
1
2018
A general method of fractional dynamics, i.e., fractional Jacobi last multiplier method, and its applications. Zbl 1376.37105
Luo, Shao-Kai; Zhang, Xiao-Tian; He, Jin-Man
5
2017
A new type of fractional Lie symmetrical method and its applications. Zbl 1432.34017
Zhang, Xiao-Tian; He, Jin-Man; Luo, Shao-Kai
5
2017
On the families of fractional dynamical models. Zbl 1380.26004
Luo, Shao-Kai; Zhang, Xiao-Tian; He, Jin-Man; Xu, Yan-Li
3
2017
A new method of fractional dynamics, i.e., fractional Mei symmetrical method for finding conserved quantity, and its applications to physics. Zbl 1406.70025
Luo, Shao-Kai; Dai, Yun; Zhang, Xiao-Tian; He, Jin-Man
9
2016
Fractional relativistic Yamaleev oscillator model and its dynamical behaviors. Zbl 1394.70051
Luo, Shao-Kai; He, Jin-Man; Xu, Yan-Li; Zhang, Xiao-Tian
8
2016
Fractional generalized Hamilton method for equilibrium stability of dynamical systems. Zbl 1346.34013
Luo, Shao-Kai; He, Jin-Man; Xu, Yan-Li; Zhang, Xiao-Tian
6
2016
Fractional Birkhoffian mechanics. Zbl 1357.70017
Luo, Shao-Kai; Xu, Yan-Li
31
2015
Fractional Lorentz-Dirac model and its dynamical behaviors. Zbl 1327.78011
Luo, Shao-Kai; Xu, Yan-Li
12
2015
Stability for manifolds of the equilibrium state of fractional Birkhoffian systems. Zbl 1325.70046
He, Jin-Man; Xu, Yan-Li; Luo, Shao-Kai
10
2015
Fractional Nambu dynamics. Zbl 1344.37088
Xu, Yan-Li; Luo, Shao-Kai
9
2015
A new method of dynamical stability, i.e. fractional generalized Hamiltonian method, and its applications. Zbl 1410.70021
Luo, Shao-Kai; He, Jin-Man; Xu, Yan-Li
8
2015
Lie algebraic structure and generalized Poisson conservation law for fractional generalized Hamiltonian systems. Zbl 1302.70046
Luo, Shao-Kai; Li, Lin; Xu, Yan-Li
15
2014
Stability for manifolds of equilibrium states of fractional generalized Hamiltonian systems. Zbl 1319.34018
Xu, Yanli; Luo, Shaokai
12
2014
A Lie symmetrical basic integral variable relation and a new conservation law for generalized Hamiltonian systems. Zbl 1356.70024
Luo, Shao-Kai; Li, Zhuang-Jun; Peng, Wang; Li, Lin
29
2013
Fractional generalized Hamiltonian mechanics and Poisson conservation law in terms of combined Riesz derivatives. Zbl 1281.70026
Luo, Shaokai; Li, Lin
23
2013
Fractional generalized Hamiltonian mechanics. Zbl 1321.70015
Li, Lin; Luo, Shao-Kai
22
2013
Fractional generalized Hamiltonian equations and its integral invariants. Zbl 1281.70025
Luo, Shaokai; Li, Lin
21
2013
Stability for manifolds of equilibrium state of generalized Hamiltonian system with additional terms. Zbl 1268.34103
Li, Lin; Peng, Wang; Xu, Yanli; Luo, Shaokai
5
2013
A new type of non-Noether exact invariants and adiabatic invariants of generalized Hamiltonian systems. Zbl 1312.70012
Jiang, Wenan; Luo, Shaokai
32
2012
Lie symmetrical perturbation and a new type of non-Noether adiabatic invariants for disturbed generalized Birkhoffian systems. Zbl 1312.70011
Jiang, Wenan; Li, Lin; Li, Zhuangjun; Luo, Shaokai
25
2012
Lie symmetries, symmetrical perturbation and a new adiabatic invariant for disturbed nonholonomic systems. Zbl 1316.70016
Li, Zhuangjun; Jiang, Wenan; Luo, Shaokai
21
2012
A new Lie symmetrical method of finding a conserved quantity for a dynamical system in phase space. Zbl 1307.70015
Luo, Shao-Kai; Li, Zhuang-Jun; Li, Lin
18
2012
Stability for manifolds of equilibrium states of generalized Hamiltonian systems. Zbl 1293.70059
Jiang, WenAn; Luo, ShaoKai
16
2012
A new Lie symmetrical method of finding conserved quantity for Birkhoffian systems. Zbl 1268.34047
Li, Zhuangjun; Luo, Shaokai
14
2012
Mei symmetry inducing Mei conserved quantity of a generalized Hamiltonian system. Zbl 1249.70031
Jiang, Wen’an; Luo, Shaokai
16
2011
Mei conserved quantity deduced from Mei symmetry of Appell equation in a dynamical system of relative motion. Zbl 1240.70027
Jia, Liqun; Xie, Yinli; Luo, Shaokai
3
2011
Mei symmetry and Mei conserved quantity of Nielsen equations for nonholonomic systems of unilateral non-Chetaev’s type in the event space. Zbl 1189.70065
Jia, Liqun; Zhang, Yaoyu; Luo, Shaokai; Cui, Jinchao
2
2009
On covariance and quantum Fisher information. Zbl 1188.81119
Luo, S.
1
2009
Lie symmetrical perturbation and adiabatic invariants of generalized Hojman type for relativistic Birkhoffian systems. Zbl 1355.35008
Luo, Shao-Kai; Guo, Yong-Xin
9
2007
Influence of nonholonomic constraints on variations, symplectic structure, and dynamics of mechanical systems. Zbl 1152.81458
Guo, Yong-Xin; Liu, Shi-Xing; Liu, Chang; Luo, Shao-Kai; Wang, Yong
3
2007
A new type of non-Noether adiabatic invariants, i.e. adiabatic invariants of Lutzky type, for Lagrangian systems. Zbl 1150.70343
Luo, Shaokai
2
2007
Mei conserved quantities for systems with unilateral non-Chetaev nonholonomic constraints in the event space. Zbl 1150.70350
Jia, Liqun; Luo, Shaokai; Zhang, Yaoyu
1
2007
Form invariance and hojman conserved quantity for nonholonomic mechanical systems. Zbl 1202.70035
Luo, Shao Kai; Guo, Yong Xin; Mei, Feng Xiang
7
2004
Mei symmetry, Noether symmetry and Lie symmetry of Hamiltonian canonical equations for a singular system. Zbl 1202.70076
Luo, Shao Kai
6
2004
Noether symmetry and Hojman conserved quantity for nonholonomic mechanical systems. Zbl 1202.70036
Luo, Shao Kai; Guo, Yong Xin; Mei, Feng Xiang
2
2004
A non-Noether conserved quantity, i.e. Hojman conserved quantity, for nonholonomic mechanical systems. Zbl 1202.70037
Luo, Shao Kai; Mei, Feng Xiang
1
2004
Mei, Noether and Lie symmetries of Hamiltonian systems. Zbl 1202.70077
Luo, Shao Kai
8
2003
First integrals and integral invariants of relativistic Birkhoffian systems. Zbl 1167.70324
Luo, Shao-Kai
6
2003
Form invariance and Noether symmetrical conserved quantity of relativistic Birkhoffian systems. Zbl 1063.70016
Luo, Shaokai
3
2003
A set of Lie symmetrical conservation law for rotational relativistic Hamiltonian systems. Zbl 1167.70330
Luo, Shao-Kai; Jia, Li-Qun
1
2003
A form invariance of constrained Birkhoffian system. Zbl 1014.70016
Chen, Xiangwei; Luo, Shaokai; Mei, Fengxiang
6
2002
The Appell equations and their form invariance for rotational relativistic systems. Zbl 1202.70102
Luo, Shao Kai
3
2002
Form invariance and Noether symmetries of rotational relativistic Birkhoff systems. Zbl 1267.70031
Luo, Shao-Kai
2
2002
Stability of the equilibrium state in relativistic Birkhoff systems. Zbl 1202.70098
Fu, Jing Li; Chen, Li Qun; Xue, Yun; Luo, Shao Kai
2
2002
A unified theory of generalized classical mechanics and nonholonomic mechanics. Zbl 1202.70034
Luo, Shao Kai
1
2002
Birkhoffian formulations of nonholonomic constrained systems. Zbl 0988.70013
Guo, Yongxin; Luo, S. K.; Shang, M.; Mei, F. X.
26
2001
The impact of public information on insider trading. Zbl 0968.91011
Luo, S.
6
2001
Basic theory of relativistic Birkhoffian dynamics of rotational system. Zbl 1202.70065
Luo, Shao Kai; Fu, Jing Li; Chen, Xiang Wei
5
2001
Stability theorems for the equilibrium state manifold of nonholonomic systems in a noninertial reference frame. Zbl 0998.70015
Luo, Shaokai; Chen, Xiangwei; Fu, Jingli
4
2001
Poincaré-Cartan integral variants and invariants of nonholonomic constrained systems. Zbl 0997.70012
Guo, Y. X.; Shang, M.; Luo, S. K.; Mei, F. X.
3
2001
Study on dynamics of relativistic Birkhoff systems. Zbl 1202.70096
Fu, Jing Li; Chen, Li Qun; Luo, Shao Kai; Chen, Xiang Wei; Wang, Xin Min
2
2001
Lie symmetries and conserved quantities of rotational relativistic systems. Zbl 0972.70018
Fu, Jingli; Chen, Xiangwei; Luo, Shaokai
1
2000
Algebraic structures and Poisson integrals of relativistic dynamical equations for rotational systems. Zbl 0957.70016
Fu, Jingli; Chen, Xiangwei; Luo, Shaokai
3
1999
The theory of relativistic analytical mechanics of the rotational systems. Zbl 0903.70015
Luo, Shaokai
4
1998
Relativistic variation principles and equation of motion for variable mass controllable mechanical system. Zbl 0891.70017
Luo, Shaokai
7
1996
First integrals and integral invariants for variable mass nonholonomic system in noninertial reference frames. Zbl 0796.70020
Luo, Shaokai
1
1994
Integral theory for the dynamics of nonlinear nonholonomic system in noninertial reference frames. Zbl 0783.70012
Luo, Shaokai
3
1993
Integration theory of the vakonomic dynamics of nonlinear nonholonomic systems. Zbl 0964.70501
Luo, Shaokai
1
1993
Generalized Noether’s theorem for nonholonomic nonpotential system in noninertial reference frames. Zbl 0755.70016
Luo, Shaokai
14
1991
Relativistic generalized Appell equations for variable-mass nonholonomic systems of arbitrary order. Zbl 1056.70503
Luo, Shaokai
1
1990
The generalized relativistic dynamical equations of a second-order nonholonomic system. Zbl 1056.70502
Luo, Shaokai
2
1989
all top 5

Cited by 135 Authors

38 Luo, Shaokai
31 Zhang, Yi
10 Guo, Yongxin
10 Xu, Yanli
9 He, Jinman
9 Mei, Fengxiang
8 Li, Lin
7 Jiang, Wen’an
7 Zhang, Xiaotian
6 Jia, Liqun
6 Song, Chuanjing
6 Wu, Huibin
6 Zhai, Xianghua
5 Li, Zhuangjun
5 Liu, Chang
4 Chen, Xiangwei
4 Fu, Jingli
4 Han, Yuelin
4 Kong, Xinlei
4 Liu, Shixing
4 Xia, Lili
3 Cai, Jianle
3 Dai, Yun
3 Fang, Jianhui
3 Tian, Xue
3 Wang, Xiaoxiao
3 Wang, Yong
3 Zhang, Meiling
3 Zhang, Yaoyu
2 Bai, Long
2 Chen, Haibo
2 Chen, Ju
2 Čović, Vukman M.
2 Huang, Weili
2 Jin, Shixin
2 Liu, Kun
2 Liu, Shuang
2 Obradović, Aleksandar
2 Peng, Wang
2 Wang, Peng
2 Wu, Fengjiao
2 Xue, Xichang
2 Yang, Ming-Jing
2 Zhang, Fang
2 Zhang, Hongbin
2 Zhang, Linjie
1 Ansari, Alireza
1 Bai, Shuting
1 Bi, Qinsheng
1 Boumali, Abdelmalek
1 Casetta, Leonardo
1 Chaikhan, P.
1 Chang, Peng
1 Chee, G. Y.
1 Chen, Fangqi
1 Chen, Jinyue
1 Chen, Junhua
1 Chen, Liqun
1 Chen, Man
1 Chen, Pei-Sheng
1 Chen, Xing
1 Cheng, Wenchao
1 Ding, Juanjuan
1 Ding, Junling
1 El-Nabulsi, Rami Ahmad
1 Eshaghi, Shiva
1 Fan, Hong-Yi
1 Fang, Gang
1 Feroze, Tooba
1 Frank, Till Daniel
1 Ghaziani, Reza Khoshsiar
1 Han, Sen
1 Hassanabadi, Hassan
1 He, Minjia
1 Jia, Qiuli
1 Jiang, Shun
1 Korichi, Nabil
1 Li, Chaoqun
1 Li, Haibin
1 Li, Jianxiong
1 Li, Jun
1 Li, Renjie
1 Li, Shuo
1 Li, Wei
1 Li, Yanmin
1 Li, Yongfa
1 Lin, Zhenjun
1 Long, Zixuan
1 Low, Sen-Yue
1 Lu, Kai
1 Luan, Xiwu
1 Luo, Yiping
1 Mongkolsakulvong, S.
1 Niu, Ben
1 Peng, Keke
1 Popescu, Marcela
1 Popescu, Paul P.
1 Qiao, Yongfen
1 Qiu, Zhiping
1 Rehman, Haseeb Ur
...and 35 more Authors

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