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[1] Feng Guolin, Dong Wenjie, Jia Xiaojing, et al. On the dynamics behavour and instability evolution of
air-sea oscialltor. Chin Phys Soc, 2002, 51(6): 1181-1185
[2] Liu Shikao, Fu Zuntao, Liu shida, et al. New periodic solutions to a kind of nonlinear wave equations.
Chin Phys Soc, 2002, 51(1): 10-14
[3] Feng Guolin, Dai Xingang, Wang Aihui, et al., On numerical predictability in the chaos system. Chin
Phys Soc, 2001, 50(4): 606-611
[4] Wang C, Weisberg R H, Virmani J I. Western Pacific interannual variability associated with the EI Ni˜nosouthern
oscillation. J Geophys Res, 1999, 104: 5131-5149
[5] Wang C. On the ENSO Mechanisms. Advances in Atmospheric Sciences, 2001, 18(5): 674-691
[6] Jin F F. An equatorial ocean recharge paradigm for ENSO. Part I: Conceptual model. J Atmos Sci, 1997,
54: 811-829
[7] Lin Wantao, Ji Zhongzhen, Wang Bin, Yang Xiaozhong. A new method for judging the computational
stability of the difference schemes of non-linear evolution equations. Chinese Science Bulletin, 2000, 45(15):
1358-1361
[8] Lin Wantao, Ji Zhongzhen, Li Shuanglin, et al. A comparative analysis of the computational stability for
the difference schemes of linear and non-linear evolution equations. Progress in Natural Sci, 2000, 10(10):
936-940
[9] Lin Wantao, Ji Zhongzhen, Wang Bin. A comparative analysis of computational stability for linear and
non-linear evolution equations. Advances in Atmospheric Sciences, 2002, 19(4): 699-704
[10] Hamouda M. Interior layer for second-order singular equations. Applicable Anal, 2002, 81: 837-866
[11] Bell D C, Deng B. Singular perturbation of N-front traveling waves in the Fitzhugh-Nagumo equations.
Nonlinear Anal Real World Appl, 2003, 3(4): 515-541
[12] Adams K L, King J R, Tew R H. Beyond-all-orders effects in multiple-scales symptotic: Travelling-wave
solutions to the Kuramoto-Sivashinsky equation. J Engineering Math, 2003, 45: 197-226
[13] Mo Jiaqi, Shao S. The singularly perturbed boundary value problems for higher-order semilinear elliptic
equations. Advances in Math, 2001, 30(2): 141-148
[14]Mo Jiaqi, Han Xianglin, Chen Songlin. The singularly perturbed nonlocal reaction diffusion system. Acta
Math Sci, 2002, 22B(4): 549-556
[15] Mo Jiaqi, Zhu Jiang, Wang Hui. Asymptotic behavior of the shock solution for a class of nonlinear
equations. Progress in Natural Sci, 2003, 13(10): 768-770
[16] Mo Jiaqi, Han Xianglin. Asymptotic shock solution for a nonlinear equation. Acta Math Sci, 2004,
24A(2): 164-167
[17] Mo Jiaqi. A class of shock solution for nonlinear equations. Acta Math Sci, 2003, 23A(5): 530-534
[18] Mo Jiaqi. The nonlinear singularly perturbed problems for reaction diffusion equations. Acta Math Sci,
2003, 23A(3): 374-378
[19] Mo Jiaqi. A class of nonlinear singularly perturbed problems for reaction diffusion equations. Acta Math
Sci, 2003, 23B(3): 377-385
[20] Mo Jiaqi, Feng Maochun. The nonlinear singularly perturbed problems for reaction diffusion equations
with time delay. Acta Math Sci, 2001, 21B(3): 254-258
[21] Mo Jiaqi, Ouyang Cheng. A class of nonlocal boundary value problems of nonlinear elliptic systems in
unbounded domains. Acta Math Sci, 2001, 21B(1): 93-97
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