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Preface with a biography of Professor Jiaqi Mo. (English) Zbl 1398.00088
From the text: During June 24th to 28th, 2016, Chinese Society of Singular Perturbation, of Chinese Mathematical Society, organized “The 2016 International Conference on Singular Perturbation Theory and its Applications (ICSPTA)”, which was taken place at Hefei University, Hefei, Anhui Province, P. R. China.
This issue in Qualitative Theory of Dynamical Systems collects the papers for this conference on singular perturbation theory, its applications and other relative fields, which celebrate the 80th birthday of Professor Jiaqi Mo.
MSC:
00B25 Proceedings of conferences of miscellaneous specific interest
00B30 Festschriften
34-06 Proceedings, conferences, collections, etc. pertaining to ordinary differential equations
Biographic References:
Mo, Jiaqi
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[1] Han, X; Shi, L; Mo, J, Generalized solution of nonlinear nonlocal singularly perturbed problems with two parameters, Adv. Math. (Beijing), 45, 95-101, (2016) · Zbl 1363.35020
[2] Chen, L; Mo, J, Positive solution of singularly perturbed Dirichlet problem with singularities, Acta Math. Appl. Sin. Engl. Ser., 30, 611-616, (2014) · Zbl 1311.34130
[3] Mo, J, Singularly perturbed solution of boundary value problem for nonlinear equations of fourth order with parameters, Adv. Math. (Beijing), 39, 736-740, (2010)
[4] Mo, J, Asymptotic property of solutions for a class of nonlinear singularly perturbed boundary value problem with two parameters, Adv. Math. (Beijing), 39, 217-223, (2010)
[5] Mo, J, Asymptotic property of a semi-linear singularly perturbed problem with two parameters, Acta Math. Appl. Sin., 32, 903-911, (2009) · Zbl 1212.34157
[6] Mo, J, A class of shock solution for quasilinear Robin problems, Acta Math. Sci., 28A, 818-822, (2008) · Zbl 1174.34344
[7] Mo, J; Zhu, J; Wang, H, Asymptotic behavior of the shock solution for a class of nonlinear equations, Progress Nat. Sci., 13, 768-770, (2003) · Zbl 1094.34534
[8] Mo, J, The singularly perturbed nonlinear boundary value problems, Appl. Math. J. Chin. Univ., 15, 377-382, (2000) · Zbl 0971.34038
[9] Mo, J, A singularly perturbed nonlinear boundary value problem, J. Math. Anal. Appl., 178, 289-293, (1993) · Zbl 0783.34044
[10] Mo, J, Analytic solution for a class of generalized sine-Gordon perturbation equation, Acta Phys. Sin., 58, 2930-2933, (2009) · Zbl 1212.35397
[11] Mo, J, Variational iteration solving method for a class of generalized Boussinesq equation, Chin. Phys. Lett., 26, 060202, (2009)
[12] Mo, J; Chen, Y, Approximate solution of homotopic mapping for generalized Boussinesq equation, Acta Phys. Sin., 58, 4379-4382, (2009) · Zbl 1212.35398
[13] Mo, J, A class of singularly perturbed reaction differential integral differential system, Acta Math. Appl. Sin., 15, 18-23, (1999) · Zbl 0939.35017
[14] Mo, J, Homotope method of solutions on gain fluence of a laser pulse amplifier, Sci. China Ser. G, 39, 658-661, (2009)
[15] Mo, J, Homotopic mapping solving method for gain fluency of a laser pulse amplifier, Sci. China Ser. G, 52, 1007-1010, (2009)
[16] Yao, J; Mo, J, The interior and boundary layers solution for reaction diffusion equations, Adv. Math. (Beijing), 42, 159-164, (2013) · Zbl 1299.35030
[17] Wen, Z; Mo, J, Singular perturbation for reaction diffusion equations of activator inhibitor systems, Adv. Math. (Beijing), 41, 455-462, (2012) · Zbl 1274.35018
[18] Mo, J, A class of singularly perturbed differential-difference reaction diffusion equation, Adv. Math. (Beijing), 38, 227-231, (2009)
[19] Mo, J, Nonlinear singularly perturbed reaction diffusion problems with ulter parabolic climiting equations, Adv. Math. (Beijing), 37, 83-91, (2008)
[20] Mo, J; Chen, X, The nonlinear singularly perturbed nonlocal reaction diffusion systems, Acta Math. Appl. Sin., 24, 553-562, (2008) · Zbl 1156.35310
[21] Mo, J, Singurlar perturbation of weaken nonlinear reaction diffusion equations with boundary perturbation, Appl. Math. Mech., 29, 1003-1008, (2008) · Zbl 1148.35301
[22] Mo, J; Zhang, W; Chen, X, Asymptotic behavior for a class of nonlinear reaction diffusion system with jump layer, Adv. Math. (Beijing), 36, 631-636, (2007)
[23] Mo, J; Zhang, W; He, M, Asymptotic method of traveling wave solutions for a class of nonlinear reaction diffusion equation, Acta Math. Sin., 27B, 777-780, (2007) · Zbl 1150.35008
[24] Mo, J; Han, X; Chen, S, The singularly perturbed nonlocal reaction diffusion system, Acta Math. Sci., 22B, 549-556, (2002) · Zbl 1013.35003
[25] Mo, J, The singularly perturbed problem for combustion reaction diffusion, Acta Math. Appl. Sin., 17, 255-259, (2001) · Zbl 0989.34008
[26] Mo, J, A class of singularly perturbed problems with nonlocal reaction diffusion equation, Adv. Math. (Beijing), 27, 53-58, (1998) · Zbl 1054.35501
[27] Mo, J; Xu, Y, A class of singularly perturbed nonlinear reaction diffusion integral-differential system, Acta Math. Appl. Sin., 17, 278-286, (1994)
[28] Mo, J, Singular perturbation of initial-boundary value problems for a class of reaction diffusion systemsm, Appl. Math. Mech., 12, 399-408, (1991) · Zbl 0758.35045
[29] Mo, J, Singular perturbation for a class of nonlinear reaction diffusion systems, Sci. China Ser. A, 32, 1306-1315, (1989) · Zbl 0709.35060
[30] Mo, J, Generalized iterative solutions of a class of nonlinear perturbed evolution equations, Acta Phys. Sin., 60, 020202, (2011) · Zbl 1240.35093
[31] Lin, S; Mo, J, Asymptotic solutions of a class of nonlinear hyperparabolic equations, Adv. Math. (Beijing), 39, 472-476, (2010)
[32] Han, X; Wang, W; Mo, J, Solution of singularly perturbed boundary value problem for nonlinear higher order elliptic partial differential equations with two parameters, Adv. Math. (Beijing), 44, 931-938, (2015) · Zbl 1349.35100
[33] Mo, J, Asymptotic solutions of singularly perturbed semi-linear elliptic equations with double parameters, Chin. Ann. Math., 31A, 331-336, (2010) · Zbl 1240.35179
[34] Mo, J; Zhang, W; Chen, X, Solvability for nonlinear elliptic equation with boundary perturbation, Appl. Math. J. Chin. Univ., 22B, 421-424, (2007) · Zbl 1150.35397
[35] Mo, J; Shao, S, The singularly perturbed boundary value problems for higher-order semilinear elliptic equations, Adv. Math. (Beijing), 30, 141-148, (2001) · Zbl 0985.35024
[36] Mo, J, The nonlocal boundary value problems of nonlinear elliptic systems in unbounded domains, Appl. Math. Comput., 86, 115-121, (1997) · Zbl 0904.35025
[37] Mo, J; Cheng, Y, The singular perturbation for a class of similinear elliptic equations, Acta Math. Sci., 12, 52-54, (1992)
[38] Mo, J; Yao, J; Wang, H, The nonlinear species group singularle perturbed Robin problems for reaction diffusion system, J. Biomath. (Anshan), 22, 193-199, (2007) · Zbl 1142.35328
[39] Mo, J; Wang, H, Nonlinear singular perturbed approximate solution for generalized lotke-Volterra ecological model, Acta Ecol. Sin., 27, 4366-4370, (2007)
[40] Mo, J; Lin, W; Wang, H, A class of homotopic solving method for ENSO model, Acta Math. Sin., 29, 101-110, (2009) · Zbl 1199.86009
[41] Liu, S; Lin, Y; Wang, H; Mo, J, Perturbed solution of sea-air oscillator for the el niño/la nina-southern oscillation mechanism, Acta Oceanol. Sin., 28, 1-4, (2009)
[42] Mo, J; Lin, W, The homotopic method of travelling wave solution for el niño tropic sea-air coupled oscillators, Chin. Phys., 17, 743-746, (2008)
[43] Mo, J; Lin, W; Wang, H, A perturbed solution of sea-air oscillator for the ENSO mechanism, J. Syst. Sci. Complex., 18, 219-223, (2005) · Zbl 1101.86001
[44] Mo, J; Lin, W; Zhu, J, The perturbed solution of sea-air oscillator for ENSO model, Progress Nat. Sci., 14, 550-552, (2004) · Zbl 1161.86306
[45] Mo, J; Lin, W, Singularly perturbed solution in atmosphere-Ocean for global climate, Chin. Geogr. Sci., 18, 193-196, (2008)
[46] Mo, J; Lin, W; Wang, H, Variational iteration method for solving perturbed mechanism of western boundary undercurrents in the Pacific, Chin. Phys., 16, 951-955, (2007)
[47] Mo, J; Lin, W; Wang, H, Variational iteration solution of a sea-air oscillator model for the ENSO, Progress Nat. Sci., 17, 230-232, (2007) · Zbl 1149.86005
[48] Mo, J; Lin, W, Homotopic mapping method of solution for the sea-air oscillator model of decadal variations in subtropical cells and equatorial Pacific, Acta Phys. Sin., 56, 5565-5568, (2007)
[49] Mo, J; Wang, H; Lin, W, Homptopic mapping solving method for perturbed mechanism of western boundary undercurrents in equator Pacific, Chin. Geogr. Sci., 16, 347-350, (2006)
[50] Ouyang, C; Shi, L; Wang, W; Mo, J, The asymptotic solving method of solitary wave for the nonlinear forced disturbed Klein-Gordon equation, Chin. Ann. Math. Ser. A, 38, 43-52, (2017) · Zbl 1389.35282
[51] Mo, J, Solution of travelling wave for nonlinear disturbed long-wave system, Commun. Theor. Phys., 55, 387-390, (2011) · Zbl 1264.37043
[52] Mo, J, Soliton solution to generalized nonlinear disturbed Klein-Gordon equation, Appl. Math. Mech., 31, 1577-1584, (2010) · Zbl 1207.35090
[53] Mo, J; Yao, J, Approximate solution of 2-soliton for generalized disturbed mkdv coupled system, Acta Phys. Sin., 59, 5190-5193, (2010) · Zbl 1240.35475
[54] Mo, J, Approximation of the soliton solution for generalized Vakhnenko equation, Chin. Phys., 18, 4608-4612, (2009)
[55] Mo, J; Zhang, W; He, M, The variational iteration method for the soliton solution of nonlinear generalized Landau-Ginzburg-Higgs equation, Acta Phys. Sin., 56, 1847-1850, (2007) · Zbl 1150.35533
[56] Mo, J; Lin, Y; Lin, W, Homotopic mapping solving method of the reduces equation for Kelvin waves, Chin. Phys., 19, 030202-1-4, (2010)
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