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[1]Guofeng Che, Haibo Chen.Existence and asymptotic behavior of positive ground state solutions for coupled nonlinear fractional Kirchhoff-type systems:Computers & Mathematics with Applications:77(1),2019,173-188
[2]Hongxia Shi, Haibo Chen.Multiple positive solutions for nonhomogeneous Klein–Gordon–Maxwell equations:Applied Mathematics and Computation:337 (2018), 504–513
[3]Yulin Zhao, Xiaoyan, Haibo Chen.Multiplicity results for a class of fractional differential equations with impulse:2018, 2018:341
[4]Liping Xu, Haibo Chen.Ground solutions for critical quasilinear elliptic equations via Poho?aev manifold method:Applicable Analysis:97(10), 2018, 1651–1
[5]Liping Xu, Haibo Chen.Ground state solutions for Kirchhoff-type equations with a general nonlinearity in the critical growth:Advances in Nonlinear Analysis:7(4),2018,535-546
[6]Weihong Xie Haibo Chen.Existence and multiplicity of solutions for p(x)-Laplacian equations in RN:Mathematische Nachrichten:291(16),2018,2476-24
[7]Liping Xu, Haibo Chen.Existence of positive ground state solutions of biharmonic equation via Poho zaev{Nehari manifold method:Topological Methods in Nonlinear Analysis:2018.015
[8]Belal Almuaalemi, Haibo Chen.Multiple solutions for a class of nonhomogeneous fourth-order quasilinear equations with nonlinearities:Differential Equations and Dynamical Systems:2018, DOI
[9]Guofeng Che, Haibo Chen.A Method of L-Quasi-upper and Lower Solutions for Boundary Value Problems of Impulsive Differential Equation in Banach Spaces:Differential Equations and Dynamical Systems:26:4,2018, 393–403
[10]Guofeng Che, Haibo Chen.Infinitely many solutions of systems of Kirchhoff-type equations with general potentials:Rocky Mountain Journal of Mathematics:48(7), 2018, 2187-22
[11]Guofeng Che, Haibo Chen.Existence of multiple nontrivial solutions for a class of quasilinear Schrodinger equations on RN:Bulletin of the Belgian Mathematical Society:25 (2018) 39-53
[12]Guofeng Che, Haibo Chen.Infinitely many solutions for Kirchhoff equations with sign-changing potential and Hartree nonlinearity:Mediterranean Journal of Mathematics:15 (31) (2018) 1-17
[13]Hongxia Shi,Haibo Chen.Infinitely Many Solutions for Generalized Quasilinear Schroinger Equations with a Finite Potential Well:Bulletin of the Iranian Mathematical Society:44(3),2018, 691-705
[14]Yu Su,Haibo Chen.The existence of nontrivial solution for biharmonic equation with sign‐changing potential:Mathematical Methods in the Applied Sciences:41(16),2018, 6170-61
[15]Guofeng Che Haibo Chen Hongxia Shi Zewei Wang.Existence of nontrivial solutions for fractional Schrodinger‐Poisson system with sign‐changing potentials:Mathematical Methods in the Applied Sciences:41(13),2018, 5050-50
[16]Liping Xu, Haibo Chen.Ground state solutions for quasilinear Schroinger equations via Pohozev manifold in Orlicz space:Journal of Differential Equations:265(9),2018,4417-444
[17]Yueding Yuan, Haibo Chen.Global dynamics for a class of non-monotone time-delayed reaction-diffusion equations:Advances in Difference Equations:(2018) 2018:55
[18]Weihong Xie, Haibo Chen.Existence and multiplicity of normalized solutions for the nonlinear Kirchhoff type problems:Computers & Mathematics with Applications,:2018.8, 579-591
[19]Liuyang Shao, Haibo Chen.Existence and concentration result for a class of fractional Kirchhoff equations with Hartree-type nonlinearities and steep potential well:Comptes Rendus Mathematique:356:5, 2018,489-497
[20]Weihong Xie, Haibo Chen, Hongxia Shi.Multiplicity of Positive Solutions for Schr?dinger–Poisson Systems with a Critical Nonlinearity in R3:Bulletin of the Malaysian Mathematical Sciences So:2018
[21]Belal Almuaalemi, Haibo Chen, Sofiane Khoutir.Multiple solutions for a class of nonhomogeneous fourth-order quasilinear equations with nonlinearities:Differ Equ Dyn Syst
[22]Guofeng Che, Haibo Chen.Multiple solutions for the Schrodinger equations with sign-changing potential and Hartree nonlinearity:Applied Mathematics Letters:81,2018, 21-26
[23]Guofeng Che, Haibo Chen.Ground state solutions for a class of semilinear elliptic systems with sum of periodic and vanishing potentials:Topological Methods in Nonlinear Analysis:51(1),2018, 215-242
[24]Weihong Xie, Haibo Chen,Hongxia Shi.Ground state solutions for the nonlinear Schr?dinger-Poisson systems with sum of periodic and vanishing potentials:Mathematical Methods in the Applied Sciences:41(1),2018,144-158
[25]Liuyang Shao,Haibo Chen.Existence and concentration result for a quasilinear Schr¨odinger equation with critical growth:Z. Angew. Math. Phys:(2017) 68:126
[26]Hongxia Shi, Haibo Chen.Existence and multiplicity of solutions for a class of generalized quasilinear Schrodinger equations:Journal of Mathematical Analysis and Applications:452(2017),578-594
[27]Xiaonan Liu,Haibo Chen.Positive solutions for a class of quasilinear Schr?dinger equations with vanishing potentials:Boundary Value Problems:(2017) 2017:35
[28]Yulin Zhao,Haibo Chen,Chengjie Xu.Nontrivial solutions for impulsive fractional differential equations via Morse theory:Applied Mathematics and Computation:307 (2017),170–179
[29]Xiaonan Liu, Haibo Chen, Belal Almuaalemi.Ground state solutions for p-biharmonic equations:Electronic Journal of Differential Equations:45, 2017 (2017), 1-9
[30]Sofiane Khoutir, Haibo Chen.Ground state solutions and least energy sign-changing solutions for a class of fourth order Kirchhoff-type equations in:Journal of Mathematical Sciences:23(1), 2017,94-108
[31]CHE Guo feng,CHEN Hai bo.Nonlinear Singularly Perturbed Problems for Reaction Diffusion Equations with Two Parameters and Boundary Perturbation:Journal of Donghua University(Eng.Ed.)Vo1:33(6),2016,888-893
[32]Liuyang Shao, Haibo Chen.Existence of solutions for the Schr?dinger-Kirchhoff-Poisson systems with a critical nonlinearity:Boundary Value Problems:(2016) 2016:210
[33]Liuyang Shao,Haibo Chen.Multiple solutions for Schrodinfer-Possion systems with sign-changing potential and critical nonlinerity:Electronic Journal of Differential Equations:276, 2016 (2016),1-8
[34]Hongliang Liu, Haibo Chen, Qizhen Xiao.Positive ground state solutions for a class of Schrodinger–Poisson systems with sign-changing and vanishing potential:Mathematical Methods in the Applied Sciences:40(6),2017,1937–1948
[35]Guofeng Che, Haibo Chen.Multiplicity of small negative-energy solutions for a class of semilinear elliptic systems:Boundary Value Problems:(2016) 2016:107
[36]Guofeng Che, Haibo Chen.Existence and multiplicity of systems of Kirchhoff-type equations with general potentials:Mathematical Methods in the Applied Sciences:3(40):2017, 775–785
[37]Hongliang Liu, Haibo Chen, Gangwei Wang.Multiplicity for a 4-sublinear Schrodinger–Poisson system with sign-changing potential via Morse theory:Comptes Rendus Mathematique:1(354): 2016, 75-80
[38]Hongxia Shi, Haibo Chen.Ground state solutions for resonant cooperative elliptic systems with general superlinear terms:Mediterranean Journal of Mathematics:13(2016), 2897-2909
[39]Yulin Zhao, Haibo Chen, Qiming Zhang.Infinitely many solutions for fractional differential system via variational method:Journal of Applied Mathematics and Computing:,(2016) 50:589–609
[40]Hongxia Shi, Haibo Chen,Hongliang Liu.Morse theory and local linking for a class of boundary value problems with impulsive effects:Journal of Applied Mathematics and Computing:,(2016) 51:353–365
[41]Sofiane Khoutir, Haibo Chen.Least energy sign-changing solutions for a class of fourth order Kirchhoff-type equations in RN:Journal of Applied Mathematics and Computing:201606,DOI 10.1007/s
[42]Sofiane Khoutir, Haibo Chen.Existence of infinitely many high energy solutions for a fractional Schrodinger equation in RN:Applied Mathematics Letters:61(2016),156-162
[43]Hongxia Shi, Haibo Chen.Positive solutions for generalized quasilinear Schrodinger equations with potential vanishing at infinity:Applied Mathematics Letters:61(2016), 137-142
[44]Liping Xu,Haibo Chen.Sign-changing solutions to Schrodinger-Kirchhoff-type equations with critical exponent:Advances in Difference Equations:(2016) 2016:121
[45]Guofeng Che, Haibo Chen.A Method of L-Quasi-upper and Lower Solutions for Boundary Value Problems of Impulsive Differential Equation in Banach Spaces:Differential Equations and Dynamical Systems:05/01/2016
[46]Junjun Zhou, Haibo Chen,Belal O. M. Almuaalemi.Existence and Multiplicity of Solutions for Some Damped Dirichlet Nonlinear Impulsive Differential Equations:Differential Equations and Dynamical Systems.:28/01/2016
[47]Haibo Chen, Hongliang Liu, Liping Xu.Existence and multiplicity of solutions for nonlinear Schrodinger-Kirchhoff-type equations:Journal of the Korean Mathematical Society:53:1 (2016), 201-215
[48]Hongliang Liu, Haibo Chen.Multiple solutions for a nonlinear Schrodinger–Poisson system with sign-changing potential:Computers and Mathematics with Applications:71, 2016, 1405-1416
[49]Hongxia Shi, Haibo Chen.Generalized quasilinear asymptotically periodic Schrodinger equations with critical growth:Computers and Mathematics with Applications:71, 2016, 849-858
[50]Yulin Zhao, Haibo Chen, Qiming Zhang.Infinitely many solutions for fractional differential system via variational method:J. Appl. Math. Comput:(2016) 50:589–609
[51]Hongxia Shi, Haibo Chen.Multiplicity results for a class of boundary value problems with impulsive effects:Mathematische Nachrichten:289(5–6),2016,718–72
[52]Hongliang Liu, Haibo Chen,Xiaoxia Yang.Least energy sign-changing solutions for nonlinear Schrodinger equations with indefinite-sign and vanishing potential:Applied Mathematics Letters:53(2016), 100-106
[53]Liping Xu, Haibo Chen.Nontrivial solutions for Kirchhoff-type problems with a parameter:Journal of Mathematical Analysis and Applications:433:1, 2016,455-472
[54]Hongxia Shi, Haibo Chen.Ground state solutions for asymptotically periodic coupled Kirchhoff-type systems with critical growth:Mathematical Methods in the Applied Sciences:9(39):2016,2193-2201
[55]Hongxia Shi, Haibo Chen, Hongliang Liu.Morse theory and local linking for a class of boundary value problems with impulsive effects:Journal of Applied Mathematics and Computing:DOI 10.1007/s12190-0
[56]Jianxin Cao, Haibo Chen, Weifeng Yang.Existence and continuous dependence of mild solutions for fractional neutral abstract evolution equations:Advances in Difference Equations:2015, 2015:6
[57]Hongliang Liu, Haibo Chen.Ground-state solution for a class of biharmonic equations including critical exponent:ZAMP:66 (2015), 3333–3343
[58]Guofeng Che, Haibo Chen.Nontrivial solutions and least energy nodal solutions for a class of fourth-order elliptic equations:J. Appl. Math. Comput:06/11/2015
[59]Hongxia Shi, Haibo Chen.Multiple solutions forP-Laplacian boundary-value problems with impulsive effects:Electronic Journal of Differential Equations:2015 (2015),207,1-9
[60]Hongxia Shi, Haibo Chen.Multiple solutions for fractional Schrodinger equations:Electronic Journal of Differential Equations:2015 (2015),25,1-11
[61]Liping Xu, Haibo Chen.Multiple solutions for the nonhomogeneous fourth order elliptic equations for Kirchhoff-type:Taiwanese Journal of Mathematics:19(4),2015.1215-1226
[62]Hongliang Liu, Haibo Chen, Yueding Yuan.Multiplicity of nontrivial solutions for a class of nonlinear Kirchhoff-type equations:Boundary Value Problems:2015, 2015:187
[63]Hongliang Liu, Haibo Chen.Multiple solutions for an indefinite Kirchhoff-type equation with sign-changing potential:Electronic Journal of Differential Equations:2015 (2015),274,1-9
[64]Liping Xu, Haibo Chen.Multiplicity results for fourth order elliptic equations of Kirchhoff-type:Acta Mathematica Scientia:2015, 1067-1076
[65]Hongliang Liu, Haibo Chen.Least energy nodal solution for a quasilinear biharmonic equation with critical exponent in RN:Applied Mathematics Letter:48,2015,85-90
[66]Liping Xu, Haibo Chen.Existence and multiplicity of solutions for nonhomogeneous Klein-Gordon-Maxwell equations:Electron. J. Diff. Equ:102,2015(2015), 1-12
[67]Yulin Zhao, Haibo Chen,Qiming Zhang.Infinitely many solutions for fractional differential equations via variational methods:Journal of Applied Mathematics and Computing:Mar. 29, 2015
[68]Yulin Zhao, Haibo Chen, Bin Qin.Multiple solutions for a coupled system of nonlinear fractional differential equations via variational methods:Applied Mathematics and Computation:15 April 2015,417-42
[69]Yusen Wu, Peiluan Li, Haibo Chen.Calculation of singular point quantities at infinity for a type of polynomial differential systems:Mathematics and Computers in Simulation:2015:109,153-173
[70]Xiaoxia Yang,Haibo Chen.Existence of periodic solutions for a damped vibration problem with (q, p) - Laplacian:Bulletin of the Belgian Mathematical Society Simon:21(1),2014,51-66
[71]Junjun Zhou, Haibo Chen, Belal O.M.Almuaalemi. Existence and multiplicity of solutions for some damped Dirichlet nonlinear impulsive differential equations:Differential Equations and Dynamical Systems:2014
[72]Hongliang Liu, Haibo Chen, Xiaoxia Yang.Multiple solutions for superlinear Schrodinger-Poisson systems with sign-changing potential and nonlinearity:Computers and Mathematics with Applications:2014: 68(12),1982-19
[73]Liping Xu, Haibo Chen.Existence and multiplicity of solutions for fourth-order elliptic equations of Kirchhoff type via genus theory:Boundary Value Problems:2014, 2014:212,1-12
[74]Liping Xu, Haibo Chen.Existence of infinitely many solutions for generalized Schr?dinger-Poisson system:Boundary Value Problems:2014, 2014:196,1-12
[75]Liping Xu, Haibo Chen.Multiplicity of small negative-energy solutions for a class of nonlinear Schrodinger–Poisson systems:Applied Mathematics and Computation:243, 2014, 817-824
[76]Yulin Zhao, Haibo Chen,Qiming Zhang.Multiple solutions of three-point boundary value problems for second-order impulsive differential equation at resonance:Boundary Value Problems:2014, 2014:103
[77]Yulin Zhao, Haibo Chen,Bin Qin.Periodic boundary value problems for second-order functional differential equations with impulse:Advances in Difference Equations:2014, 2014:134
[78]Hongxia Shi, Haibo Chen, Qi Zhang.Infinitely many solutions for a p-Laplacian boundary value problem with impulsive effects:Journal of Applied Mathematics and Computing:46(2014),93-106
[79]Xiaoxia Yang, Haibo Chen.Existence of periodic solutions for sublinear second order dynamical system with (q, p)-Laplacian:Mathematica Slovaca:(63)4(2013),799-816
[80]Yulin Zhao, Haibo Chen,Qiming Zhang.Existence and multiplicity of positive solutions for nonhomogeneous boundary value problems with fractional q-derivatives:Boundary Value Problems 2013:25 April 2013
[81]Liu Yang, Haibo Chen, Liping Luo.Successive iteration and positive solutions for boundary value problem of nonlinear fractional q-difference equation:Journal of Applied Mathematics and Computing:2013
[82]Juntao Sun, Jifeng Chu, Haibo Chen.Periodic solution generated by impulses for singular differential equations:Journal of Mathematical Analysis and Applications:404(2), 2013,562-569
[83]Yulin Zhao,Haibo Chen, Qiming Zhang.Existence results for fractional q-difference equations with nonlocal q-integral boundary conditions:Advances in Difference Equations:2013:48
[84]Cao, Jianxin; Chen, Haibo.The Iterative Solution of Generalized Sturm-Liouville Boundary Value Problem in Banach Spaces:Funkcialaj Ekvacioj Internacia:55:3,2012,429-446
[85]Yulin Zhao,Guobing Ye,Haibo Chen.Multiple Positive Solutions of a Singular Semipositone Integral Boundary Value Problem for Fractional q-Derivatives Equation:Abstract and Applied Analysis:2012,12 pages
[86]Yueding Yuan, Haibo Chen, Chaoxiong Du, Yuejin Yuan.The limit cycles of a general Kolmogorov system:Journal of Mathematical Analysis and Applications:392(2),2012, 225-237
[87]Yulin Zhao, Haibo Chen, Li Huang.Existence of positive solutions for nonlinear fractional functional differential equation:Computers & Mathematics with Applications:64(10)2012,3456-3467
[88]Haibo Chen, Hongwu Tong, Juntao Sun.Periodic solutions of second order differential equations with multiple delays:Advances in Difference Equations:2012,
[89]Juntao Sun, Haibo Chen, Jifeng Chu.On periodic Hamiltonian elliptic systems with spectrum point zero:Mathematische Nachrichten:285(17-18)2012,2233-
[90]Yulin Zhao, Haibo Chen, Chengjie Xu.Existence of multiple solutions for three-point boundary-value problems on infinite intervals in Banach spaces:Electronic Journal of Differential Equations:44,2012 (2012),1-11
[91]Yusen Wu, Peiluan Li, Haibo Chen.Center conditions and bifurcation of limit cycles at three-order nilpotent critical point in a cubic Lyapunov system:Communications in Nonlinear Science and Numerical:17(1), 2012, 292-304
[92]Zhisu Liu, Haibo Chen,Cheng Liu.Positive solutions for singular third-order nonhomogeneous boundary value problems:Journal of Applied Mathematics and Computing:38(1),2012,161-172
[93]Juntao Sun, Haibo Chen, Juan J. Nieto.On ground state solutions for some non-autonomous Schr?dinger–Poisson systems:Journal of Differential Equations:252(5)2012,3365-3380
[94]Jianxin Cao, Haibo Chen.Impulsive fractional differential equations with nonlinear boundary conditions:Mathematical and Computer Modelling:55( 3), 2012,303-311
[95]Jianxin Cao, Haibo Chen.Positive Solution of Singular Fractional Differential Equation in Banach Space:Journal of Applied Mathematics:2011(SCI)
[96]Xiaoxia Yang,Haibo Chen.Periodic Solutions for Autonomous (q,p)-Laplacian System with Impulsive Effects:Journal of Applied Mathematics:2011,
[97]Liu Yang, Haibo Chen.Unique positive solution of boundary value problem for fractional differential equations:Journal of Biomathematics:26(1), 2011, 43-47
[98]Liu Yang, Haibo Chen, Juntao Sun.Infinitely many homoclinic solutions for some second order Hamiltonian systems:Nonlinear Analysis:74(17)2011,6459-6468
[99]Liu Yang, Haibo Chen.Nonlocal boundary value problem for impulsive differential equations of gractional order:Advance in difference equations:Art No.404917, 2011
[100]Qi Zhang, Yirong Liu, Haibo Chen.On the equivalence of singular point quantities and the integrability of a fine critical singular point:Nonlinear Analysis:12, 2011, 2794–2801