Periodic solutions for nonautonomous second order systems with sublinear nonlinearity CL Tang Proceedings of the American Mathematical Society 126 (11), 3263-3270, 1998 | 290 | 1998 |
Periodic solutions for second order systems with not uniformly coercive potential CL Tang, XP Wu Journal of Mathematical Analysis and Applications 259 (2), 386-397, 2001 | 215 | 2001 |
Existence and multiplicity of solutions for Kirchhoff type equations JJ Sun, CL Tang Nonlinear Analysis: Theory, Methods & Applications 74 (4), 1212-1222, 2011 | 206 | 2011 |
Periodic solutions of a class of non-autonomous second-order systems XP Wu, CL Tang Journal of Mathematical Analysis and Applications 236 (2), 227-235, 1999 | 140 | 1999 |
Existence of homoclinic solution for the second order Hamiltonian systems ZQ Ou, CL Tang Journal of Mathematical Analysis and Applications 291 (1), 203-213, 2004 | 139 | 2004 |
Periodic solutions of non-autonomous second-order systems with γ-quasisubadditive potential CL Tang Journal of Mathematical Analysis and Applications 189 (3), 671-675, 1995 | 138 | 1995 |
Multiple positive solutions for Kirchhoff type of problems with singularity and critical exponents CY Lei, JF Liao, CL Tang Journal of Mathematical Analysis and Applications 421 (1), 521-538, 2015 | 131 | 2015 |
High energy solutions for the superlinear Schrödinger–Maxwell equations SJ Chen, CL Tang Nonlinear Analysis: Theory, Methods & Applications 71 (10), 4927-4934, 2009 | 107 | 2009 |
Periodic solutions of non-autonomous second order systems C Tang Journal of mathematical analysis and applications 202 (2), 465-469, 1996 | 102 | 1996 |
Existence and multiplicity of periodic solutions for nonautonomous second order systems CL Tang Nonlinear Analysis: Theory, Methods & Applications 32 (3), 299-304, 1998 | 101 | 1998 |
Notes on periodic solutions of subquadratic second order systems CL Tang, XP Wu Journal of Mathematical Analysis and Applications 285 (1), 8-16, 2003 | 99 | 2003 |
Periodic solutions for a class of nonautonomous subquadratic second order Hamiltonian systems CL Tang, XP Wu Journal of Mathematical Analysis and Applications 275 (2), 870-882, 2002 | 88 | 2002 |
Positive solutions for Kirchhoff-type equations with critical exponent in RN J Liu, JF Liao, CL Tang Journal of Mathematical Analysis and Applications 429 (2), 1153-1172, 2015 | 86 | 2015 |
Existence of even homoclinic orbits for second-order Hamiltonian systems Y Lv, CL Tang Nonlinear Analysis: Theory, Methods & Applications 67 (7), 2189-2198, 2007 | 86 | 2007 |
Existence and multiplicity of solutions for Kirchhoff type problem with critical exponent QL Xie, XP Wu, CL Tang Commun. Pure Appl. Anal 12 (6), 2773-2786, 2013 | 81 | 2013 |
Existence of a periodic solution for subquadratic second-order discrete Hamiltonian system YF Xue, CL Tang Nonlinear Analysis: Theory, Methods & Applications 67 (7), 2072-2080, 2007 | 81 | 2007 |
Periodic and subharmonic solutions of second-order Hamiltonian systems ZL Tao, CL Tang Journal of mathematical analysis and applications 293 (2), 435-445, 2004 | 81 | 2004 |
Three solutions for a Navier boundary value problem involving the p-biharmonic C Li, CL Tang Nonlinear Analysis: Theory, Methods & Applications 72 (3-4), 1339-1347, 2010 | 77 | 2010 |
Ground state sign-changing solutions for a Schrödinger–Poisson system with a critical nonlinearity in R3 XJ Zhong, CL Tang Nonlinear Analysis: Real World Applications 39, 166-184, 2018 | 74 | 2018 |
Periodic solutions for some nonautonomous second-order systems J Ma, CL Tang Journal of mathematical analysis and applications 275 (2), 482-494, 2002 | 73 | 2002 |