| Oscillation theory for functional differential equations L Erbe Routledge, 2017 | 1264 | 2017 |
| Interval criteria for oscillation of second-order linear ordinary differential equations Q Kong Journal of Mathematical Analysis and Applications 229 (1), 258-270, 1999 | 264 | 1999 |
| Eigenvalues of regular Sturm–Liouville problems Q Kong, A Zettl Journal of differential equations 131 (1), 1-19, 1996 | 213 | 1996 |
| Dependence of the nth Sturm–Liouville eigenvalue on the problem Q Kong, H Wu, A Zettl Journal of differential equations 156 (2), 328-354, 1999 | 155 | 1999 |
| Boundary value problems for singular second-order functional differential equations LH Erbe, Q Kong Journal of Computational and Applied Mathematics 53 (3), 377-388, 1994 | 103 | 1994 |
| Kamenev type theorems for second-order matrix differential systems LH Erbe, Q Kong, SG Ruan Proceedings of the American Mathematical Society 117 (4), 957-962, 1993 | 101 | 1993 |
| Singular left-definite Sturm–Liouville problems Q Kong, H Wu, A Zettl Journal of Differential Equations 206 (1), 1-29, 2004 | 95 | 2004 |
| Dependence of eigenvalues of Sturm–Liouville problems on the boundary Q Kong, A Zettl journal of differential equations 126 (2), 389-407, 1996 | 92 | 1996 |
| Uniqueness of positive solutions of fractional boundary value problems with non-homogeneous integral boundary conditions JR Graef, L Kong, Q Kong, M Wang Fractional Calculus and Applied Analysis 15, 509-528, 2012 | 83 | 2012 |
| Sturm–Liouville problems with finite spectrum Q Kong, H Wu, A Zettl Journal of mathematical analysis and applications 263 (2), 748-762, 2001 | 81 | 2001 |
| The MyShake platform: a global vision for earthquake early warning RM Allen, Q Kong, R Martin-Short Pure and Applied Geophysics 177, 1699-1712, 2020 | 78 | 2020 |
| Geometric aspects of Sturm—Liouville problems I. Structures on spaces of boundary conditions Q Kong, H Wu, A Zettl Proceedings of the Royal Society of Edinburgh Section A: Mathematics 130 (3 …, 2000 | 72 | 2000 |
| Inequalities among eigenvalues of Sturm-Liouville problems. MSP Eastham, Q Kong, H Wu, A Zettl Journal of Inequalities and Applications [electronic only] 3 (1), 25-43, 1999 | 69 | 1999 |
| Dependence of eigenvalues on the problem Q Kong, H Wu, A Zettl Mathematische Nachrichten 188 (1), 173-201, 1997 | 69 | 1997 |
| Multi-point boundary value problems of second-order differential equations (I) L Kong, Q Kong Nonlinear Analysis: Theory, Methods & Applications 58 (7-8), 909-931, 2004 | 66 | 2004 |
| Matrix representations of Sturm–Liouville problems with finite spectrum Q Kong, H Volkmer, A Zettl Results in Mathematics 54, 103-116, 2009 | 55 | 2009 |
| Kamenev-type and interval oscillation criteria for second-order linear differential equations on a measure chain A Del Medico, Q Kong Journal of Mathematical Analysis and Applications 294 (2), 621-643, 2004 | 53 | 2004 |
| Combining deep learning with physics based features in explosion‐earthquake discrimination Q Kong, R Wang, WR Walter, M Pyle, K Koper, B Schmandt Geophysical Research Letters 49 (13), e2022GL098645, 2022 | 52 | 2022 |
| Application of the mixed monotone operator method to fractional boundary value problems JR Graef, L Kong, Q Kong Fract. Calc. Differ. Calc 2, 554-567, 2011 | 52 | 2011 |
| Sturm–Liouville problems on time scales with separated boundary conditions Q Kong Results in Mathematics 52, 111-121, 2008 | 51 | 2008 |
Kong, LingjuUniversity of Tennessee at ChattanoogaPatvirtintas el. paštas utc.edu
