Nonlinear stability of traveling waves to a hyperbolic-parabolic system modeling chemotaxis T Li, ZA Wang SIAM Journal on Applied Mathematics 70 (5), 1522-1541, 2010 | 143 | 2010 |
Asymptotic nonlinear stability of traveling waves to conservation laws arising from chemotaxis T Li, ZA Wang Journal of Differential Equations 250 (3), 1310-1333, 2011 | 119 | 2011 |
Global small-data solutions of a two-dimensional chemotaxis system with rotational flux terms T Li, A Suen, M Winkler, C Xue Mathematical Models and Methods in Applied Sciences 25 (04), 721-746, 2015 | 101 | 2015 |
On a hyperbolic–parabolic system modeling chemotaxis D Li, T Li, K Zhao Mathematical models and methods in applied sciences 21 (08), 1631-1650, 2011 | 98 | 2011 |
Nonlinear stability of large amplitude viscous shock waves of a generalized hyperbolic–parabolic system arising in chemotaxis T Li, ZA Wang Mathematical models and methods in applied sciences 20 (11), 1967-1998, 2010 | 95 | 2010 |
Stability of traveling waves of the Keller–Segel system with logarithmic sensitivity J Li, T Li, ZA Wang Mathematical Models and Methods in Applied Sciences 24 (14), 2819-2849, 2014 | 84 | 2014 |
Nonlinear dynamics of traffic jams T Li Physica D: Nonlinear Phenomena 207 (1-2), 41-51, 2005 | 80 | 2005 |
Density waves in a traffic flow model with reaction-time delay L Yu, T Li, ZK Shi Physica A: Statistical Mechanics and its Applications 389 (13), 2607-2616, 2010 | 70 | 2010 |
Global dynamics of a hyperbolic-parabolic model arising from chemotaxis T Li, R Pan, K Zhao SIAM Journal on Applied Mathematics 72 (1), 417-443, 2012 | 69 | 2012 |
Steadily propagating waves of a chemotaxis model T Li, ZA Wang Mathematical biosciences 240 (2), 161-168, 2012 | 61 | 2012 |
THE VANISHING PRESSURE LIMITS OF RIEMANN SOLUTIONS TO THE CHAPLYGIN GAS EQUATIONS WITH A SOURCE TERM. L Guo, GAN YIN, T LI Communications on Pure & Applied Analysis 16 (1), 2017 | 57 | 2017 |
Global solutions of nonconcave hyperbolic conservation laws with relaxation arising from traffic flow T Li Journal of Differential Equations 190 (1), 131-149, 2003 | 54 | 2003 |
A new car-following model with two delays L Yu, Z Shi, T Li Physics Letters A 378 (4), 348-357, 2014 | 50 | 2014 |
The limit behavior of the Riemann solutions to the generalized Chaplygin gas equations with a source term L Guo, T Li, G Yin Journal of mathematical analysis and applications 455 (1), 127-140, 2017 | 45 | 2017 |
Global solutions and zero relaxation limit for a traffic flow model T Li SIAM journal on applied mathematics 61 (3), 1042-1061, 2000 | 43 | 2000 |
Well-posedness of a 3D parabolic–hyperbolic Keller–Segel system in the Sobolev space framework C Deng, T Li Journal of Differential Equations 257 (5), 1311-1332, 2014 | 42 | 2014 |
Stability of traveling waves in quasi-linear hyperbolic systems with relaxation and diffusion T Li SIAM journal on mathematical analysis 40 (3), 1058-1075, 2008 | 39 | 2008 |
Stability of a traffic flow model with nonconvex relaxation T Li, H Liu Communications in mathematical sciences 3 (2), 101-118, 2005 | 34 | 2005 |
Shock formation in a traffic flow model with Arrhenius look-ahead dynamics D Li, T Li Networks and Heterogeneous Media 6 (4), 681-694, 2011 | 33 | 2011 |
stability of conservation laws for a traffic flow model. T Li Electronic Journal of Differential Equations (EJDE)[electronic only] 2001 …, 2001 | 32 | 2001 |