
Books

 Multiscale phenomena in complex fluids, Modeling, Analysis and Numerical Simulations, edited by T. Hou, C. Liu and J.G. Liu
(2009), World Scientific .
 Hyperbolic Problems: Theory, Numerics and Applications, volume I: Plenary & Invited Talks; volume II: Contributed Talks, Proceedings of Symposia in Applied Mathematics, edited by E. Tadmor, J.G. Liu, and A.E. Tzavaras, vol. 67
(2009), American Mathematical Society .
 Dynamics in Models of Coarsening, Coagulation, Condensation and Quantization, edited by W. Bao and J.G. Liu
(2007), World Scientific .

Papers Published

 Feng, Y; Li, L; Liu, JG; Xu, X, A note on onedimensional time fractional ODEs,
Applied Mathematics Letters, vol. 83
(September, 2018),
pp. 8794 [doi] .
 Li, L; Liu, JG; Wang, L, Cauchy problems for Keller–Segel type time–space fractional diffusion equation,
Journal of Differential Equations, vol. 265 no. 3
(August, 2018),
pp. 10441096 [doi] [abs]
.
 Liu, JG; Tang, M; Wang, L; Zhou, Z, An accurate front capturing scheme for tumor growth models with a free boundary limit,
Journal of Computational Physics, vol. 364
(July, 2018),
pp. 7394 [doi] [abs]
.
 Chen, K; Li, Q; Liu, JG, Online learning in optical tomography: a stochastic approach,
Inverse Problems, vol. 34 no. 7
(July, 2018),
pp. 075010075010 [doi] .
 Gao, Y; Liu, JG; Lu, XY; Xu, X, Maximal monotone operator theory and its applications to thin film equation in epitaxial growth on vicinal surface,
Calculus of Variations and Partial Differential Equations, vol. 57 no. 2
(April, 2018) [doi] .
 Liu, JG; Xu, X, Partial regularity of weak solutions to a PDE system with cubic nonlinearity,
Journal of Differential Equations, vol. 264 no. 8
(April, 2018),
pp. 54895526 [doi] [abs]
.
 Li, L; Liu, JG, p Euler equations and p Navier–Stokes equations,
Journal of Differential Equations, vol. 264 no. 7
(April, 2018),
pp. 47074748 [doi] [abs]
.
 Feng, Y; Li, L; Liu, JG, Semigroups of stochastic gradient descent and online principal component analysis: Properties and diffusion approximations,
Communications in Mathematical Sciences, vol. 16 no. 3
(January, 2018),
pp. 777789 [doi] [abs]
.
 Li, L; Liu, JG, SOME COMPACTNESS CRITERIA FOR WEAK SOLUTIONS OF TIME FRACTIONAL PDEs,
Siam Journal on Mathematical Analysis, vol. 50 no. 4
(January, 2018),
pp. 39633995, SIAM PUBLICATIONS [doi] .
 Gao, Y; Li, L; Liu, JG, A Dispersive Regularization for the Modified CamassaHolm Equation,
Siam Journal on Mathematical Analysis, vol. 50 no. 3
(January, 2018),
pp. 28072838 [doi] .
 Li, L; Liu, JG, A Generalized Definition of Caputo Derivatives and Its Application to Fractional ODEs,
Siam Journal on Mathematical Analysis, vol. 50 no. 3
(January, 2018),
pp. 28672900 [doi] .
 Li, L; Liu, JG; Lu, J, Fractional Stochastic Differential Equations Satisfying FluctuationDissipation Theorem,
Journal of Statistical Physics, vol. 169 no. 2
(October, 2017),
pp. 316339 [doi] .
 Liu, JG; Wang, L; Zhou, Z, Positivitypreserving and asymptotic preserving method for 2D KellerSegal equations,
Mathematics of Computation, vol. 87 no. 311
(September, 2017),
pp. 11651189 [doi] .
 Coquel, F; Jin, S; Liu, JG; Wang, L, Entropic subcell shock capturing schemes via JinXin relaxation and Glimm front sampling for scalar conservation laws,
Mathematics of Computation, vol. 87 no. 311
(September, 2017),
pp. 10831126 [doi] .
 Liu, JG; Ma, Z; Zhou, Z, Explicit and Implicit TVD Schemes for Conservation Laws with Caputo Derivatives,
Journal of Scientific Computing, vol. 72 no. 1
(July, 2017),
pp. 291313 [doi] .
 Gao, Y; Ji, H; Liu, JG; Witelski, TP, Global existence of solutions to a tear film model with locally elevated evaporation rates,
Physica D: Nonlinear Phenomena, vol. 350
(July, 2017),
pp. 1325 [doi] .
 Gao, Y; Liu, JG; Lu, J, Continuum Limit of a Mesoscopic Model with Elasticity of Step Motion on Vicinal Surfaces,
Journal of Nonlinear Science, vol. 27 no. 3
(June, 2017),
pp. 873926 [doi] .
 Gao, Y; Liu, JG; Lu, J, Weak Solution of a Continuum Model For Vicinal Surface in The AttachmentDetachmentLimited Regime,
Siam Journal on Mathematical Analysis, vol. 49 no. 3
(January, 2017),
pp. 17051731 [doi] .
 Liu, JG; Wang, J, A generalized Sz. Nagy inequality in higher dimensions and the critical thin film equation,
Nonlinearity, vol. 30 no. 1
(January, 2017),
pp. 3560 [doi] .
 Degond, P; Liu, JG; MerinoAceituno, S; Tardiveau, T, Continuum dynamics of the intention field under weakly cohesive social interaction,
Mathematical Models & Methods in Applied Sciences, vol. 27 no. 01
(January, 2017),
pp. 159182 [doi] .
 Gao, Y; Liu, JG, Global Convergence of a Sticky Particle Method for the Modified CamassaHolm Equation,
Siam Journal on Mathematical Analysis, vol. 49 no. 2
(January, 2017),
pp. 12671294 [doi] .
 Liu, JG; Xu, X, Analytical Validation of a Continuum Model for the Evolution of a Crystal Surface in Multiple Space Dimensions,
Siam Journal on Mathematical Analysis, vol. 49 no. 3
(January, 2017),
pp. 22202245 [doi] .
 Gao, Y; Ji, H; Liu, JG; P. Witelski, T, A vicinal surface model for epitaxial growth with logarithmic free energy,
Discrete & Continuous Dynamical Systems B, vol. 22 no. 11
(2017),
pp. 121 [doi] .
 Huang, H; Liu, JG, Discreteintime random particle blob method for the Keller–Segel equation and convergence analysis,
Communications in Mathematical Sciences, vol. 15 no. 7
(2017),
pp. 18211842 [doi] [abs]
.
 Degond, P; Herty, M; Liu, JG, Meanfield games and model predictive control,
Communications in Mathematical Sciences, vol. 15 no. 5
(2017),
pp. 14031422 [doi] .
 Li, L; Liu, JG, A note on deconvolution with completely monotone sequences and discrete fractional calculus,
Quarterly of Applied Mathematics
(2017),
pp. 11 [doi] .
 Liu, JG; Cong, W, Uniform $L^{\infty}$ boundedness for a degenerate parabolicparabolic KellerSegel model,
Discrete and Continuous Dynamical Systems Series B, vol. 22 no. 2
(December, 2016),
pp. 307338 [doi] .
 Huang, H; Liu, JG, A note on Monge–Ampère Keller–Segel equation,
Applied Mathematics Letters, vol. 61
(November, 2016),
pp. 2634 [doi] .
 Huang, H; Liu, JG, Error estimates of the aggregationdiffusion splitting algorithms for the KellerSegel equations,
Discrete and Continuous Dynamical Systems Series B, vol. 21 no. 10
(November, 2016),
pp. 34633478 [doi] .
 Liu, JG; Huang, H, Wellposedness for the KellerSegel equation with fractional Laplacian and the theory of propagation of chaos,
Kinetic and Related Models, vol. 9 no. 4
(September, 2016),
pp. 715748 [doi] .
 Liu, JG; Cong, W, A degenerate $p$Laplacian KellerSegel model,
Kinetic and Related Models, vol. 9 no. 4
(September, 2016),
pp. 687714 [doi] .
 Liu, JG; Wang, J, A Note on L ∞ $L^{\infty}$ Bound and Uniqueness to a Degenerate KellerSegel Model,
Acta Applicandae Mathematicae, vol. 142 no. 1
(April, 2016),
pp. 173188 [doi] .
 Herschlag, G; Liu, JG; Layton, AT, Fluid extraction across pumping and permeable walls in the viscous limit,
Physics of Fluids, vol. 28 no. 4
(April, 2016),
pp. 041902041902 [doi] .
 Liu, JG; Pego, RL, On generating functions of Hausdorff moment sequences,
Transactions of the American Mathematical Society, vol. 368 no. 12
(February, 2016),
pp. 84998518 [doi] .
 Liu, JG; Wang, J, Refined hypercontractivity and uniqueness for the Keller–Segel equations,
Applied Mathematics Letters, vol. 52
(February, 2016),
pp. 212219 [doi] .
 Chen, J; Liu, JG; Zhou, Z, On a SchrödingerLandauLifshitz System: Variational Structure and Numerical Methods,
Multiscale Modeling & Simulation, vol. 14 no. 4
(January, 2016),
pp. 14631487 [doi] .
 Liu, JG; Xu, X, Existence Theorems for a Multidimensional Crystal Surface Model,
Siam Journal on Mathematical Analysis, vol. 48 no. 6
(January, 2016),
pp. 36673687 [doi] .
 Liu, JG; Zhang, Y, Convergence of diffusiondrift many particle systems in probability under a sobolev norm, Proceedings of Particle Systems and Partial Differential Equations  III,
Springer Proceedings in Mathematics and Statistics, vol. 162
(January, 2016),
pp. 195223, Springer [doi] [abs]
.
 J.G. Liu and R. Yang, Propagation of chaos for large Brownian particle system with Coulomb interaction,
Research in the Mathematical Sciences, vol. 3 no. 40
(2016) .
 Y. Duan and J.G. Liu, Error estimate of the particle method for the bequation,
Methods and Applications of Analysis, vol. 23
(2016),
pp. 119154 .
 J.G. Liu and Y. Zhang, Convergence of stochastic interacting particle systems in probability under a Sobolev norm,
Annals of Mathematical Sciences and Applications, vol. 1
(2016),
pp. 251299 .
 Xue, Y; Wang, C; Liu, JG, Simple Finite Element Numerical Simulation of Incompressible Flow Over Nonrectangular Domains and the SuperConvergence Analysis,
Journal of Scientific Computing, vol. 65 no. 3
(December, 2015),
pp. 11891216 [doi] .
 Lu, J; Liu, JG; Margetis, D, Emergence of step flow from an atomistic scheme of epitaxial growth in 1+1 dimensions.,
Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics, vol. 91 no. 3
(March, 2015),
pp. 032403 [doi] [abs]
.
 Degond, P; Frouvelle, A; Liu, JG, Phase Transitions, Hysteresis, and Hyperbolicity for SelfOrganized Alignment Dynamics,
Archive for Rational Mechanics and Analysis, vol. 216 no. 1
(January, 2015),
pp. 63115 [doi] [abs]
.
 Chertock, A; Liu, JG; Pendleton, T, Elastic collisions among peakon solutions for the CamassaHolm equation,
Applied Numerical Mathematics, vol. 93
(January, 2015),
pp. 3046 [doi] [abs]
.
 Herschlag, G; Liu, JG; Layton, AT, An Exact Solution for Stokes Flow in a Channel with Arbitrarily Large Wall Permeability,
Siam Journal on Applied Mathematics, vol. 75 no. 5
(January, 2015),
pp. 22462267 [doi] .
 Degond, P; Liu, JG; Ringhofer, C, Evolution of wealth in a nonconservative economy driven by local Nash equilibria,
Philosophical Transactions. Series A, Mathematical, Physical, and Engineering Sciences, vol. 372 no. 2028
(October, 2014),
pp. 2013039420130394 [doi] .
 Goudon, T; Jin, S; Liu, JG; Yan, B, Asymptoticpreserving schemes for kineticfluid modeling of disperse twophase flows with variable fluid density,
International Journal for Numerical Methods in Fluids, vol. 75 no. 2
(May, 2014),
pp. 81102 [doi] [abs]
.
 Chae, D; Degond, P; Liu, JG, Wellposedness for Hallmagnetohydrodynamics,
Annales De L'Institut Henri Poincare (C) Non Linear Analysis, vol. 31 no. 3
(May, 2014),
pp. 555565 [doi] [abs]
.
 Duan, Y; Liu, JG, Convergence analysis of the vortex blob method for the bequation,
Discrete and Continuous Dynamical Systems Series A, vol. 34 no. 5
(May, 2014),
pp. 19952011 [doi] [abs]
.
 Coquel, F; Jin, S; Liu, JG; Wang, L, WellPosedness and Singular Limit of a Semilinear Hyperbolic Relaxation System with a TwoScale Discontinuous Relaxation Rate,
Archive for Rational Mechanics and Analysis, vol. 214 no. 3
(January, 2014),
pp. 10511084 [doi] [abs]
.
 Degond, P; Herty, M; Liu, JG, Flow on Sweeping Networks,
Multiscale Modeling & Simulation, vol. 12 no. 2
(January, 2014),
pp. 538565 [doi] .
 Chae, D; Degond, P; Liu, JG, Wellposedness for hallmagnetohydrodynamics,
Annales De L'Institut Henri Poincare (C) Non Linear Analysis, vol. 31 no. 3
(January, 2014),
pp. 555565 [doi] [abs]
.
 Chen, X; Li, X; Liu, JG, Existence and uniqueness of global weak solution to a kinetic model for the sedimentation of rodlike particles,
Communications in Mathematical Sciences, vol. 12 no. 8
(2014),
pp. 15791601 [doi] .
 Johnston, H; Wang, C; Liu, JG, A Local Pressure Boundary Condition Spectral Collocation Scheme for the ThreeDimensional Navier–Stokes Equations,
Journal of Scientific Computing, vol. 60 no. 3
(2014),
pp. 612626 [doi] [abs]
.
 Degond, P; Frouvelle, A; Liu, JG, A NOTE ON PHASE TRANSITIONS FOR THE SMOLUCHOWSKI EQUATION WITH DIPOLAR POTENTIAL,
in Proceedings of the Fourteenth International Conference on Hyperbolic Problems: Theory, Numerics and Application,
HYPERBOLIC PROBLEMS: THEORY, NUMERICS, APPLICATIONS, vol. 8
(2014),
pp. 179192 .
 Zou, C; Liu, JG; Bian, S, Ultracontractivity for KellerSegel model with diffusion exponent $m>12/d$,
Kinetic and Related Models, vol. 7 no. 1
(December, 2013),
pp. 928 [doi] .
 Huang, YL; Liu, JG; Wang, WC, A generalized mac scheme on curvilinear domains,
Siam Journal on Scientific Computing, vol. 35 no. 5
(November, 2013),
pp. B953B986 [doi] [abs]
.
 P. Degond, A. Frouvelle, J.G. Liu, S Motsch, L Navoret, Macroscopic models of collective motion and selforganization,
Seminaire Laurent Schwartz  EDP et applicatios, vol. 2012  2013
(2013),
pp. 127 .
 P. Degond, J.G, Liu, S. Motsch, V. Panferov, Hydrodynamic models of selforganized dynamics: derivation and existence theory,
Methods Anal. Appl., vol. 20
(2013),
pp. 89114 .
 Degond, P; Liu, JG; Ringhofer, C, Evolution of the Distribution of Wealth in an Economic Environment Driven by Local Nash Equilibria,
Journal of Statistical Physics, vol. 154 no. 3
(2013),
pp. 130 [doi] [abs]
.
 Chen, X; Jüngel, A; Liu, JG, A Note on AubinLionsDubinskiǐ Lemmas,
Acta Applicandae Mathematicae, vol. 133 no. 1
(2013),
pp. 111 [doi] [abs]
.
 Degond, P; Liu, JG; Ringhofer, C, LargeScale Dynamics of MeanField Games Driven by Local Nash Equilibria,
Journal of Nonlinear Science, vol. 24 no. 1
(2013),
pp. 123 [doi] [abs]
.
 Chen, X; Liu, JG, Analysis of polymeric flow models and related compactness theorems in weighted spaces,
Siam Journal on Mathematical Analysis, vol. 45 no. 3
(2013),
pp. 11791215 [doi] [abs]
.
 Bian, S; Liu, JG, Dynamic and Steady States for MultiDimensional KellerSegel Model with Diffusion Exponent m > 0,
Communications in Mathematical Physics, vol. 323 no. 3
(2013),
pp. 154 [doi] [abs]
.
 Goudon, T; Jin, S; Liu, JG; Yan, B, Asymptoticpreserving schemes for kineticfluid modeling of disperse twophase flows,
Journal of Computational Physics, vol. 246
(2013),
pp. 145164 [doi] [abs]
.
 Chen, X; Liu, JG, Global weak entropy solution to DoiSaintillanShelley model for active and passive rodlike and ellipsoidal particle suspensions,
Journal of Differential Equations, vol. 254 no. 7
(2013),
pp. 27642802 [doi] [abs]
.
 Haack, J; Jin, S; Liu, J, An AllSpeed AsymptoticPreserving Method for the Isentropic Euler and NavierStokes Equations,
Communications in Computational Physics, vol. 12 no. 04
(October, 2012),
pp. 955980 [doi] [abs]
.
 Chen, L; Liu, JG; Wang, J, Multidimensional Degenerate Keller–Segel System with Critical Diffusion Exponent $2n/(n+2)$,
Siam Journal on Mathematical Analysis, vol. 44 no. 2
(January, 2012),
pp. 10771102 [doi] [abs]
.
 A. Chertock, J.G. Liu, and T. Pendleton, Convergence analysis of the particle method for the CamassaHolm equation,
in Proceedings of the 13th International Conference on ``Hyperbolic Problems: Theory, Numerics and Applications"
(2012),
pp. 365373, Higher Education Press .
 Chae, D; Liu, JG, Blowup, Zero α Limit and the Liouville Type Theorem for the EulerPoincaré Equations,
Communications in Mathematical Physics, vol. 314 no. 3
(2012),
pp. 671687 [doi] [abs]
.
 Chen, X; Liu, JG, Two nonlinear compactness theorems in L ^{p}(0,T;B),
Applied Mathematics Letters, vol. 25 no. 12
(2012),
pp. 22522257 [doi] [abs]
.
 Frouvelle, A; Liu, JG, Dynamics in a kinetic model of oriented particles with phase transition,
Siam Journal on Mathematical Analysis, vol. 44 no. 2
(2012),
pp. 791826 [doi] [abs]
.
 Carrillo, JA; Chen, L; Liu, JG; Wang, J, A note on the subcritical two dimensional KellerSegel system,
Acta Applicandae Mathematicae, vol. 119 no. 1
(2012),
pp. 4355 [doi] [abs]
.
 Degond, P; Liu, JG, Hydrodynamics of selfalignment interactions with precession and derivation of the LandauLifschitzGilbert equation,
Mathematical Models & Methods in Applied Sciences, vol. 22 no. SUPPL.1
(2012),
pp. 111400118 [doi] [abs]
.
 Chertock, A; Liu, JG; Pendleton, T, Convergence of a particle method and global weak solutions of a family of evolutionary PDEs,
Siam Journal on Numerical Analysis, vol. 50 no. 1
(2012),
pp. 121 [doi] [abs]
.
 Degond, P; Frouvelle, A; Liu, JG, Macroscopic Limits and Phase Transition in a System of Selfpropelled Particles,
Journal of Nonlinear Science, vol. 23 no. 3
(2012),
pp. 130 [doi] [abs]
.
 Acheritogaray, M; Degond, P; Frouvelle, A; Liu, JG, Kinetic formulation and global existence for the HallMagnetohydrodynamics system,
Kinetic and Related Models, vol. 4 no. 4
(November, 2011),
pp. 901918 [doi] [abs]
.
 Liu, JG; Lorz, A, A coupled chemotaxisfluid model: Global existence,
Annales De L'Institut Henri Poincare (C) Non Linear Analysis, vol. 28 no. 5
(September, 2011),
pp. 643652 [doi] [abs]
.
 Jin, S; Liu, JG; Wang, L, A domain decomposition method for semilinear hyperbolic systems with twoscale relaxations,
Math. Comp., vol. 82
(2011),
pp. 749779 .
 Zheng, W; Gao, H; Liu, JG; Zhang, Y; Ye, Q; Swank, C, General solution to gradientinduced transverse and longitudinal relaxation of spins undergoing restricted diffusion,
Physical Review A, vol. 84 no. 5
(2011),
pp. 0534118 [doi] [abs]
.
 Huang, YL; Liu, JG; Wang, WC, An FFT based fast poisson solver on spherical shells,
Communications in Computational Physics, vol. 9 no. 3
(2011),
pp. 649667 [doi] [abs]
.
 Liu, JG; Liu, J; Pego, RL, Stable and accurate pressure approximation for unsteady incompressible viscous flow,
Journal of Computational Physics, vol. 229 no. 9
(May, 2010),
pp. 34283453 [doi] [abs]
.
 Liu, JG; Mieussens, L, Analysis of an Asymptotic Preserving Scheme for Linear Kinetic Equations in the Diffusion Limit,
Siam Journal on Numerical Analysis, vol. 48 no. 4
(January, 2010),
pp. 14741491 [repository], [doi] [abs]
.
 Liu, JG; Pego, R, Stable discretization of magnetohydrodynamics in bounded domains,
Commun. Math. Sci., vol. 8 no. 1
(2010),
pp. 234251 [abs]
.
 Liu, JG; Pego, RL, Stable discretization of magnetohydrodynamics in bounded domains,
Communications in Mathematical Sciences, vol. 8 no. 1
(2010),
pp. 235251 [abs]
.
 Liu, JG; Liu, J; Pego, RL, Error estimates for finiteelement NavierStokes solvers without standard InfSup conditions,
Chinese Annals of Mathematics, Series B, vol. 30 no. 6
(2009),
pp. 743768 [doi] [abs]
.
 Liu, JG; Wang, WC, Characterization and regularity for axisymmetric solenoidal vector fields with application to navierstokes equation,
Siam Journal on Mathematical Analysis, vol. 41 no. 5
(2009),
pp. 18251850 [doi] [abs]
.
 Ha, SY; Liu, JG, A simple proof of the CuckerSmale flocking dynamics and meanfield limit,
Communications in Mathematical Sciences, vol. 7 no. 2
(2009),
pp. 297325 [doi] [abs]
.
 Hsia, CH; Liu, JG; Wang, C, Structural stability and bifurcation for 2D incompressible ows with symmetry,
Meth. Appl. Anal., vol. 15
(2008),
pp. 495512 .
 Lin, P; Liu, JG; Lu, X, Long time numerical solution of the NavierStokes equations based on a sequential regularization formulation,
Siam Journal on Scientific Computing, vol. 31 no. 1
(2008),
pp. 398419 [doi] [abs]
.
 Liu, JG; Wang, C, A fourth order numerical method for the primtive equations formulated in mean vorticity,
Communications in Computational Physics, vol. 4 no. 1
(2008),
pp. 2655 [abs]
.
 Degond, P; Liu, JG; Vignal, MH, Analysis of an asymptotic preserving scheme for the EulerPoisson system in the quasineutral limit,
Siam Journal on Numerical Analysis, vol. 46 no. 3
(2008),
pp. 12981322 [doi] [abs]
.
 Lu, X; Lin, P; Liu, JG, Analysis of a sequential regularization method for the unsteady NavierStokes equations,
Mathematics of Computation, vol. 77 no. 263
(2008),
pp. 14671494 [doi] [abs]
.
 Liu, JG; Liu, J; Pego, RL, Stability and convergence of efficient NavierStokes solvers via a commutator estimate,
Communications on Pure and Applied Mathematics, vol. 60 no. 10
(October, 2007),
pp. 14431487 [doi] [abs]
.
 J.G. Liu, Jie Liu and R. Pego, Estimates on the Stokes pressure by partitioning the energy of harmonic functions,
in Kyoto Conference on the NavierStokes equations and their Applications, edited by Y. Giga, H. Kozono, H. Okamoto and Y. Shibta
(2007),
pp. 251270, Kyoto Univ. [abs]
.
 Liu, JG; Liu, J; Pego, R, Stability and convergence of efficient NavierStokes solvers via a commutator estimate via a commutator estimate,
Comm. Pure Appl. Math., vol. 60
(2007),
pp. 14431487 .
 Degond, P; Jin, S; Liu, JG, Machnumber uniform asymptotic preserving Gauge schemes for compressible flows,
Bulletin of the Institute of Mathematics Academia Sinica (New Series), vol. 2
(2007),
pp. 851892 [abs]
.
 Antman, SS; Liu, JG, Basic themes and pretty problems of nonlinear solid mechanics,
Milan Journal of Mathematics, vol. 75 no. 1
(2007),
pp. 135176 [doi] [abs]
.
 Moore, J; Cheng, Z; Hao, J; Guo, G; Liu, JG; Lin, C; Yu, L, Effects of solidstate yeast treatment on the antioxidant properties and protein and fiber compositions of common hard wheat bran,
Journal of Agricultural and Food Chemistry, vol. 55 no. 25
(2007),
pp. 1017310182(published on Web 10/30/2007.)
[doi] [abs]
.
 Moore, J; Liu, JG; Zhou, K; Yu, LL, Effects of genotype and environment on the antioxidant properties of hard winter wheat bran.,
Journal of Agricultural and Food Chemistry, vol. 54 no. 15
(July, 2006),
pp. 53135322 [doi] [abs]
.
 J.G. Liu, Jie Liu and R. Pego, On incompressible NavierStokes dynamics: a new approach for analysis and computation,
in Proceedings of the Tenth International Conference on Hyperbolic Problems, edited by F. Asakura, etc
(2006),
pp. 2944, Yokohama Publishers, Inc. .
 Degond, P; Liu, JG; Mieussens, L, Macroscopic fluid models with localized kinetic upscaling effects,
Multiscale Modeling & Simulation, vol. 5 no. 3
(2006),
pp. 940979 [doi] [abs]
.
 Liu, JG; Wang, WC, Convergence analysis of the energy and helicity preserving scheme for axisymmetric flows,
Siam Journal on Numerical Analysis, vol. 44 no. 6
(2006),
pp. 24562480 [doi] [abs]
.
 Liu, JG; Samelson, R; Wang, C, Global weak solution of planetary geostrophic equations with inviscid geostrophic balance,
Applicable Analysis, vol. 85
(2006),
pp. 593605 .
 Li, B; Liu, JG, Epitaxial Growth Without Slope Selection: Energetics, Coarsening, and Dynamic Scaling,
Journal of Nonlinear Science, vol. 14 no. 5
(October, 2004),
pp. 429451 [doi] [abs]
.
 Johnston, H; Liu, JG, Accurate, stable and efficient Navier–Stokes solvers based on explicit treatment of the pressure term,
Journal of Computational Physics, vol. 199 no. 1
(September, 2004),
pp. 221259 [doi] [abs]
.
 Liu, JG; Wang, WC, Energy and helicity preserving schemes for hydro and magnetohydrodynamics flows with symmetry,
Journal of Computational Physics, vol. 200 no. 1
(2004),
pp. 833 [doi] [abs]
.
 Lin, HE; Liu, JG; Xu, WQ, Effects of small viscosity and far field boundary conditions for hyperbolic systems,
Communications on Pure and Applied Analysis, vol. 3 no. 2
(2004),
pp. 267290 [abs]
.
 Liu, JG; Xu, WQ, Far field boundary condition for convection diffusion equation at zero viscosity limit,
Quarterly of Applied Mathematics, vol. 62 no. 1
(2004),
pp. 2752 [abs]
.
 Wang, C; Liu, JG; Johnston, H, Analysis of a fourth order finite difference method for the incompressible Boussinesq equations,
Numerische Mathematik, vol. 97 no. 3
(2004),
pp. 555594 [doi] [abs]
.
 Li, B; Liu, JG, Eptaxial growth without slope selection: energetics, coarsening, and dynamic scaling,
J. Nonlinear Sci., vol. 14 no. 5
(2004),
pp. 429451 [doi] [abs]
.
 Ghil, M; Liu, JG; Wang, C; Wang, S, Boundarylayer separation and adverse pressure gradient for 2D viscous incompressible flow,
Physica D: Nonlinear Phenomena, vol. 197 no. 12
(2004),
pp. 149173 [doi] [abs]
.
 Liu, JG; Wang, C, High order finite difference method for unsteady incompressible flow on multiconnected domain in vorticitystream function formulation,
Computer and Fluids, vol. 33 no. 2
(2004),
pp. 223255 [doi] [abs]
.
 Liu, JG; Wang, C, High order finite difference methods for unsteady incompressible flows in multiconnected domains,
Computers and Fluids, vol. 33 no. 2
(2004),
pp. 223255 [doi] [abs]
.
 LI, B; LIU, JG, Thin film epitaxy with or without slope selection,
European Journal of Applied Mathematics, vol. 14 no. 6
(December, 2003),
pp. 713743 [doi] [abs]
.
 Liu, JG; Wang, C; Johnston, H, A Fourth Order Scheme for Incompressible Boussinesq Equations,
Journal of Scientific Computing, vol. 18 no. 2
(April, 2003),
pp. 253285 [doi] [abs]
.
 Wang, C; Liu, JG, Fourth order convergence of a compact difference solver for incompressible flow,
Commun. Appl. Anal., vol. 7
(2003),
pp. 171191 .
 Wang, C; Liu, JG, Positivity property of secondorder fluxsplitting schemes for the compressible Euler equations,
Discrete and Continuous Dynamical Systems  Series B, vol. 3 no. 2
(2003),
pp. 201228 [abs]
.
 ChainaisHillairet, C; Liu, JG; Peng, YJ, Finite volume scheme for multidimensional driftdiffusion equations and convergence analysis,
Mathematical Modelling and Numerical Analysis, vol. 37 no. 2
(2003),
pp. 319338 [abs]
.
 Duraisamy, K; Baeder, JD; Liu, JG, Concepts and Application of TimeLimiters to High Resolution Schemes,
Journal of Scientific Computing, vol. 19 no. 13
(2003),
pp. 139162 [doi] [abs]
.
 Weinan, E; Liu, JG, Gauge method for viscous incompressible flows,
Comm. Math. Sci., vol. 1
(2003),
pp. 317332 .
 Chern, IL; Liu, JG; Wang, WC, Accurate evaluation of electrostatics for macromolecules in solution,
Methods and Applications of Analysis, vol. 10
(2003),
pp. 309328 .
 Johnston, H; Liu, JG, Finite Difference Schemes for Incompressible Flow Based on Local Pressure Boundary Conditions,
Journal of Computational Physics, vol. 180 no. 1
(July, 2002),
pp. 120154 [doi] [abs]
.
 Wang, C; Liu, JG, Analysis of finite difference schemes for unsteady NavierStokes equations in vorticity formulation,
Numerische Mathematik, vol. 91 no. 3
(2002),
pp. 543576 [doi] [abs]
.
 Weinan, E; Liu, JG, Projection method III: Spatial discretization on the staggered grid,
Mathematics of Computation, vol. 71 no. 237
(2002),
pp. 2747 [doi] [abs]
.
 Liu, JG; Xin, Z, Convergence of the point vortex method for 2D vortex sheet,
Mathematics of Computation, vol. 70 no. 234
(2001),
pp. 595606 [doi] [abs]
.
 Liu, JG; Weinan, E, Simple finite element method in vorticity formulation for incompressible flows,
Mathematics of Computation, vol. 70 no. 234
(2001),
pp. 579593 [doi] [abs]
.
 Liu, JG; Wang, WC, An energypreserving MACYee scheme for the incompressible MHD equation,
Journal of Computational Physics, vol. 174 no. 1
(2001),
pp. 1237 [doi] [abs]
.
 Liu, JG; Weinan, E, Simple finite element method in vorticity formulation for incompressible flow,
Math. Comp., vol. 69
(2001),
pp. 13851407 .
 Liu, JG; Xin, Z, Convergence of point vortex method for 2D vortex sheet,
Math. Comp., vol. 70 no. 234
(2001),
pp. 565606 [doi] [abs]
.
 Weinan, E; Liu, JG, Gauge finite element method for incompressible flows,
International Journal for Numerical Methods in Fluids, vol. 34 no. 8
(December, 2000),
pp. 701710 [doi] [abs]
.
 Liu, JG; Shu, CW, A HighOrder Discontinuous Galerkin Method for 2D Incompressible Flows,
Journal of Computational Physics, vol. 160 no. 2
(May, 2000),
pp. 577596 [doi] [abs]
.
 Liu, JG; Xin, Z, Convergence of a Galerkin method for 2D discontinuous Euler flows,
Communications on Pure and Applied Mathematics, vol. 53 no. 6
(January, 2000),
pp. 786798 [doi] [abs]
.
 Wang, C; Liu, JG, Convergence of gauge method for incompressible flow,
Mathematics of Computation, vol. 69 no. 232
(2000),
pp. 13851407 [abs]
.
 Lefloch, PG; Liu, JG, Generalized monotone schemes, discrete paths of extrema, and discrete entropy conditions,
Mathematics of Computation, vol. 68 no. 227
(1999),
pp. 10251055 [abs]
.
 Wang, ZJ; Liu, JG; Childress, S, Connection between corner vortices and shear layer instability in flow past an ellipse,
Physics of Fluids, vol. 11 no. 9
(1999),
pp. 24462448 [abs]
.
 Xu, E; Liu, JG, Pricing of mortgagebacked securities with optionadjusted spread,
Managerial Finance, vol. 24
(1998),
pp. 94109 .
 Choi, H; Liu, JG, The Reconstruction of Upwind Fluxes for Conservation Laws: Its Behavior in Dynamic and Steady State Calculations,
Journal of Computational Physics, vol. 144 no. 2
(1998),
pp. 237256 [doi] [abs]
.
 Weinan, E; Liu, JG, Finite Difference Methods for 3D Viscous Incompressible Flows in the VorticityVector Potential Formulation on Nonstaggered Grids,
Journal of Computational Physics, vol. 138 no. 1
(1997),
pp. 5782 [doi] [abs]
.
 Chen, GQ; Liu, JG, Convergence of difference schemes with high resolution for conservation laws,
Mathematics of Computation, vol. 66 no. 219
(1997),
pp. 10271053 [abs]
.
 Weinan, E; Liu, JG, Finite difference schemes for incompressible flows in the velocity  impulse density formulation,
Journal of Computational Physics, vol. 130 no. 1
(1997),
pp. 6776 [abs]
.
 Jin, S; Liu, JG, Oscillations induced by numerical viscosities,
Mat. Contemp., vol. 10
(1996),
pp. 169180 .
 Jin, S; Liu, JG, The effects of numerical viscosities: I. Slowly moving shocks,
Journal of Computational Physics, vol. 126 no. 2
(1996),
pp. 373389 [doi] [abs]
.
 Weinan, E; Liu, JG, Vorticity boundary condition and related issues for finite difference schemes,
Journal of Computational Physics, vol. 124 no. 2
(1996),
pp. 368382 [doi] [abs]
.
 Weinan, E; Liu, JG, Essentially compact schemes for unsteady viscous incompressible flows,
Journal of Computational Physics, vol. 126 no. 1
(1996),
pp. 122138 [doi] [abs]
.
 Weinan, E; Liu, JG, Projection method II: GodunovRyabenki analysis,
SIAM Journal on Numerical Analysis, vol. 33 no. 4
(1996),
pp. 15971621 [abs]
.
 Levermore, CD; Liu, JG, Large oscillations arising in a dispersive numerical scheme,
Physica D: Nonlinear Phenomena, vol. 99 no. 23
(1996),
pp. 191216 [abs]
.
 Liu, JG; Xin, Z, Kinetic and viscous boundary layers for broadwell equations,
Transport Theory and Statistical Physics, vol. 25 no. 35
(1996),
pp. 447461 [abs]
.
 Liu, JG; Xin, Z, Boundary layer behavior in the fluiddynamic limit for a nonlinear model Boltzmann equation,
Arch. Rat. Mech. Anal., vol. 135
(1996),
pp. 61105 .
 Weinan, E; Liu, JG, Projection method I: convergence and numerical boundary layers,
SIAM J. Numer. Anal., vol. 32
(1995),
pp. 10171057 .
 Liu, JG; Xin, Z, Convergence of vortex methods for weak solutions to the 2D Euler equations with vortex sheets data,
Comm. Pure Appl. Math., vol. 48
(1995),
pp. 611628 .
 Lefloch, P; Liu, JG, Discrete entropy and monotonicity criteria for hyperbolic conservation laws,
C.R. Acad. Sci. Paris., vol. 319
(1994),
pp. 881886 .
 Jin, S; Liu, JG, Relaxation and diffusion enhanced dispersive waves,
Proceedings of The Royal Society of London, Series A: Mathematical and Physical Sciences, vol. 446 no. 1928
(1994),
pp. 555563 [abs]
.
 Chen, GQ; Liu, JG, Convergence of secondorder schemes for isentropic gas dynamics,
Math. Comp., vol. 61
(1993),
pp. 607629 .
 Engquist, B; Liu, JG, Numerical methods for oscillatory solutions to hyperbolic problems,
Comm. Pure Appl. Math., vol. 46
(1993),
pp. 13271361 .
 Liu, JG; Xin, Z, L1stability of stationary discrete shocks,
Math. Comp., vol. 60
(1993),
pp. 233244 .
 Liu, JG; Xin, Z, Nonlinear stability of discrete shocks for systems of conservation laws,
Archive for Rational Mechanics and Analysis, vol. 125 no. 3
(1993),
pp. 217256 [doi] [abs]
.

Papers Accepted

 Degond, P; Liu, JG; Pego, RL, Coagulation–Fragmentation Model for Animal GroupSize Statistics,
Journal of Nonlinear Science, vol. 27 no. 2
(April, 2017),
pp. 379424 [doi] .
 Huang, H; Liu, JG, Error estimate of a random particle blob method for the KellerSegel equation,
Mathematics of Computation, vol. 86 no. 308
(February, 2017),
pp. 27192744 [doi] .
 Liu, JG; Wang, J, Global existence for a thin film equation with subcritical mass,
Discrete and Continuous Dynamical Systems Series B, vol. 22 no. 4
(February, 2017),
pp. 14611492 [doi] .
 Liu, JG; Yang, R, A random particle blob method for the KellerSegel equation and convergence analysis,
Mathematics of Computation, vol. 86 no. 304
(May, 2016),
pp. 725745 [doi] .
 P. Degond, J.G. Liu, S. MerinoAceituno, T. Tardiveau, Continuum dynamics of the intention field under weakly cohesive social interactions,
Math. Models Methods Appl. Sci.
(2016) .
 Y. Gao, J.G. Liu, J. Lu, Continuum limit of a mesoscopic model of step motion on vicinal surfaces,
J. Nonlinear Science
(2016) .