Jin, Shi - Department of Mathematics, University of Wisconsin at Madison

• COMMUN. MATH. SCI. c 2008 International Press Vol. 6, No. 4, pp. 9951020
• Computing multivalued physical observables for the semiclassical limit of the Schrodinger equation
• On the Computation of Roll Waves Shi Jin 1 and Yong Jung Kim 2
• Robust Numerical Simulation of Porosity Evolution in Chemical Vapor Infiltration I: Two Space
• A Diffusive Subcharacteristic Condition for Hyperbolic Systems with Diffusive Relaxation
• Proceedings of Symposia in Applied Mathematics Numerical methods for hyperbolic systems with singular
• Relaxation and the ChapmanEnskog Expansion School of Mathematics
• SIAM J. NUMER. ANAL. c 2006 Society for Industrial and Applied Mathematics Vol. 44, No. 5, pp. 18011828
• ON THE TIME SPLITTING SPECTRAL METHOD FOR THE COMPLEX GINZBURGLANDAU EQUATION IN THE LARGE
• Manuscript submitted to Website: http://AIMsciences.org AIMS' Journals
• COMMUNICATIONS IN COMPUTATIONAL PHYSICS Vol. 4, No. 5, pp. 1106-1128
• Physica D 182 (2003) 4685 Multi-phase computations of the semiclassical limit of the
• -stability of a Hamiltonian-preserving scheme for the Liouville equation with
• A SMOOTH TRANSITION MODEL BETWEEN KINETIC AND DIFFUSION EQUATIONS #
• Kinetic and Related Models doi:10.3934/krm.2011.4.295 c American Institute of Mathematical Sciences
• Robust Numerical Simulation of Porosity Evolution in Chemical Vapor Infiltration III: Three Space
• Relaxation of the Burnett Equations School of Mathematics
• SIAM J. SCI. COMPUT. c fl ??? Society for Industrial and Applied Mathematics
• MULTISCALE MODEL. SIMUL. c 2006 Society for Industrial and Applied Mathematics Vol. 5, No. 4, pp. 10631086
• The random projection method for sti detonation Weizhu Bao and Shi Jin y
• Asymptotic-Preserving (AP) Schemes for Multiscale Kinetic Equations: a Uni ed Approach
• Computing multi-valued physical observables for the high frequency limit of symmetric hyperbolic systems
• A NOVEL NUMERICAL METHOD FOR THE SEMICLASSICAL LIMIT OF THE SCHRODINGER EQUATION AND THE VLASOV-POISSION
• AN ASYMPTOTIC PRESERVING SCHEME FOR THE ES-BGK MODEL OF THE BOLTZMANN EQUATION
• ASYMPTOTIC PRESERVING (AP) SCHEMES FOR MULTISCALE KINETIC AND HYPERBOLIC EQUATIONS: A REVIEW
• Bloch decomposition-based Gaussian beam method for the Schrdinger equation with periodic potentials
• Mach-Number Uniform Asymptotic-Preserving Gauge Schemes for Compressible Flows
• NUMERICAL SIMULATION OF THE NONLINEAR SCHRODINGER EQUATION WITH MULTI-DIMENSIONAL PERIODIC POTENTIALS
• Computation of Transmissions and Reflections in Geometrical Optics via the Reduced Liouville
• THE RANDOM PROJECTION METHOD WEIZHU BAO \Lambda AND SHI JIN y
• THE CONVERGENCE OF NUMERICAL TRANSFER SCHEMES IN DIFFUSIVE REGIMES I: DISCRETEORDINATE METHOD
• Numerical simulation of a generalized Zakharov system q Shi Jin a,b,*, Peter A. Markowich c
• Hamiltonian-preserving schemes for the Liouville equation of geometrical optics with discontinuous local wave speeds
• Wave Patterns and Slow Motions in Inviscid and Viscous Hyperbolic Equations with Stiff Reaction Terms
• A numerical study of the Gaussian beam methods for one-dimensional Schrodinger-Poisson equations
• A Coherent Semiclassical Transport Model for Pure-state Quantum Scattering
• A micro-macro decomposition based asymptotic-preserving scheme for the multispecies
• Computation of the Semiclassical Limit of the Schrodinger Equation with Phase Shift by a Level Set
• Robust Numerical Simulation of Porosity Evolution in Chemical Vapor In ltration II: Two Dimensional
• A smooth transition model between kinetic and hydrodynamic equations
• A class of asymptotic-preserving schemes for kinetic equations and related problems with stiff sources q
• -ERROR ESTIMATES FOR A HAMILTONIAN-PRESERVING SCHEME FOR THE LIOUVILLE EQUATION WITH PIECEWISE
• A steady-state capturing method for hyperbolic systems with geometrical source terms
• A Hybrid Phase-Flow Method for Hamiltonian Systems with Discontinuous Hamiltonians
• The random projection method for stiff multispecies detonation capturing
• Regularization of the Burnett Equations for Fast Granular Flows via Relaxation School of Mathematics
• HIGH FREQUENCY BEHAVIOR OF THE FOCUSING NONLINEAR ODINGER EQUATION WITH RANDOM INHOMOGENEITIES
• The Vlasov-Poisson Equations as the Semiclassical Limit of the Schrodinger-Poisson Equations: A
• A time-splitting spectral scheme for the MaxwellDirac system Zhongyi Huang a,*, Shi Jin a,b
• Asymptotic-Preserving schemes for kineticfluid modeling of disperse two-phase flows
• A numerical scheme for the quantum Fokker-Planck-Landau equation
• A Domain Decomposition Method for Semilinear Hyperbolic Systems with Two-scale Relaxations
• SIMULATION OF FLUIDPARTICLE FLOWS: HEAVY PARTICLES, FLOWING REGIME AND ASYMPTOTIC-PRESERVING SCHEMES
• On the random choice method for the Liouville equation of geometrical optics with discontinuous local wave speeds
• A NUMERICAL SCHEME FOR THE QUANTUM BOLTZMANN EQUATION EFFICIENT IN VARIOUS REGIMES
• This article appeared in a journal published by Elsevier. The attached copy is furnished to the author for internal non-commercial research
• Acta Numerica (2011), pp. 121209 c Cambridge University Press, 2011 doi:10.1017/S0962492911000031 Printed in the United Kingdom
• MULTISCALE MODEL. SIMUL. c 2011 Society for Industrial and Applied Mathematics Vol. 9, No. 1, pp. 258281
• Commun. Comput. Phys. doi: 10.4208/cicp.091009.160310s
• Recent computational methods for high frequency waves in heterogeneous media
• ON A UNIFORMLY SECOND ORDER NUMERICAL METHOD FOR THE ONE-DIMENSIONAL DISCRETE-ORDINATE TRANSPORT
• Computation of interface reflection and regular or diffuse transmission of the planar symmetric
• Convergence of an immersed interface upwind scheme for linear advection equations with
• A Semiclassical Transport Model for Two-dimensional Thin Quantum Barriers
• SIAM J. SCI. COMPUT. c 2007 Society for Industrial and Applied Mathematics Vol. 29, No. 2, pp. 515538
• Numerical Study of a Domain Decomposition Method for a Two-Scale Linear Transport Equation
• Two interface type numerical methods for computing hyperbolic systems with geometrical
• Eulerian calculations of wave breaking and multi-valued solutions in a traveling wave tube
• Submitted to Phys. Rev. E, March 2003 An Eulerian method for computing multi-valued solutions of the Euler-Poisson
• Journal of Computational Physics 161, 312330 (2000) doi:10.1006/jcph.2000.6506, available online at http://www.idealibrary.com on
• A DOMAIN DECOMPOSITION ANALYSIS FOR A TWO-SCALE LINEAR TRANSPORT PROBLEM
• On Kinetic Flux Vector Splitting Schemes for Quantum Euler Equations
• -error estimates on the immersed interface upwind scheme for linear convection equations with piecewise constant coefficients: a
• Computational high frequency waves through curved interfaces via the Liouville equation and Geometric
• A Time-Splitting Spectral Method for the Generalized Zakharov System in Multi-dimensions
• Journal of Hyperbolic Differential Equations Vol. 3, No. 4 (2006) 741777
• FRONT MOTION IN MULTI-DIMENSIONAL VISCOUS CONSERVATION LAWS
• An efficient method for computing hyperbolic systems with geometrical source terms having
• A Hybrid Schrdinger/Gaussian Beam Solver for Quantum Barriers and Surface Hopping
• A level set method for the semiclassical limit of the Schrdinger equation with discontinuous potentials
• An asymptotic preserving scheme for the Vlasov-Poisson-Fokker-Planck system in the high field regime
• A successive penaltybased Asymptotic-Preserving scheme for kinetic equations
• A BGK-penalization asymptotic-preserving scheme for the multispecies Boltzmann equation
• GAUSSIAN BEAM METHODS FOR THE DIRAC EQUATION IN THE SEMI-CLASSICAL REGIME
• Asymptotic-Preserving schemes for kineticfluid modeling of disperse two-phase flows with variable fluid density
• Noname manuscript No. (will be inserted by the editor)