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- M372K -PDE's and applications (Fall 2002) Professor: Irene Gamba -Textbook: Elementary Applied PDEs, By R. Haberman
- Device Benchmark Comparisons via Kinetic, Hydrodynamic, and High-Field Models
- Journal of Statistical Physics, Vol. 116, No. 5/6, September 2004 ( 2004) Moment Inequalities and High-Energy Tails for
- Journal of Computational Mathematics Vol.28, No.4, 2010, 430460.
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- ON THE SELF-SIMILAR ASYMPTOTICS FOR GENERALIZED NON-LINEAR KINETIC MAXWELL MODELS
- METHODS OF APPLIED MATHEMATICS II MATH 383D, Unique #55275 and CAM 385D, Unique #61120
- A discontinuous Galerkin method for the Vlasov-Poisson system
- THE LINEAR BOLTZMANN EQUATION WITH SPACE PERIODIC ELECTRIC FIELD
- M372K -PDE's and applications (Fall 2002) Professor: Irene Gamba -Textbook: Elementary Applied PDEs, By R. Haberman
- A WENO-solver for the transients of BoltzmannPoisson system for semiconductor
- ECUACIONES EN DERIVADAS PARCIALES Topicos previos
- SOLUTIONS OF THE LINEAR BOLTZMANN EQUATION AND SOME DIRICHLET SERIES
- Kinetic and Related Models doi:10.3934/krm.2011.4.41 c American Institute of Mathematical Sciences
- A discontinuous Galerkin solver for Boltzmann Poisson systems in nano Yingda Cheng2
- For the spatially homogeneous Boltzmann equation with cutoff hard po-tentials it is shown that solutions remain bounded from above, uniformly
- A Viscous Approximationfor a 2-D SteadySemiconductoror
- On the blowing up of solutions to quantum hydrodynamic models on bounded domains
- PROPAGATION OF L1 AND L MAXWELLIAN WEIGHTED BOUNDS FOR DERIVATIVES OF SOLUTIONS TO THE HOMOGENEOUS
- A REVISION ON CLASSICAL SOLUTIONS TO THE CAUCHY BOLTZMANN PROBLEM FOR SOFT POTENTIALS
- Viscous approximation to transonic gas dynamics: ow past pro les and charged{particle systems
- POSITIVITY-PRESERVING DISCONTINUOUS GALERKIN SCHEMES FOR LINEAR VLASOV-BOLTZMANN TRANSPORT
- Arch. Rational Mech. Anal. 156 (2001) 183203 Digital Object Identifier (DOI) 10.1007/s002050100114
- THE MILNE PROBLEM FOR HIGH FIELD KINETIC EQUATIONS N. BEN ABDALLAH, I. M. GAMBA, AND AXEL KLAR
- Performance of a Discontinuous Galerkin Solver for Semiconductor Boltzmann Equations
- This article was downloaded by:[University of Texas Austin] [University of Texas Austin]
- S0764-4442(00)01759-6/FLA AID:1759 Vol.331(0) P.1 (1-6) CRAcad 2000/06/15 Prn:27/11/2000; 13:21 F:PXMA1759.tex by:Au p. 1
- Boundary-layer formation for viscosity approximations in transonic flow Irene Martfnez Gamba@
- CONVOLUTION INEQUALITIES FOR THE BOLTZMANN COLLISION OPERATOR
- Numerical study of Vlasov-Poisson equations in the simulation for infinite homogeneous stellar systems
- A brief survey of the discontinuous Galerkin method for the Boltzmann-Poisson equations1
- A discontinuous Galerkin method for the Vlasov-Poisson system
- A Discontinuous Galerkin Solver for Full-Band Boltzmann-Poisson Models
- GLOBAL EXISTENCE OF SOLUTIONS TO ONE-DIMENSIONAL VISCOUS QUANTUM HYDRODYNAMIC EQUATIONS
- DISTRIBUTIONAL AND CLASSICAL SOLUTIONS TO THE CAUCHY BOLTZMANN PROBLEM FOR SOFT POTENTIALS
- Kinetic and Related Models doi:10.3934/krm.2009.2.xx c American Institute of Mathematical Sciences
- Boundary Value Problems for the Stationary Vlasov-Boltzmann-Poisson Equation
- Journal of Computational Electronics X:YYY-ZZZ,200? c 2006 Springer Science Business Media, Inc. Manufactured in The Netherlands
- Spectral -Lagrangian methods for Collisional Models of Non -Equilibrium Statistical States
- Discontinuous Galerkin Solver for the Semiconductor Boltzmann Equation
- POSITIVITY-PRESERVING DISCONTINUOUS GALERKIN SCHEMES FOR LINEAR VLASOV-BOLTZMANN TRANSPORT
- J Comput Electron DOI 10.1007/s10825-006-0035-4
- 2D semiconductor device simulations by WENO-Boltzmann schemes: Efficiency, boundary
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- 0022-4715/01/0600-1137$19.50/0 2001 Plenum Publishing Corporation Journal of Statistical Physics, Vol. 103, Nos. 5/6, 2001
- Steady states of a Boltzmann equation for driv en gran ular media
- Constraints on Possible Singularities for the Unsteady Transonic Small Disturbance (UTSD) Equations
- Sharp Uniform Bounds for Steady Potential Fluid-Poisson Systems Irene M. Gamba1
- A NOTE ON THE TIME DECAY OF SOLUTIONS FOR THE LINEARIZED WIGNER-POISSON SYSTEM
- Introduction to Schrodinger Equation: Harmonic Potential
- A discontinuous Galerkin method for the Vlasov-Poisson system
- METHODS OF APPLIED MATHEMATICS II MATH 383D, Unique #55275 and CAM 385D, Unique #61120
- THE MILNE PROBLEM FOR HIGH FIELD KINETIC EQUATIONS N. BEN ABDALLAH, I. M. GAMBA, AND AXEL KLAR
- A WENO-solver for the transients of BoltzmannPoisson system for semiconductor
- A Discontinuous Galerkin Solver for Full-Band Boltzmann-Poisson Models
- Boundary-layer formation for viscosity approximations in transonic flow Irene Martfnez Gamba@
- For the spatially homogeneous Boltzmann equation with cutoff hard po-tentials it is shown that solutions remain bounded from above, uniformly
- 0 0.1 0.2 0.3 0.4 0.5 0.6 Kinetic,concentration n
- Numerical study of Vlasov-Poisson equations in the simulation for infinite homogeneous stellar systems
- A REVISION ON CLASSICAL SOLUTIONS TO THE CAUCHY BOLTZMANN PROBLEM FOR SOFT POTENTIALS
- Kinetic and Related Models doi: c American Institute of Mathematical Sciences
- CONVOLUTION INEQUALITIES FOR THE BOLTZMANN COLLISION OPERATOR
- A discontinuous Galerkin solver for Boltzmann Poisson systems in nano Yingda Cheng2
- A brief survey of the discontinuous Galerkin method for the Boltzmann-Poisson equations1
- SOLUTIONS OF THE LINEAR BOLTZMANN EQUATION AND SOME DIRICHLET SERIES
- Steady states of a Boltzmann equation for driv en gran ular media
- Performance of a Discontinuous Galerkin Solver for Semiconductor Boltzmann Equations
- Discontinuous Galerkin Solver for the Semiconductor Boltzmann Equation
- Journal of Statistical Physics, Vol. 116, No. 5/6, September 2004 ( 2004) Moment Inequalities and High-Energy Tails for
- Kinetic and Related Models doi:10.3934/krm.2011.4.41 c American Institute of Mathematical Sciences
- THE LINEAR BOLTZMANN EQUATION WITH SPACE PERIODIC ELECTRIC FIELD
- Device Benchmark Comparisons via Kinetic, Hydrodynamic, and High-Field Models
- This article was downloaded by:[University of Texas Austin] [University of Texas Austin]
- Availableonline at www.sciencedirect.com MATHEMATICAL SCIENCE ~___~DIREZCT e COMPUTER
- 0022-4715/01/0600-1137$19.50/0 2001 Plenum Publishing Corporation Journal of Statistical Physics, Vol. 103, Nos. 5/6, 2001
- Sharp Uniform Bounds for Steady Potential Fluid-Poisson Systems Irene M. Gamba1
- POSITIVITY-PRESERVING DISCONTINUOUS GALERKIN SCHEMES FOR LINEAR VLASOV-BOLTZMANN TRANSPORT
- DISTRIBUTIONAL AND CLASSICAL SOLUTIONS TO THE CAUCHY BOLTZMANN PROBLEM FOR SOFT POTENTIALS
- Boundary Value Problems for the Stationary Vlasov-Boltzmann-Poisson Equation
- S0764-4442(00)01759-6/FLA AID:1759 Vol.331(0) P.1 (1-6) CRAcad 2000/06/15 Prn:27/11/2000; 13:21 F:PXMA1759.tex by:Au p. 1
- PROPAGATION OF L1 AND L MAXWELLIAN WEIGHTED BOUNDS FOR DERIVATIVES OF SOLUTIONS TO THE HOMOGENEOUS
- Journal of Computational Mathematics Vol.28, No.4, 2010, 430460.
- A Viscous Approximationfor a 2-D SteadySemiconductoror
- Journal of Computational Electronics 2: 375380, 2003 c 2003 Kluwer Academic Publishers. Manufactured in The Netherlands.
- A NOTE ON THE TIME DECAY OF SOLUTIONS FOR THE LINEARIZED WIGNER-POISSON SYSTEM
- Kinetic and Related Models doi:10.3934/krm.2009.2.xx c American Institute of Mathematical Sciences
- Constraints on Possible Singularities for the Unsteady Transonic Small Disturbance (UTSD) Equations
- ON THE SELF-SIMILAR ASYMPTOTICS FOR GENERALIZED NON-LINEAR KINETIC MAXWELL MODELS
- 2D semiconductor device simulations by WENO-Boltzmann schemes: Efficiency, boundary
- Spectral -Lagrangian methods for Collisional Models of Non -Equilibrium Statistical States
- On the blowing up of solutions to quantum hydrodynamic models on bounded domains
- Simulation of the Transient Behavior of a One-Dimensional Semiconductor Device II Author(s): Irene Martinez Gamba and Maria Cristina J. Squeff
- Arch. Rational Mech. Anal. 156 (2001) 183203 Digital Object Identifier (DOI) 10.1007/s002050100114
- A discontinuous Galerkin method for the Vlasov-Poisson system
- GLOBAL EXISTENCE OF SOLUTIONS TO ONE-DIMENSIONAL VISCOUS QUANTUM HYDRODYNAMIC EQUATIONS
- Journal of Computational Electronics X:YYY-ZZZ,200? c 2006 Springer Science Business Media, Inc. Manufactured in The Netherlands
- UNCORRECTEDPROOF Physica D 2551 (2000) 118
- Viscous approximation to transonic gas dynamics: ow past pro les and charged{particle systems
- J Comput Electron DOI 10.1007/s10825-006-0035-4
- Digital Object Identifier (DOI) 10.1007/s00220-004-1051-5 Commun. Math. Phys. 246, 503541 (2004) Communications in
