- Local Existence of Solutions to the Transient Quantum Hydrodynamic Equations
- Convergence of an Entropic Semi-discretization for Nonlinear Fokker-Planck Equations in Rd
- Convergence of a high-order compact finite difference scheme
- Asymptotic limits for quantum trajectory models
- Zero-mass-electrons limits in hydrodynamic models for plasmas Thierry Goudon
- Global existence of solutions to one-dimensional viscous quantum hydrodynamic equations
- A mixed finite-element scheme of a semiconductor energy-transport model
- Entropy dissipation methods for degenerate parabolic problems
- High order compact nite di erence schemes for a nonlinear Black-Scholes equation
- Analysis of a Spherical Harmonics Expansion Model of Plasma Physics
- EFFECTIVE VELOCITY IN COMPRESSIBLE NAVIER-STOKES EQUATIONS WITH THIRD-ORDER DERIVATIVES
- CONVEX SOBOLEV INEQUALITIES DERIVED FROM ENTROPY DISSIPATION
- DISCRETE AND CONTINUOUS Website: http://AIMsciences.org DYNAMICAL SYSTEMS{SERIES B
- LYAPUNOV FUNCTIONALS, WEAK SEQUENTIAL STABILITY, AND UNIQUENESS ANALYSIS FOR ENERGY-TRANSPORT SYSTEMS
- Manuscript submitted to Website: http://AIMsciences.org AIMS' Journals
- AN ALORITHMIC CONSTRUCTION OF ENTROPIES IN HIGHER-ORDER NONLINEAR PDES
- Kinetic and Related Models doi:xx.xxxx/krm.2011.x.xx c American Institute of Mathematical Sciences
- A hierarchy model for semiconductors and plasmas Ansgar Jungel* and YueJun Peng #
- AN ADAPTIVE MIXED SCHEME FOR ENERGY-TRANSPORT SIMULATIONS OF FIELD-EFFECT TRANSISTORS
- Non-homogeneous boundary conditions for a fourth-order diffusion equation
- Existence of solutions of a segregation model arising in population dynamics
- ANALYSIS OF A MULTI-DIMENSIONAL PARABOLIC POPULATION MODEL WITH STRONG CROSS-DIFFUSION
- Global Smooth Solutions to the Multi-dimensional Hydrodynamic Model for Two-carrier Plasmas
- ANALYSIS OF A PARABOLIC CROSS-DIFFUSION SEMICONDUCTOR MODEL WITH ELECTRON-HOLE SCATTERING
- A Quantum Regularization of the Onedimensional Hydrodynamic Model
- Inviscid Limits of the Complex Ginzburg-Landau Equation
- GLOBAL WEAK SOLUTIONS TO COMPRESSIBLE NAVIER-STOKES EQUATIONS FOR QUANTUM FLUIDS
- Decay rates for solutions of degenerate parabolic systems
- FIRST-ORDER ENTROPIES FOR THE DERRIDA-LEBOWITZ-SPEER-SPOHN EQUATION
- ASYMPTOTIC LIMITS IN MACROSCOPIC PLASMA MODELS
- A Mixed Finite-Element Discretization of the Energy-Transport Model for Semiconductors
- BANACH CENTER PUBLICATIONS, VOLUME ** INSTITUTE OF MATHEMATICS
- Subsonic solutions to a one-dimensional non-isentropic hydrodynamic model for semiconductors
- Rigorous Derivation of a Hierarchy of Macroscopic Models for Semiconductors and
- Numerical discretization of energy-transport models for semiconductors
- A Relaxation Scheme for the Hydrodynamic Equations for Semiconductors
- High-Field Approximations of the Energy-Transport Model for Semiconductors
- Mathematik fur ChemikerInnen I Prof. Dr. Ansgar Jungel
- Journal of Statistical Physics manuscript No. (will be inserted by the editor)
- Convergent Semidiscretization of a Nonlinear Fourth Order Parabolic System
- Macroscopic Quantum Models With and Without Collisions
- The Relaxation-Time Limit in the Quantum Hydrodynamic Equations for Semiconductors
- Global Non{Negative Solutions of a Nonlinear Fourth{Order Parabolic Equation for
- Numerical Simulation of Thermal Effects in Coupled Optoelectronic Device-circuit Systems
- Quantum Semiconductor Modeling Ansgar Jungel
- Skript zur Vorlesung Finite-Elemente-Skript
- Variationsrechnung Univ.-Prof. Dr. Ansgar Jungel
- Entropyentropy dissipation techniques for nonlinear higher-order PDEs
- Riv. Mat. Univ. Parma (8) n (2010), 000-000 Ansgar Jungel
- A MULTIDIMENSIONAL NONLINEAR SIXTH-ORDER QUANTUM DIFFUSION EQUATION
- SEMICLASSICAL LIMIT IN A SIMPLIFIED QUANTUM ENERGY-TRANSPORT MODEL FOR SEMICONDUCTORS
- Diffusive semiconductor moment equations using Fermi-Dirac statistics
- A FINITE-VOLUME SCHEME FOR THE MULTIDIMENSIONAL QUANTUM DRIFT-DIFFUSION MODEL FOR SEMICONDUCTORS
- SELF-HEATING IN A COUPLED THERMO-ELECTRIC CIRCUIT-DEVICE MODEL
- ANALYSIS OF A BIPOLAR ENERGY-TRANSPORT MODEL FOR A METAL-OXIDE-SEMICONDUCTOR DIODE
- Time-dependent Simulations of Quantum Waveguides Using a Time-Splitting Spectral Method6
- Matrix Compression for Spherical Harmonics Expansions of the Boltzmann Transport Equation for
- THE ZERO-ELECTRON-MASS LIMIT IN THE HYDRODYNAMIC MODEL FOR PLASMAS
- Manuscript submitted to Website: http://AIMsciences.org AIMS' Journals
- A SIXTH-ORDER NONLINEAR PARABOLIC EQUATION FOR QUANTUM SYSTEMS
- MIXED ENTROPY ESTIMATES FOR THE POROUS-MEDIUM EQUATION WITH CONVECTION
- October 10, 2007 16:11 WSPC/INSTRUCTION FILE p07brunk2 Simulation of thermal effects in optoelectronic devices using coupled
- THE DERRIDA-LEBOWITZ-SPEER-SPOHN EQUATION: EXISTENCE, NON-UNIQUENESS, AND DECAY RATES OF
- A two-surface problem of the electron flow in a semiconductor on the basis of kinetic theory
- The quasineutral limit in the quantum drift-diffusion equations
- PHYSICAL AND NUMERICAL VISCOSITY FOR QUANTUM HYDRODYNAMICS
- DERIVATION OF NEW QUANTUM HYDRODYNAMIC EQUATIONS USING ENTROPY MINIMIZATION
- Numerical approximation of the viscous quantum hydrodynamic model
- ANALYSIS OF A PARABOLIC CROSS-DIFFUSION POPULATION MODEL WITHOUT SELF-DIFFUSION
- A NONLINEAR FOURTH-ORDER PARABOLIC EQUATION WITH NON-HOMOGENEOUS BOUNDARY CONDITIONS
- ZAMM header will be provided by the publisher A derivation of the isothermal quantum hydrodynamic equations
- Discrete Minimum and Maximum Principles for Finite Element Approximations
- Deterministic Numerical Solution of the Boltzmann Transport Equation
- Quantum NavierStokes equations Ansgar Jungel and Josipa-Pina Milisic
- Exponential time decay of solutions to a nonlinear fourth-order parabolic equation
- A Positivity{preserving Numerical Scheme for a Nonlinear Fourth Order Parabolic System
- Recent Progress on Quantum Hydrodynamic Models for Semiconductors
- Semi-classical and Quantum Macroscopic Semiconductor Models and Electric Circuits
- Analysis and numerical solution of a nonlinear cross-di usion system
- System Matrix Compression for Spherical Harmonics Expansions of the Boltzmann Transport Equation
- Diffusive and nondiffusive population models Ansgar Jungel1
- ENTROPY STRUCTURE OF A CROSS-DIFFUSION TUMOR-GROWTH MODEL
- A Hierarchy of Hydrodynamic Models for Plasmas. Quasi-Neutral Limits
- SEMICONDUCTOR SIMULATIONS USING A COUPLED QUANTUM DRIFT-DIFFUSION SCHRODINGER-POISSON MODEL
- A SEQUENTIAL QUADRATIC PROGRAMMING METHOD FOR VOLATILITY ESTIMATION IN OPTION PRICING
- Mathematical Modeling of Semiconductor Devices
- ENERGY TRANSPORT IN SEMICONDUCTOR DEVICES ANSGAR JUNGEL
- Mathematik fur ChemikerInnen II Prof. Dr. Ansgar Jungel
- Analysis of the viscous quantum hydrodynamic equations for semiconductors
- Quantum Euler-Poisson Systems: Global Existence and Exponential Decay
- Nonlinear Problems in Quantum Semiconductor Modeling
- A nonlinear fourth-order parabolic equation and related logarithmic Sobolev inequalities
- A HIERARCHY OF DIFFUSIVE HIGHER-ORDER MOMENT EQUATIONS FOR SEMICONDUCTORS
- NUMERICAL COUPLING OF ELECTRIC CIRCUIT EQUATIONS AND ENERGY-TRANSPORT MODELS FOR SEMICONDUCTORS
- POSITIVE SOLUTIONS TO SINGULAR SECOND AND THIRD ORDER DIFFERENTIAL EQUATIONS FOR QUANTUM FLUIDS
- Finite-element discretizations of semiconductor energy-transport equations
- Semi-discretization in time and numerical convergence of solutions
- CROSS DIFFUSION PREVENTING BLOW UP IN THE TWO-DIMENSIONAL KELLER-SEGEL MODEL
- Article title: A Quasilinear Parabolic Equation with Quadratic Growth of the Gradient
- Convergence of Nonlinear Schrodinger-Poisson Systems to the Compressible Euler equations
- Quantum Euler-Poisson Systems: Existence of Stationary States
- ZeroRelaxationTime Limits in the Hydrodynamic Equations for Plasmas Revisited
- A 3D MIXED FINITE-ELEMENT APPROXIMATION OF THE SEMICONDUCTOR ENERGY-TRANSPORT EQUATIONS
- ENTROPIES FOR RADIALLY SYMMETRIC HIGHER-ORDER NONLINEAR DIFFUSION EQUATIONS
- A parabolic crossdi#usion system for granular materials
- A SIMPLIFIED QUANTUM ENERGY-TRANSPORT MODEL FOR SEMICONDUCTORS
- January 4, 2008 10:8 WSPC -Proceedings Trim Size: 9in x 6in p07equa A REVIEW ON RESULTS FOR THE
- Modeling and Numerical Approximation of Traffic Flow Problems
- Parallel Preconditioning for Spherical Harmonics Expansions of the Boltzmann Transport Equation
- Blow-up in two-component nonlinear Schrodinger systems with an external driven field
- A HIERARCHY OF HYDRODYNAMIC MODELS FOR PLASMAS
- Kinetic and Macroscopic Models for Semiconductors Ansgar Jungel
- Adaptive Variable-Order Spherical Harmonics Expansion of the Boltzmann Transport Equation
- A System of Parabolic Equations in Nonequilibrium Thermodynamics
- Regularity and Uniqueness of Solutions to a Parabolic System
- CROSS DIFFUSION AND NONLINEAR DIFFUSION PREVENTING BLOW UP IN THE KELLER-SEGEL MODEL
- A GPU-Accelerated Parallel Preconditioner for the Solution of the Boltzmann Transport
- Title: Semiconductor Device Problems Name: Ansgar Jungel
- ON THE LAGRANGIAN STRUCTURE OF QUANTUM FLUID MODELS
- Flatness-based trajectory planning for semilinear parabolic PDEs B. Schorkhuber1, T. Meurer2, and Ansgar Jungel1
