References
- Auer , C. and Schu¨rrer , F. 2004 . Semicontinuous kinetic theory of the relaxation of electrons in GaAs . Transp. Th. Stat. Phys. , 33 : 429 – 447 .
- Auer , C. , Schu¨rrer , F. and Koller , W. 2004 . A semi‐continuous formulation of the Bloch‐Boltzmann‐Peierls equations . SIAM J. Appl. Math. , 64 : 1457 – 1475 .
- Cáceres , M. J. , Carrillo , J. A. and Majorana , A. 2006 . Deterministic simulation of the Boltzmann‐Poisson system in GaAs‐based semiconductors . SIAM J. Sci. Comput. , 27 : 1981 – 2009 .
- Carrillo , J. A. , Gamba , I. M. , Majorana , A. and Shu , C.‐W. 2003a . A direct solver for 2D non‐stationary Boltzmann‐Poisson systems for semiconductor devices: A MESFET simulation by WENO‐Boltzmann schemes . J. Comput. Electron. , 2 : 375 – 380 .
- Carrillo , J. A. , Gamba , I. M. , Majorana , A. and Shu , C.‐W. 2003b . A WENO‐solver for the transients of Boltzmann‐Poisson system for semiconductor devices: Performance and comparisons with Monte Carlo methods . J. Comput. Phys. , 184 : 498 – 525 .
- Degond , P. , Delaurens , F. and Mustieles , F. J. 1990 . Semiconductor modelling via the Boltzmann equation . Comput. Meth. App. Sci. Eng. , : 311 – 324 .
- Degond , P. , Niclot , B. and Poupaud , F. 1988 . Deterministic particle simulations of the Boltzmann transport equation of semiconductors . J. Comput. Phys. , 78 : 313 – 349 .
- Delaurens , F. and Mustieles , F. J. 1992 . A deterministic particle method for solving kinetic transport equations: The semiconductor Boltzmann equation case . SIAM J. Appl. Math. , 52 : 973 – 998 .
- Ertler , C. and Schu¨rrer , F. 2003 . A multicell matrix solution to the Boltzmann equation applied to the anisotropic electron transport in silicon . J. Phys. A , 36 : 8759 – 8774 .
- Fatemi , E. and Odeh , F. 1993 . Upwind finite difference solution of Boltz mann equation applied to electron transport in semiconductor devices . J. Comput. Phys. , 108 : 209 – 217 .
- Ferry , D. K. 2000 . Semiconductors London : Taylor & Francis .
- Filbet , F. and Russo , G. A rescaling velocity method for kinetic equations: The homogeneous case . Proceedings of the International Conference “Modeling and Numerics of Kinetic Dissipative Systems: Cooling, Clustering, and Pattern Formation . May 31–June 4 , Lipari, Italy.
- Galler , M. and Schu¨rrer , F. 2004 . A deterministic solution method for the coupled system of transport equations for the electrons and phonons in polar semiconductors . J. Phys. A , 37 : 1479 – 1497 .
- Galler , M. and Schu¨rrer , F. 2006 . A direct multigroup‐WENO solver for the 2D non‐stationary Boltzmann‐Poisson system for GaAs devices: GaAs‐MESFET . J. Comput. Phys. , 212 : 778 – 797 .
- González , P. , Godoy , A. , Gámiz , F. and Carrillo , J. A. 2004 . Accurate deterministic numerical simulation of p‐n junctions . J. Comput. Electron. , 3 : 235 – 238 .
- Jacoboni , C. and Reggiani , L. 1983 . The Monte Carlo method for the solution of charge transport in semiconductors with applications to covalent materials . Rev. Mod. Phys. , 55 : 645 – 705 .
- LeVeque , R. J. 1992 . Numerical Methods for Conservation Laws Basel : Birkha¨user .
- Lundstrom , M. 2000 . Fundamentals of Carrier Transport Cambridge : Cambridge University Press .
- Majorana , A. and Pidatella , R. M. 2001 . A finite difference scheme solving the Boltzmann–Poisson system for semiconductor devices . J. Comput. Phys. , 174 : 649 – 668 .
- Ringhofer , C. 2000 . Space‐time discretization methods for series expansion solutions of the Boltzmann equation for semiconductors . SIAM J. Num. Anal. , 38 : 442 – 465 .
- Ringhofer , C. , Schmeiser , C. and Zwirchmayer , A. 2001 . Moment methods for the semiconductor Boltzmann equation in bounded position domains . SIAM J. Num. Anal. , 39 : 1078 – 1095 .
- Shu , C.- W. and Osher , S. 1988 . Efficient implementation of essentially nonoscillatory shock‐capturing schemes . J. Comput. Phys. , 77 : 439 – 471 .
- Ziman , J. M. 1960 . Electrons and Phonons London : Oxford University Press .