Numerical Analysis (II)
¼Æ­È¤ÀªR(II)

Fall 2010


Jinn-Liang Liu

­Ó¤Hºô­¶: http://www.nhcue.edu.tw/~jinnliu/

·s¦Ë±Ð¨|¤j¾ÇÀ³¼Æ¨t

  

Project 3. (Due 6/10)
Project 2. (Due 5/20)  
Project 1. (Due 4/22)

Report 4. (Due 6/17)
Report 3. (Due 5/27)
Report 2. (Due 5/6)
Report 1. (Due 4/15)
Submit all Reports and Projects via email.

½Òµ{¤jºõ  

Course Topics:

Lecture Order: 1, 2, ¡K, 16.

 

I.            Overview
  1.   Semiconductor Transistors
  2.   Life¡¦s Transistors

II.         Mathematical Models with Fundamental Physics
  6.  Poisson¡¦s Equation in Electrostatics  
  7.  Convection-Diffusion-Reaction Model  
  9.  1D Ion Channel Model
11.  Schrödinger¡¦s Equation 
12.  Bohm¡¦s Quantum Potential
13.  A Quantum Corrected Energy Transport Model  
14.  Scaling Analysis of the QCET Model  
15.  Boltzmann¡¦s Equation and Classical Hydrodynamic Models
       Based on Maximum Entropy Principle 
16.  Quantum Hydrodynamic Models Based on Maximum Entropy Principle   

III.              Numerical Methods
  3.  1D Poisson¡¦s Problem and Finite Difference Method  
  4.  Jacobi and Conjugate Gradient Methods  
  5.  Newton and Monotone Iterative Methods
  8.  Scharfetter-Gummel (Exponential Fitting) Method   
10.  1D Finite Element Method 

 ±Ð¾Ç¥Ø¼Ð

¡P        Learn Fundamental Physics in Mathematical Models

¡P        Learn Basic Numerical methods for Linear Algebra and PDEs

¡P        Learn C++ Programming in Scientific Computing

±Â½Ò¤è¦¡

¡P        Regular Lecturing

µû¤À¼Ð·Ç

¡P        Reports 45%

¡P        Projects 45%

¡P        In class performance 10%

±Ð¬ì®Ñ

¡P        Jinn-Liang Liu, Lecture Notes on Numerical Methods for Partial Differential Equations, 2010.

¡P        Jinn-Liang Liu, ¶q¤l¬yÅ餧¼Æ¾Ç«Ø¼Ò¡B¼Æ­È¤èªk¡B»PÀ³¥ÎQuantum Hydrodynamic Modeling, Numerical Methods, and Applications, 2010.

¡P        Juan Soulie, C++ Language Tutorial, 2007. 2007X C++ Programming    

¾\Ū¤åÄm

¡P        R. J. LeVeque, Finite Difference Methods for Differential Equations, 2005.  LeVeque-FDM-2005.pdf (Chapters 1-5)

¡P      E. Suli, Finite Element Methods for Partial Differential Equations, 2007. Suli-FEM-2007.pdf

¡P      R. Barrett, M. Berry, T. F. Chan, J. Demmel, J. Donato, J. Dongarra , V. Eijkhout, R. Pozo, C. Romine, and H. Van der Vorst, Templates for the Solution of Linear Systems: Building Blocks for Iterative Methods, 2nd Edition, SIAM, 1994, Philadelphia, PA.
Templates for the Solution of Linear Systems   (pdf)

¡P      J. R. Shewchuk, An Introduction to the Conjugate Gradient Method Without the Agonizing Pain, 1994.