Internet Resources for the Crank-Nicolson Method for PDE's

 

Remark.  A common misspelling is Nicholson.

  1. The Crank-Nicholson scheme  
    Richard Fitzpatrick, Physics Dept., University of Texas at Austin, TX  
  2. The Crank-Nicholson scheme  
    Richard Fitzpatrick, Physics Dept., University of Texas at Austin, TX  
  3. Schéma de Crank-Nicholson  
    Jacques Rappaz, Institut d'analyse et Calcul Scientifique, Ecole Polytechnique Fédérale de Lausanne, France
  4. Crank-Nicholson scheme  
    Alain Bellerive, Physics Dept., Carleton University, Ottawa, ON, Canada  
  5. Setting up the Equations  
    Clare E. Unwin, Physics and Astronomy, Univ. of Birmingham, England  
  6. Crank-Nicholson-Crout Algorithm for the Time-Dependent Schrödinger Equation  
    Carleton DeTar, Physics Dept.,  University of Utah, Salt Lake City, UT  
  7. Crank Nicholson  
    Meghan Carroll, Physics Dept., Davidson  College, Davidson, NC  
  8. Crank-Nicholson  
    Stuart Dalziel, University of Cambridge, Cambridge, England  
  9. Diffusion equation  
    Stuart Dalziel, University of Cambridge, Cambridge, England  
  10. Conclusions: The Crank-Nicholson is unconditionally stable and is the most accurate of all the methods.
    Julien Delanoy, Dept. of Mechanical Engineering, University of Bath. United Kingdom  
  11. Efficient Parallel Code for Astrophysical Fluid Dynamics: The Numerical Scheme: a Crank-Nicholson method  
    Argonne National Laboratory, Argonne, IL   
  12. Schrödinger equation for variable effective mass: Semi-implicit Crank-Nicholson method
    Umberto Ravaioli, Ballistic Quantum Models, University of Illinois, Urbana-Champaign, IL   
  13. Introduction to Numerical Analysis: Parabolic equations   
    E. Bruce Pitman, Math. Dept., State University of New York, Buffalo, NY  
  14. Partial differential equations ...  Crank-Nicholson method
    Stuart Dalziel, D.A.M.T.P., University of Cambridge, England
  15. Crank-Nicholson Scheme (CN)   
    Franz J. Vesely, Institute of Experimental Physics, University of Vienna
  16. Implicit Crank-Nicholson
    André Jaun; J. Hedin, T. Johnson, Alfvén Laboratory, Royal Institute of Technology, Stockholm, Sweden  
  17. Leap-frog, staggered grids
    André Jaun; J. Hedin, T. Johnson, Alfvén Laboratory, Royal Institute of Technology, Stockholm, Sweden   
  18. Crank-Nicholson Scheme  
    Joint Institute for Computational Science, Oak Ridge National Laboratory, TN  
  19. Mathematics of Financial Derivatives: Numerical Solutions: Crank-Nicholson   
    Math. Dept., Okanagan University College, Kelowna, British Columbia    
  20. Numerical Solution of PDE: Crank-Nicholson  
    Graeme Chandler, Math. Dept., The University of Queensland, Australia  
  21. On the stability of the boundary for BH runs for Crank-Nicholson method  
    Roberto Gomez,  Dept. of Physics and Astronomy, University of Pittsburgh  
  22. 1-D Time-Dependent Schrödinger Equation: Semi-implicit Crank-Nicholson implicit scheme  
    Umberto Ravaioli, Ballistic Quantum Models, University of Illinois, Urbana-Champaign, IL  
  23. Parabolic Partial Differential Equations  
    Jake Blanchard, Nuclear Engineering and Engineering Physics, University of Wisconsin, Madison, WI  
  24. Parabolic PDE  
    NAG Fortran 77 Library, The Numerical Algorithms Group Ltd, Oxford UK

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(c) John H. Mathews 2004