Internet Resources for LU Factorization

 Return to Numerical Methods - Numerical Analysis

 

  1. Linear Algebraic Equations, Solution using LU factorisation  
    Jun Ni, Dept. of Mechanical Engineering, University of Iowa, Iowa City, Iowa  
  2. Lower/Upper Triangular (LU) Decomposition  
    Computational Science Textbook, Las Cruces, NM  
  3. Gauss Transformation and LU-Factorization  
    Toomas Lepikult, Institute of Computer Science, Univ. of Tartu, Estonia     
  4. Using LU Decomposition to Solve a System of Simultaneous Equations  
    Centro de Comunicaciones y Tecnologías de la Información, Universidad de La Laguna  
  5. LU Factorization  
    Susan Ostrouchov, Netlib, Oak Ridge National Laboratory, Knoxville TN  
  6. La factorización LU  
    Wladimiro Diaz Villanueva, Departament d'Informàtica, Universitat de València, Spain  
  7. Super LU  
    Xiaoye S. Li, Lawrence Berkeley National Laboratory, Berkeley, CA  
  8. Systems of Linear Equations, LU Factorization of Full Matrices  
    Guy Robinson, Northeast Parallel Architectures Center (NPAC), Syracuse University, NY  
  9. LU decomposition  
    R. J. Hosking, Mahidol University, Mahidol University, Bangkok, Thailand  
  10. Lower/Upper Triangular (LU) Decomposition  
    Computational Science Textbook, Las Cruces, NM  
  11. Solution by Triangular Decomposition  
    Computational Science Education Project, U.S. Department of Energy  
  12. LU factorisation  
    Stuart Dalziel, University of Cambridge, Cambridge, England  
  13. LU Decomposition  
    Franz J. Vesely, Institute of Experimental Physics, University of Vienna, Austria  
  14. Exact Methods the LU-Factorization  
    Angus MacKinnon, Condensed Matter Theory Group, Imperial College, London  
  15. The LU factorization, how to find it   
    John Stalker, Math. Dept., Princeton University, NJ  
  16. The LU Decomposition Method  
    J. R. White, Chem. and Nuclear Engr. Dept., University of Massachusetts, Lowell, MA  
  17. Lower/Upper Triangular (LU) Decomposition  
    Dr. Carl Davis, Adventures in Supercomputing Program, University of Alabama in Huntsville, AL  
  18. LU Decomposition  
    Mike Guidry, Physics Dept., North Carolina State University, Knoxville, NC  
  19. Gaussian Elimination with good record keeping gives A = LU  
    Carl Eberhart, Math. Dept., University of Kentucky, Lexington KY  
  20. LU Decomposition  
    Dr. A C Marshall, University of Liverpool Notes, Institute of Physics, Zagreb, Croatia  
  21. LU Factorization  
    Saul I. Drobnies, San Diego State University, San Diego, CA        
  22. LU Decomposition  
    Rudolf K. Bock, CERN, European Organization for Nuclear Research, Geneva, Switzerland  
  23. LU Decomposition  
    David Smith, Math. Dept., Duke University, Durham, NC  
  24. Simple LU Decomposition: "Fast" Polynomial Multiplication using FFT  
    Brian Frazier, Computer Science Department, California Institute of Technology, Pasadena, CA  
  25. Decomposition into Gaussian Triangular Factors  
    John Gilbert, Dept. of Math. and Stat., Fylde College, Lancaster University, England  
  26. The LU Factorization  
    Juan Mario Restrepo, Math. Dept., University of Arizona, Tucson, AZ  
  27. LU Factorization (with pivoting)  
    Greg Baker, Computer Sci. Dept., University of Texas at Austin, TX  
  28. Elementary Matrices, Inverses and the LU decomposition  
    Jennifer Johnson, Math. Dept., PrincetonUniversity, Princeton, NJ  
  29. Cholesky Factorization     
    Susan Ostrouchov, Netlib, Oak Ridge National Laboratory, Knoxville TN      
  30. Cholesky Factorization     
    Computational Science Education Project, U.S. Department of Energy   
  31. Parallelism in Sparse Factorization     
    Computational Science Education Project, U.S. Department of Energy   
  32. Cholesky Decomposition     
    Rudolf K. Bock, CERN, European Organization for Nuclear Research, Geneva, Switzerland     
  33. Cholesky Factorization       
    Greg Baker, Computer Sci. Dept., University of Texas at Austin, TX     
  34. Fast Cholesky factorization       
    Greg Ammar,  Dept. of Math., Northern Illinois University, DeKalb, IL   
  35. Choleski Factorization     
    Jules Kouatchou, Performance of ScaLAPACK Routines on the CRAY T3E, NASA      
  36. Cholesky     
    Umakishore Ramachandran, College of Computing, Georgia Institute of Technology, Atlanta, GA  
  37. Sparse Cholesky Factorization     
    Ken Hawick, High Performance Fortran, Northeast Parallel Architecture at Syracuse University     
  38. Cholesky decomposition      
    Bryan Carpenter, Computational Science, Florida State Universtiy, Tallahassee, FL

 

 

 

 

 

 

 

 

 

 

 

 

(c) John H. Mathews 2003