Thursday, July 13
MS53
Advances in Numerical Linear Algebra
10:30 AM-12:30 PM
Rio Mar 3
Numerical linear algebra continues to be an active area of research, with exciting developments in theory, algorithms and software. The speakers describe recent results on topics including standard and generalized (pseudo) eigenvalue problems, trilinear decomposition, and the performance of LAPACK in MATLAB.
Organizers: Nicholas J. Higham and Francoise Tisseur
University of Manchester, United Kingdom
- 10:30-10:55 Bidiagonal and Hessenberg Reductions of Random Matrices
- Lloyd N. Trefethen and Mark Embree, Oxford University Computing Laboratory, United Kingdom
- 11:00-11:25 An Arithmetic for Matrix Pencils
- Peter Benner, Universität Bremen, Germany; and Ralph Byers, University of Kansas, USA
- 11:30-11:55 Trilinear Decomposition and its Applications
- Ren-Cang Li and William S. Rayens, University of Kentucky, USA
- 12:00-12:25 Performance of LAPACK in MATLAB
- Cleve Moler, The MathWorks, Inc., USA