Re: Condition numbers and eigenvalues

Depending on your level of mathematics background, you might like to see a grassroots, theoretical explanation of eigenvalues, eigenvectors, condition numbers and how they relate in the realm of linear algebra. In this case I would suggest (among other books), Numerical Linear Algebra by Trefethen and Bau. http://web.comlab.ox.ac.uk/oucl/work/nick.trefethen/text.html Best, Mike Zager >>> "Katharina Küster" <[EMAIL PROTECTED]> 02/11/08 4:10 nm >>> Dear nmusers, could anybody provide me with references about condition numbers and eigenvalues? I already know how to calculate them and I'm especially interested in how to judge the results. Thanks and best regards, Kati ______________________________ Katharina Kuester Pharmacist, PhD student Freie Universitaet Berlin Institute of Pharmacy Dept. Clinical Pharmacy Kelchstr. 31 D-12169 Berlin Phone: +49-30-838 506 27 Fax: +49-30-838 507 11 e-mail: [EMAIL PROTECTED] ____________________________________________________________________________________ Never miss a thing. Make Yahoo your home page. http://www.yahoo.com/r/hs