numerical errors in eigen decomp
2 views (last 30 days)
Show older comments
Hi, I have computed a matrix, which (If it was done right) i know to be Positive semi definite. I did a eigen decomposition using eig and got the following result
min(eig(m2))
ans =
-9.8601e-14
A sample of the other eigen values is below -0.0000, -0.0000, -0.0000, 0.0000, 0.0000, 0.0000, 1.0047, 4.6499, 10.6999, 33.8846, 38.4610, 46.6943, 49.3577, 51.3520, 156.0164, 217.2181, 315.0000
Is it safe to assume the negative eigen values are through numerical issues and not due to a problem in the matrix computation?
0 Comments
Accepted Answer
the cyclist
on 12 Apr 2011
Yes. "eig" was probably about the first MATLAB function ever written, decades ago, so I think you will find it reliable. :-)
A value of e-14 is about the numerical error you would expect in a double-precision calculation of this type.
2 Comments
Andrew Newell
on 12 Apr 2011
In addition, judging by the spread of eigenvalues, your matrix is ill-conditioned. That would contribute to the error.
Matt Tearle
on 12 Apr 2011
Yep. Largest evalue is 10^2, smallest is 10^-13. That's as much accuracy as you can expect from double precision arithmetic. I'd call that good and move on.
More Answers (0)
See Also
Categories
Find more on Linear Algebra in Help Center and File Exchange
Products
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!