maximum eigenvalue of a matrix with rank one update

7 views (last 30 days)
Yang
Yang on 20 Jun 2013
There is a (real symmetric) matrix A(t) updated recursively by
A(t)=(t-1)/t*A(t-1)+1/t*a(t)*a(t)',
where a(t) is a column vector.
Suppose the maximum eigenvalue of A(t-1) is known; then is there any efficient method to compute the maximum eigenvalue of A(t)?
Many thanks!
Yang

Sign in to answer this question.

Accepted Answer

Roger Stafford
Roger Stafford on 21 Jun 2013
Yang, you appear to expect some direct relationship between the maximum eigenvector of A(t-1) and that of A(t), possibly also involving vector a(t). However, the maximum eigenvalue of A(t) is actually dependent on all the eigenvalues and all the eigenvectors of A(t-1), so the relationship would have to be very complicated. I see no better way of determining the maximum eigenvalue of A(t) than calling on the 'eig' or 'eigs' function directly, in spite of its being the result of a recursion.
If vector a were not dependent on t, the limiting case as t approaches infinity, would be just the rank one matrix a*a' itself with its single nonzero eigenvalue and corresponding eigenvector proportional to vector a. However you have presumably used the a(t) notation to indicate that a changes with changing t, so even that is untrue.
  1 Comment
Yang
Yang on 25 Jun 2013
Roger, thank you very much for your response.
I have also realized that there is not a closed-form expression connecting the largest eigenvalue of A(t) and A(t-1), unless some special structures are assumed.

Sign in to comment.

More Answers (0)

Categories

Find more on Linear Algebra in Help Center and File Exchange

Tags

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!