I got it. By the way, vector space is actually finite-dimensional (d=9000) Euclidean Space.
Since I do not know the \lambda, (only A and b are known) how can I find an numeric solution for that? Is there any way using eigenvalue logic here?
Such as
-- find eigenvalues of A,
-- check if...
Hi,
Is there any solution for the following problem:
Ax = \lambda x + b
Here x seems to be an eigenvector of A but with an extra translation vector b.
I cannot say whether b is parallel to x (b = cx).
Thank you in advance for your help...
Birkan