Let be a vector space over and a linear operator on . An eigenvalue for is an scalar (that is, an element of ) such that for some nonzero vector . Is that case, we also say that is an eigenvector of .
This can also be expressed as follows: is an eigenvalue for if the kernel of is non trivial.
|Date of creation||2013-03-22 14:01:53|
|Last modified on||2013-03-22 14:01:53|
|Last modified by||drini (3)|