- #1
AdrianZ
- 319
- 0
well, if a matrix has n linearly independent eigen-vectors then it's easy, what if a matrix is not diagnolizable in that way? Can we still diagnolize it by other means?
And what if a matrix is not diagonalizable at all? Are there still ways to find its exponential matrix?
And what if a matrix is not diagonalizable at all? Are there still ways to find its exponential matrix?