- categories: Linear algebra, Observation
Change of Inverse Matrix
Let be a differentiable matrix-valued function, where is invertible. The time derivative of the inverse is:
Derivation:
- Start from , where is the identity matrix.
- Differentiate both sides with respect to :
- Solve for :
Change of Eigenvalues
Let be the eigenvalues of and the corresponding eigenvectors. For a differentiable :
First-Order Change in Eigenvalues:
If is diagonalizable, the rate of change of the eigenvalue is given by:
Conditions:
- The eigenvectors are normalized: .
- This result assumes that is a simple eigenvalue (no degeneracy).
Change of Singular Values
Let be the singular values of , defined as the square roots of the eigenvalues of or .
First-Order Change in Singular Values:
The rate of change of is: and are the left and right singular vectors corresponding to . This assumes .
Conditions:
- Singular value decomposition: , where and are orthogonal matrices, and is diagonal.
- The singular values are real and non-negative: .
For small perturbations, these formulas can be used to approximate how the inverse matrix, eigenvalues, and singular values evolve over time or with respect to a parameter.