- §1. Hermitian Matrices
- §2. Properties: Hermitian
- §3. Commuting Matrices
- §4. Unitary Matrices
- §5. Properties: Unitary
- §6. Basis Change
- §7. Symmetry Operations
- §8. Matrix Examples
- §9. Matrix Decompositions
- §10. Matrix Exponentials
- §11. Evolution Equations
Evolution Equation
The simplest non-trivial ode is the first-order linear ode with constant coefficients: \begin{equation} \frac{d}{dx} f(x)= a f(x) \end{equation} with solution: \begin{equation} f(x)=f(0)\, e^{ax} \end{equation}
We can generalize this equation to apply to solutions which are matrix exponentials, i.e.: \begin{equation} M(x)=M(0)e^{Ax} \end{equation} is a solution of: \begin{equation} \frac{d}{dx}\, M(x) = A\, M(x) \end{equation} where $A$ is a suitable constant matrix. (Show that if $A$ is anti-Hermitian, then $M(x)$ is unitary.)
Example Problem: Find the matrix differential equation that has the solution: \begin{equation} \vert \psi(x, t)\rangle = \vert \psi(x,0)\rangle\, e^{i\frac{Ht}{\hbar}} \end{equation} where $H$ is Hermitian. Do you recognize your differential equation?