When we have a Separable Hamiltonian $H (x_{1}, p_{1}, x_{2}, p_{2}) = H_{1} (x_{1}, p_{1}) + H_{2} (x_{2}, p_{2})$ , we can solve the 2 sub-systems independently to obtain the joint solution.

Proof

We have that $[H_{1}, H_{2}] = 0$ since $H_{1}$ and $H_{2}$ act on different components of the Tensor product. As such we can find their simultaneous eigenstates, which are given by

H ∣ E ⟩ = (H_{1} + H_{2}) (∣ E_{1} ⟩ \otimes ∣ E_{2} ⟩) = H_{1} (∣ E_{1} ⟩ \otimes ∣ E_{2} ⟩) + H_{2} (∣ E_{1} ⟩ \otimes ∣ E_{2} ⟩) = E_{1} ∣ E_{1} ⟩ \otimes ∣ E_{2} ⟩ + ∣ E_{1} ⟩ \otimes E_{2} ∣ E_{2} ⟩ = E_{1} (∣ E_{1} ⟩ \otimes ∣ E_{2} ⟩) + E_{2} (∣ E_{1} ⟩ \otimes ∣ E_{2} ⟩) = (E_{1} + E_{2}) (∣ E_{1} ⟩ \otimes ∣ E_{2} ⟩) = E ∣ E ⟩ since addition distributes over the tensor product Since H_{i} only operates on it’s "component" where E := E_{1} + E_{2} and ∣ E ⟩ := ∣ E_{1} ⟩ \otimes ∣ E_{2} ⟩ = ∣ E_{1} E_{2} ⟩

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Separable Hamiltonians evolve independently

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