Yes, that's correct! Fermi's golden rule is a fundamental result in quantum physics that allows us to calculate the transition rate between quantum states in the context of time-dependent perturbation theory. It provides a way to determine the probability per unit time for a quantum system to make a transition from an initial state to a final state when the system is subjected to a weak perturbation.
The golden rule is typically expressed in the following form:
Wi→f=2πℏ∣Vfi∣2ρ(Ei)W_{i o f} = frac{2 pi}{hbar} lvert V_{fi}
vert^2
ho(E_i)Wi→f=ℏ2π∣Vfi∣2ρ(Ei)
where Wi→fW_{i o f}Wi→f represents the transition rate from an initial state iii to a final state fff, VfiV_{fi}Vfi is the matrix element of the perturbation between the initial and final states, ρ(Ei)
ho(E_i)ρ(Ei) is the density of states at the initial energy EiE_iEi, and ℏhbarℏ is the reduced Planck's constant.
The formula tells us that the transition rate depends on the square of the matrix element ∣Vfi∣2lvert V_{fi}
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