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Perturbation Theory Lecture 5
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Interactions of radiations with matter
In absence of external perturbation ------(1) In presence of radiations, Hamiltonian will be (2)
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In absence of electrostatic source
Also, using Coulomb Gauge condition Neglecting terms of order of Eq (2) become ------(3) ----(4) To find the effect of external perturbation on atom, we first need to find vector potential can be calculated classically and quantum mechanically. External perturbation
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Classical treatment of radiations
We write -----(5) Polarization vector E.F. and M.F. are given by ------(6)
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Energy density for single photon is given by
(7) Averaging over time and writing energy of single photon Per unit volume, Which gives, (8) Thus, from (5), we have (9)
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Thus, using (9) in (4), Potential is given by
-----(10) which is like harmonic perturbation.
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Transition rates for perturbation defined by eq. (10)
are given by ---(11) (12) Exercise: Derive above equations.
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Transition rate within dipole approximation
Expanding , we get (13) Reason: is small quantity because wavelength of radiations (visible or ultraviolet is large) compared to atomic size (small quantity)
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Neglecting higher order terms in (13) i.e. Considering only
first term (14) This is called dipole approximation. We know Above eq can be generalized to Which give (15)
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Using (14) and (15) in following, we get
(16) Using (16) in (11), we obtain transition rates within dipole approximation.
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Exercise: Discuss selection rules for dipole transitions.
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