Autler–Townes effect

(Redirected from Autler-Townes splitting)

In spectroscopy, the Autler–Townes effect (also known as AC Stark effect), is a dynamical Stark effect corresponding to the case when an oscillating electric field (e.g., that of a laser) is tuned in resonance (or close) to the transition frequency of a given spectral line, and resulting in a change of the shape of the absorption/emission spectra of that spectral line. The AC Stark effect was discovered in 1955 by American physicists Stanley Autler and Charles Townes.

It is the AC equivalent of the static Stark effect which splits the spectral lines of atoms and molecules in a constant electric field. Compared to its DC counterpart, the AC Stark effect is computationally more complex.[1]

While generally referring to atomic spectral shifts due to AC fields at any (single) frequency, the effect is more pronounced when the field frequency is close to that of a natural atomic or molecular dipole transition.[2] In this case, the alternating field has the effect of splitting the two bare transition states into doublets or "dressed states" that are separated by the Rabi frequency.[3] Alternatively, this can be described as a Rabi oscillation between the bare states which are no longer eigenstates of the atom–field Hamiltonian.[4] The resulting fluorescence spectrum is known as a Mollow triplet.

The AC Stark splitting is integral to several phenomena in quantum optics, such as electromagnetically induced transparency and Sisyphus cooling. Vacuum Rabi oscillations have also been described as a manifestation of the AC Stark effect from atomic coupling to the vacuum field.[3]

History

edit

The AC Stark effect was discovered in 1955 by American physicists Stanley Autler and Charles Townes while at Columbia University and Lincoln Labs at the Massachusetts Institute of Technology. Before the availability of lasers, the AC Stark effect was observed with radio frequency sources. Autler and Townes' original observation of the effect used a radio frequency source tuned to 12.78 and 38.28 MHz, corresponding to the separation between two doublet microwave absorption lines of OCS.[5]

The notion of quasi-energy in treating the general AC Stark effect was later developed by Nikishov and Ritis in 1964 and onward.[6][7][8] This more general method of approaching the problem developed into the "dressed atom" model describing the interaction between lasers and atoms.[4]

Prior to the 1970s there were various conflicting predictions concerning the fluorescence spectra of atoms due to the AC Stark effect at optical frequencies[citation needed]. In 1974 the observation of Mollow triplets verified the form of the AC Stark effect using visible light.[2]

General semiclassical approach

edit

In a semiclassical model where the electromagnetic field is treated classically, a system of charges in a monochromatic electromagnetic field has a Hamiltonian that can be written as:

 

where  ,  ,   and   are respectively the position, momentum, mass, and charge of the  -th particle, and   is the speed of light. The vector potential of the field,  , satisfies

 .

The Hamiltonian is thus also periodic:

 

Now, the Schrödinger equation, under a periodic Hamiltonian is a linear homogeneous differential equation with periodic coefficients,

 

where   here represents all coordinates. Floquet's theorem guarantees that the solutions to an equation of this form can be written as

 

Here,   is the "bare" energy for no coupling to the electromagnetic field, and   has the same time-periodicity as the Hamiltonian,

 

or

 

with   the angular frequency of the field.

Because of its periodicity, it is often further useful to expand   in a Fourier series, obtaining

 

or

 

where   is the frequency of the laser field.

The solution for the joint particle-field system is, therefore, a linear combination of stationary states of energy  , which is known as a quasi-energy state and the new set of energies are called the spectrum of quasi-harmonics.[8]

Unlike the DC Stark effect, where perturbation theory is useful in a general case of atoms with infinite bound states, obtaining even a limited spectrum of shifted energies for the AC Stark effect is difficult in all but simple models, although calculations for systems such as the hydrogen atom have been done.[9]

Examples

edit

General expressions for AC Stark shifts must usually be calculated numerically and tend to provide little insight.[1] However, there are important individual examples of the effect that are informative. Analytical solutions in these specific cases are usually obtained assuming the detuning   is small compared to a characteristic frequency of the radiating system.

Two level atom dressing

edit

An atom driven by an electric field with frequency   close to an atomic transition frequency   (that is, when  ) can be approximated as a two level quantum system since the off resonance states have low occupation probability.[3] The Hamiltonian can be divided into the bare atom term plus a term for the interaction with the field as:

 

In an appropriate rotating frame, and making the rotating wave approximation,   reduces to

 

Where   is the Rabi frequency, and   are the strongly coupled bare atom states. The energy eigenvalues are

 ,

and for small detuning,

 

The eigenstates of the atom-field system or dressed states are dubbed   and  .

The result of the AC field on the atom is thus to shift the strongly coupled bare atom energy eigenstates into two states   and   which are now separated by  . Evidence of this shift is apparent in the atom's absorption spectrum, which shows two peaks around the bare transition frequency, separated by   (Autler-Townes splitting). The modified absorption spectrum can be obtained by a pump-probe experiment, wherein a strong pump laser drives the bare transition while a weaker probe laser sweeps for a second transition between a third atomic state and the dressed states.[10]

Another consequence of the AC Stark splitting here is the appearance of Mollow triplets, a triple peaked fluorescence profile. Historically an important confirmation of Rabi flopping, they were first predicted by Mollow in 1969[11] and confirmed in the 1970s experimentally.[3]

Optical Dipole Trap (Far-Off-Resonance Trap)

edit

For ultracold atoms experiments utilizing the optical dipole force from AC Stark shift, the light is usually linearly polarized to avoid the splitting of different magnetic substates with different  ,[12] and the light frequency is often far detuned from the atomic transition to avoid heating the atoms from the photon-atom scattering; in turn, the intensity of the light field (i.e. AC electric field)   is typically high to compensate for the large detuning. Typically, we have  , where the atomic transition has a natural linewidth   and a saturation intensity:

 

Note the above expression for saturation intensity does not apply to all cases. For example, the above applies for the D2 line transition of Li-6, but not the D1 line, which obeys a different sum rule in calculating the oscillator strength. As a result, the D1 line has a saturation intensity 3 times larger than the D2 line. However, when the detuning from these two lines is much larger than the fine-structure splitting, the overall saturation intensity takes the value of the D2 line. In the case where the light's detuning is comparable to the fine-structure splitting but still much larger than the hyperfine splitting, the D2 line contributes twice as much dipole potential as the D1 line, as shown in Equation (19) of.[12]

The optical dipole potential is therefore:[13][14]

 

Here, the Rabi frequency   is related to the (dimensionless) saturation parameter[15]  , and   is the real part of the complex polarizability of the atom,[14][13] with its imaginary counterpart representing the dissipative optical scattering force. The factor of 1/2 takes into account that the dipole moment is an induced, not a permanent one.

When  , the rotating wave approximation applies, and the counter-rotating term proportional to   can be omitted; However, in some cases,[16] the ODT light is so far detuned that counter-rotating term must be included in calculations, as well as contributions from adjacent atomic transitions with appreciable linewidth  .

Note that the natural linewidth   here is in radians per second, and is the inverse of lifetime  . This is the principle of operation for Optical Dipole Trap (ODT, also known as Far Off Resonance Trap, FORT), in which case the light is red-detuned  . When blue-detuned, the light beam provides a potential bump/barrier instead.

The optical dipole potential is often expressed in terms of the recoil energy, which is the kinetic energy imparted in an atom initially at rest by "recoil" during the spontaneous emission of a photon:

 

where   is the wavevector of the ODT light (  when detuned). The recoil energy, along with related recoil frequency  , are crucial parameters in understanding the dynamics of atoms in light fields, especially in the context of atom optics and momentum transfer.

In applications that utilize the optical dipole force, it is common practice to use a far-off-resonance light frequency. This is because a smaller detuning would increase the photon-atom scattering rate much faster than it increases the dipole potential energy, leading to undesirable heating of the atoms. Quantitatively, the scattering rate is given by:[13]

 

Adiabatic elimination

edit

In quantum system with three (or more) states, where a transition from one level,   to another   can be driven by an AC field, but   only decays to states other than  , the dissipative influence of the spontaneous decay can be eliminated. This is achieved by increasing the AC Stark shift on   through large detuning and raising intensity of the driving field. Adiabatic elimination has been used to create comparatively stable effective two level systems in Rydberg atoms, which are of interest for qubit manipulations in quantum computing.[17][18][19]

Electromagnetically induced transparency

edit

Electromagnetically induced transparency (EIT), which gives some materials a small transparent area within an absorption line, can be thought of as a combination of Autler-Townes splitting and Fano interference, although the distinction may be difficult to determine experimentally. While both Autler-Townes splitting and EIT can produce a transparent window in an absorption band, EIT refers to a window that maintains transparency in a weak pump field, and thus requires Fano interference. Because Autler-Townes splitting will wash out Fano interference at stronger fields, a smooth transition between the two effects is evident in materials exhibiting EIT.[20]

See also

edit

References

edit
  1. ^ a b Delone, N B; Krainov, Vladimir P (1999-07-31). "AC Stark shift of atomic energy levels". Physics-Uspekhi. 42 (7). Uspekhi Fizicheskikh Nauk (UFN) Journal: 669–687. doi:10.1070/pu1999v042n07abeh000557. ISSN 1063-7869. S2CID 202602476.
  2. ^ a b Schuda, F; Stroud, C R; Hercher, M (1974-05-11). "Observation of the resonant Stark effect at optical frequencies". Journal of Physics B: Atomic and Molecular Physics. 7 (7). IOP Publishing: L198–L202. Bibcode:1974JPhB....7L.198S. doi:10.1088/0022-3700/7/7/002. ISSN 0022-3700.
  3. ^ a b c d Fox, Mark. Quantum Optics: An Introduction: An Introduction. Vol. 15. Oxford university press, 2006.
  4. ^ a b Barnett, Stephen, and Paul M. Radmore. Methods in theoretical quantum optics. Vol. 15. Oxford University Press, 2002.
  5. ^ Autler, S. H; Charles Hard Townes (1955). "Stark Effect in Rapidly Varying Fields". Physical Review. 100 (2). American Physical Society: 703–722. Bibcode:1955PhRv..100..703A. doi:10.1103/PhysRev.100.703.
  6. ^ Nikishov, A. I., and V. I. Ritus. Quantum Processes in the Field of a Plane Electromagnetic Wave and in a Constant Field. PART I. Lebedev Inst. of Physics, Moscow, 1964.
  7. ^ Ritus, V. I. (1967). "Shift and splitting of atomic energy levels by the field of an electromagnetic wave". Journal of Experimental and Theoretical Physics. 24 (5): 1041–1044. Bibcode:1967JETP...24.1041R.
  8. ^ a b Zel'Dovich, Ya B. "Scattering and emission of a quantum system in a strong electromagnetic wave." Physics-Uspekhi 16.3 (1973): 427-433.
  9. ^ Crance, Michèle. "Nonperturbative ac Stark shifts in hydrogen atoms." JOSA B 7.4 (1990): 449-455.
  10. ^ Cardoso, G.C.; Tabosa, J.W.R. (2000). "Four-wave mixing in dressed cold cesium atoms". Optics Communications. 185 (4–6). Elsevier BV: 353–358. Bibcode:2000OptCo.185..353C. doi:10.1016/s0030-4018(00)01033-6. ISSN 0030-4018.
  11. ^ Mollow, B. R. (1969-12-25). "Power Spectrum of Light Scattered by Two-Level Systems". Physical Review. 188 (5). American Physical Society (APS): 1969–1975. Bibcode:1969PhRv..188.1969M. doi:10.1103/physrev.188.1969. ISSN 0031-899X.
  12. ^ a b Grimm, Rudolf; Weidemüller, Matthias; Ovchinnikov, Yurii B. (2000-01-01), Bederson, Benjamin; Walther, Herbert (eds.), "Optical Dipole Traps for Neutral Atoms", Advances In Atomic, Molecular, and Optical Physics, vol. 42, Academic Press, pp. 95–170, retrieved 2023-07-26
  13. ^ a b c Grimm, Rudolf; Weidemüller, Matthias; Ovchinnikov, Yurii B. (1999-02-24). "Optical dipole traps for neutral atoms". Advances in Atomic Molecular and Optical Physics. 42: 95. arXiv:physics/9902072. Bibcode:2000AAMOP..42...95G. doi:10.1016/S1049-250X(08)60186-X. ISBN 9780120038428. S2CID 16499267.
  14. ^ a b Roy, Richard J. (2017). Ytterbium and Lithium Quantum Gases: Heteronuclear Molecules and Bose-Fermi Superfluid Mixtures (PDF). p. 10. Bibcode:2017PhDT........64R.
  15. ^ Foot, C. J. (2005). Atomic physics. Oxford University Press. p. 199. ISBN 978-0-19-850695-9.
  16. ^ Ivanov, Vladyslav V.; Gupta, Subhadeep (2011-12-20). "Laser-driven Sisyphus cooling in an optical dipole trap". Physical Review A. 84 (6): 063417. arXiv:1110.3439. Bibcode:2011PhRvA..84f3417I. doi:10.1103/PhysRevA.84.063417. ISSN 1050-2947.
  17. ^ Brion, E; Pedersen, L H; Mølmer, K (2007-01-17). "Adiabatic elimination in a lambda system". Journal of Physics A: Mathematical and Theoretical. 40 (5): 1033–1043. arXiv:quant-ph/0610056. Bibcode:2007JPhA...40.1033B. doi:10.1088/1751-8113/40/5/011. ISSN 1751-8113. S2CID 5254408.
  18. ^ Radmore, P M; Knight, P L (1982-02-28). "Population trapping and dispersion in a three-level system". Journal of Physics B: Atomic and Molecular Physics. 15 (4): 561–573. Bibcode:1982JPhB...15..561R. doi:10.1088/0022-3700/15/4/009. ISSN 0022-3700.
  19. ^ Linskens, A. F.; Holleman, I.; Dam, N.; Reuss, J. (1996-12-01). "Two-photon Rabi oscillations". Physical Review A. 54 (6): 4854–4862. Bibcode:1996PhRvA..54.4854L. doi:10.1103/PhysRevA.54.4854. hdl:2066/27687. ISSN 1050-2947. PMID 9914052. S2CID 40169348.
  20. ^ Anisimov, Petr M.; Dowling, Jonathan P.; Sanders, Barry C. (2011). "Autler-Townes Splitting vs. Electromagnetically Induced Transparency: Objective Criterion to Discern Between Them in any Experiment". Physical Review Letters. 107 (16): 163604. arXiv:1102.0546. Bibcode:2011PhRvL.107p3604A. doi:10.1103/PhysRevLett.107.163604. PMID 22107383. S2CID 15372792.

Further reading

edit
  • Cohen-Tannoudji et al., Quantum Mechanics, Vol 2, p 1358, trans. S. R. Hemley et al., Hermann, Paris 1977