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Fortschr. Phys. 48 (2000) 5 ± 7, 637 ± 641 ± ±

Generation of Entanglement in a System of Two Dipole-Interacting Atoms by Means of Laser Pulses
I. V. Bargatin, B. A. Grishanin, and V. N. Zadkov
International Laser Center and Department of Physics, M. V. Lomonosov Moscow State University, Moscow 119899, Russia

Abstract
Effectiveness of using laser field to produce entanglement between two dipole-interacting identical twolevel atoms is considered in detail. The entanglement is achieved by driving the system with a carefully designed laser pulse transferring the system's population to one of the maximally entangled Dicke states in a way analogous to population inversion by a resonant p-pulse in a two-level atom. It is shown that for the optimally chosen pulse frequency, power and duration, the fidelity of generating a maximally entangled state approaches unity as the distance between the atoms goes to zero.

With recent experimental advances in the methods for coherent manipulation of quantum system on the level of individual particles, many of previously purely speculative problems become surprisingly up-to-date. In particular, much activity of physicists from different research fields is currently devoted to clarification of the entanglement concept [1], ways for its quantification, purification, and creation. Casual creation of entangled states of atoms by coherent manipulation with light currently poses one of the biggest challenges in the field of quantum optics [2]. Conversely, the resonant dipole-dipole interaction (RDDI) and cooperative relaxation effects associated with it are rather traditional topics of research. Recently the RDDI has been investigated as a source of interference phenomena in emission spectra [3 ± 5], super- and sub-radiance [6, 7], photon bunching [8], collisions in the ± laser cooling processes [9, 10], and as a mechanism for realizing quantum logical gates [11, 12]). In this paper we address the question: how effectively can the RDDI along with coherent laser pulses be used for creation of multi-atomic entangled states. In our model two identical two-level atoms are located at a fixed distance R and can be driven by laser beam that is either parallel or perpendicular (according to geometries identi~ fied, respectfully, as antisymmetric and symmetric, Fig. 1) to the radius vector R connecting the atoms. Within the interaction picture and rotating wave approximation, the evolution is described by the following master equation [5]: ц gij @^ q i б^ ^ q^ ^^q ю reff ; q 2siю ^sj ю ^siю sj ю siю sj ^ ; q^ ^ @t h 2 i; j1; 2
= DQWLV\PPHWULF ODVHU EHDP

1

G

5

G
;

<

V\PPHWULF ODVHU EHDP

Fig. 1: Geometry of the model with shown directions of laser beams for the symmetric and antisymmetric excitation.

638
where

I. V. Bargatin et al., Generation of Entanglement

юz а h ^ ^ ^ ^ ^z ^ ^ю юd s1 s2 W1 s1 W2 s2 cs1 s2 h.c. : reff 2

2

is the effective Hamiltonian describing the atoms' self-evolution and interaction with the laser field. Here d wL ю wa is the laser detuning from the atomic transition frequency, W1; 2 are the complex laser driving Rabi frequencies for each atom, ^^^^ ^ ^ six ; siy ; siz ; siф six ф isiy ; i 1; 2; are (using the well-known analogy between two-level atoms and spins) the spin-1 Cartesian component and transition operators of the i-th atom, 2 and we define g, f and g so that g11 g22 g; g12 g21 gg; c f g. The distance dependent parameters g and f , describing, respectfully, the photon exchange rate and coupling due to the RDDI, are defined differently for different types of the atomic transition in question. Defining p 0; q 2 for Dm 0 and p 1; q ю1 for Dm ф1 transitions ~ (with the quantization axis coinciding with R) and assuming that dipole matrix elements of ~ the atoms are collinear to each other and perpendicular to R, we have the following expressions for gj and f j [13]: 3 sin j sin j cos j f j p q юp ; 2 j j3 j2 3 3 cos j cos j sin j gj p q 3 q 2 ; 2 j j j where j kR is the ``dimensionless distanceє between the atoms and k wa =c. Throughout the rest of the article we will consider Dm ф1 case for determinacy as for the Dm 0 case the results are qualitatively same. It can easily be shown when excluding the laser driving that the Dicke states, jwe i jei1 jei2 ; 1 1 jwg i jgi1 jgi2 ; jws i p jgi1 jei2 jei1 jgi2 , and jwa i p jgi1 jei2 ю jei1 jgi2 2 2 (where jeii and jgii are the upper and lower levels of the ith atom) are the eigenvectors of ^eff , while the rest of the atomic dynamics can be described as radiative decay to/from the r antisymmetric jwa i state with the rate gю 1 ю gg and to/from the symmetric jws i one with the rate g 1 gg. Analytical stationary solutions of (1) can be found for the case of symmetric excitation W1 W2 W (without loss of generality we can assume that W here is real and positive) with the stationary populations of the Dicke states given by W4 Ne Na ю ; а2 g2 4d2 2W2 gg2 4d2 f 2 g g2 g 2gg ю 4f d Ns ю
22

g2 4d2 2W

а

2W2 2g2 8d2 W2 gg2 4d2 f 2 g g2 g 2gg ю 4f d

;

4

Ng 1 ю Ne ю Na ю Ns : Graph Ns W; d, corresponding to j 0:5, is shown in Fig. 2a. The antisymmetric case, ~ when the laser beam is parallel to R, allows no such simple analytical solution since in this case the relation between the Rabi frequencies for two atoms is more complex W1 eij W2 W (although W here is again real and positive). However, the numerical solution is easily obtained and the corresponding dependence Na W; d is shown in Fig. 2 b.

Fortschr. Phys. 48 (2000) 5 ± 7 ±

639

D
1
d W

E

1
d W

Fig. 2: The stationary populations of the symmetric (a) and antisymmetric (b) Dicke states versus the laser detuning d and the laser driving Rabi frequency W for j 0:5.

If we aim to transfer the maximum amount of population into one of the maximally entangled states jY a i or jY s i by a short coherent pulse, a good criterion for finding optimal values of the laser field parameters, W and d, is whether the population of the corresponding level is close to 0.5 in the stationary solution. From the analysis of (4) and the graphs in Fig. 2 we deduce that the optimal parameters can be well approximated by p dopt фcj=2 and Wopt jcjj gф with the upper/lower sign for the symmetric/antisymmetric geometries, respectfully. We then have jdopt j jcj=2 ) Wopt ) gф for sufficiently small distances, so that the transition of interest is saturated while at the same time the Rabi frequency is moderate enough to avoid broadband excitation of the Dicke level we are not interested in. Given the optimal parameters obtained in the previous section we proceed to find the fidelity of creation of the maximally entangled states, that is the maximum amount of population one can transfer using pulses of radiation. Considering the dynamics of the populations under optimal parameters laser ving that is turned on at the time instant t 0 dri (when all of the population is in Y g state), we define the optimal pulse duration as the time when the population of the state we are interested in, reaches its first maximum. For the so chosen parameters we plot in Fig. 3a the populations achieved by applying the optimal pulse, as a function of interatomic distance j. The populations approach unity for both geometries as j goes to zero suggesting that almost perfect transfer of population is attainable at small interatomic distances.

D

j

E

j

Fig. 3: a) The fidelity of creation of described in text) versus interatomic pure states limit is 0.75, uncorrelated lines correspond to the antisymmetric

the maximally entangled states (by applying the optimal pulse as distance j. b) The l.h.s. of the Bell inequality (5) versus j. The states lead to 1.5, the classical boundary is 1.0. Solid and dashed and symmetric cases, respectfully.

640

I. V. Bargatin et al., Generation of Entanglement

It is easy to explain this result. As R goes to zero the energy splitting between the symmetric and antisymmetric state, equal to 2c 2f g, grows to infinity (of course, within the evident limitations of negligibility of exchange effects [5]). The ``parasiticє excitation of the levels we are not interested in is then avoided by shifting the laser frequency so that we are in resonance only with one of the excited Dicke states. And if we have in possession arbitrarily strong and arbitrarily tunable laser, as j goes to zero we can produce shorter and shorter pulses thereby decreasing the decay probability during the pulse. In addition, in the case of the symmetric excitation laser driving matrix element for the transitions involving the antisymmetric state vanishes. This means that its population can only come from decay of the upper jY e i level. In fact, in the stationary solution (4) the two states even have the same populations, which are negligible for large detunings. In the antisymmetric excitation case, however, the situation works against us. As the interatomic distance goes to zero the Rabi frequencies of the two atoms become closer in phase, diminishing along the way the matrix elements of transitions involving antisymmetric state to zero. But even with such a small value of excitation efficiency, we can still manage to transfer the population to the antisymmetric state because the symmetric excitation remains far off resonance, and get as a reward the increased lifetime t 1=1 ю gR g ) 1=g of our maximally entangled state (using this ``durabilityє of the antisymmetric jY a i state, we can also create some entanglement passively as described in [14], but it is difficult to obtain a high fidelity that way). Now, instead of calculating different entanglement measures [15] (and then figuring out which of them better suits our purposes), we will consider how much our created states violate a simple Bell inequality. It can be easily shown [1] that for any classical local n variable distribution the probabilities of finding the atoms' ``spinsє aligned along ~z direction after coherent rotations fulfill the following Bell inequality: Pdiff 0; 2p=3 Pdiff 2p=3; ю2p=3 P
diff

0; ю2p=3 ! 1 ;

5

where the Pdiff j1 ; j2 is the probability of getting different results of the measurements of the two spins, i.e., of finding one spin aligned along the ~z direction and the second one n against it after the first spin is rotated by j1 and the second one by j2 around OX or OY axis. In quantum mechanics, however, the left hand side of (5) amounts to only 0.75 for the pure maximally entangled jY a i state. To apply the same Bell inequality (5) to the case of the symmetric excitation geometry we first perform a 180 rotation along ~z -axis with one n of the atoms (thus turning jY s i state into jY a i one) and then perform the measurement as described above. In Fig. 3 b the l.h.s. of (5) is plotted against the dimensionless distance j showing that for j less than % 0:5 we have the violation of the inequality and as j 3 0 we recover the pure states limit of 0.75. In summary, while being admittedly unrealistic, our model offers a few insights into how efficiently the RDDI can be used to entangle atoms or implement quantum logic gates [12, 16]. We have shown that considerable fidelities (up to 0.8) of creation of one of the maximally entangled Dicke states and Bell inequality violations can be realized if the atoms are placed within distances of the order of a tenth of a wavelength of the working transition. Such distances can be achieved, for example, in the ground vibrational states of two atoms in optical lattices [10, 12, 17]. However, all of the practical applications (say, quantum teleportation [18]) require stable entanglement. Even the Bell inequalities violation considered above can be verified only if the produced entanglement lives sufficiently long so that the atoms can be spatially separated for individual addressing and photodetection (imperfectness of the detectors constitutes another problem that has not yet been addressed). Of course, this cannot be achieved in our model, since the dipole interaction and the decay have the same physical nature and we cannot avoid the latter while making use of the former.

Fortschr. Phys. 48 (2000) 5 ± 7 ±

641

Relatively stable coherences (with lifetimes of the order of seconds) can be generated if we use the Zeeman sublevels of the atoms as the working levels (qubits). The RDDI is negligible for them, but using three-level atoms in L-configuration instead of two-level atoms we can overcome that difficulty. We can use Raman pulses transferring the population between the Zeeman sublevels via a higher lying ``transitє Dicke level (STIRAP techniques [19] might be an alternative), so that the transitions between each of the Zeeman sublevels states and the excited ``transitє state benefit from substantial RDDI. Then by choosing one-photon detunings to be in resonance with only one of the higher level Dicke states we can generate the Zeeman sublevels entanglement. In this paper we present the first tentative quantitative model of the process of entanglement of atoms with the help of the RDDI. Much remains to be done before we can compare the results of the theory with possible practical implementations, but the conclusions presented here are promising and therefore encourage further theoretical developments.
This work was partially supported by Volkswagen Stiftung (grant No. 1/72944) and the Russian Ministry of Science and Technical Policy.

References
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