Photons can carry angular momentum, not only due to their spin, but also due to their spatial structure. This extra twist has been used, for example, to drive circular motion of microscopic particles in optical tweezers as well as to create vortices in quantum gases. Here we excite an atomic transition with a vortex laser beam and demonstrate the transfer of optical orbital angular momentum to the valence electron of a single trapped ion. We observe strongly modified selection rules showing that an atom can absorb two quanta of angular momentum from a single photon: one from the spin and another from the spatial structure of the beam. Furthermore, we show that parasitic ac-Stark shifts from off-resonant transitions are suppressed in the dark centre of vortex beams. These results show how light’s spatial structure can determine the characteristics of light–matter interaction and pave the way for its application and observation in other systems.
The interaction between light and matter is governed by symmetries from which conservation laws of energy, momentum and angular momentum emerge. For example, the sense of rotation of the polarization of a photon along its propagation axis determines the torque it can exert on matter. This phenomenon is known to occur on macroscopic1,2 as well as on atomic scales3. At a macroscopic level, the polarization of light can be used to rotate large objects as well as micrometer-sized particles. On an atomic level, the polarization of light can change the angular momentum of bound electrons. This is expressed in the form of selection rules, which indicate which changes of angular momentum of the atom are possible when it interacts with a photon.
Specially structured light beams can have extra angular momentum associated with their spatial mode structure4. In particular, Laguerre–Gaussian beams carry an additional orbital angular momentum (OAM) of l per photon5,6. Laguerre–Gaussian beams have been proposed and employed for numerous novel applications such as high-dimensional quantum information7, quantum cryptography8 and quantum memories9. Also, OAM-carrying beams of electrons10, neutrons11 and electromagnetic terahertz radiation12 have been demonstrated.
Light beams with OAM have been used to drive motion of microscopic particles in optical tweezers as well as to generate vortices in degenerate quantum gases13,14. Up to date, however, it was not clear if this extra angular momentum could affect the state of motion of bound electrons, that is, change the standard selection rules of optical excitation. This issue was debated during the last two decades15,16,17,18,19,20,21,22,23,24,25, and first experiments26,27,28 did not observe these effects.
Electromagnetically driven transitions between two atomic states occur if the superposition of their charge distributions match the multipole structure of the exciting field29. This allows for categorizing atomic transitions in dipolar, quadrupolar and higher orders: a dipole transition is driven by an oscillating field, a quadrupole one is driven by an oscillating field gradient and so on. Quadrupole transitions, driven by field gradients occurring in optical beams, are particulary interesting for they can even occur where there is no light intensity but only field gradient30.
As travelling waves, optical beams have a longitudinal field gradient, which allows for driving electric quadrupole transitions31. A transverse gradient, due to the spatial structure of the beam front, can drive quadrupole transitions too. In particular, the centre of beams exhibit a strong field gradient, where the intensity vanishes.
In this work, we report the observation of transfer of optical OAM from a vortex beam to the motion of the valence electron of a trapped ion. In particular, we measure strongly modified selection rules accounting for OAM associated with the spatial structure of the beam. We observe strong excitation in the dark penumbra near the centre of the beam, driven solely by the transverse field gradient. In such conditions, we also observe strong suppression from parasitic ac-Stark shifts of off-resonant transitions.
Structured beams interacting with a single trapped ion
For the experimental investigation of the interaction of structured light with the internal degrees of freedom of atoms, we use a single laser-cooled 40Ca+ ion trapped in a microstructured segmented Paul trap with a thermal spatial spread of ∼60 nm (see Fig. 1). Precise sub-nanometer positioning of the ion along the structured beam is achieved by changing the voltages of the trapping electrodes32.
A continuous-wave laser near 729 nm is used to drive the 42S1/2↔32D5/2 quadrupole transition. As indicated in Fig. 1, this laser is shaped to the transverse , and modes by holographic plates33 and focused onto the ion with a beam waist of w0=2.7(2) μm.
To measure the interaction strength, the ion is first initialized by optical pumping on one of the 42S1/2 sublevels (see ‘Methods’ section). Upon exposure to the optical field on resonance with the quadrupole transition, the internal state of the ion undergoes coherent oscillations between the ground and excited state, which are measured by state-dependent fluorescence. The Rabi frequency Ω of these oscillations is measured to quantify the coupling strength. Each Zeeman-split sublevel of the 42S1/2↔32D5/2 transition is spectroscopically resolved due to an external magnetic field of 13 mT, allowing to probe all transitions independently by tuning the laser to the respective resonance (see ‘Methods’ section for more details).
Modification of transition selection rules with light OAM
We demonstrate the joint transfer of a quantum of OAM and spin angular momentum (SAM) from the optical field to the ion. For this, we choose a setting with rotational symmetry about the propagation axis z of the 729 nm beam. This is achieved by aligning the magnetic field along the z-direction and placing the ion in the beam centre, at the bright centre for the Gaussian beam or at the dark penumbra for the beams, respectively. For this geometry, the angular momentum projection along z is a conserved quantity, which enforces that transitions are allowed only if the total angular momentum mph of the photon matches the difference in angular momentum projection Δm between initial and final atomic states. The photon’s total angular momentum mph is given by the sum of SAM (for circular polarization σ±=±1) and OAM (l=0 for and l=±1 for ) modes.
We verify that OAM contributes to angular momentum conservation by measuring the Rabi frequency for all possible values of mph and Δm. We indeed observe coherent Rabi oscillations in all cases where angular momentum conservation is fulfilled: for Δm=0, an OAM of ±1 compensates for a SAM of ∓1, whereas for Δm=±2, OAM and SAM add up. In Fig. 2, the results for initialization in the state are shown. One clearly sees that the interaction strength for all the cases when mph=Δm is stronger than when it is not (analogous results obtained for the opposite spin initialization are presented in the Supplementary Table 2).
For the transitions driven by the (Gaussian) beam, the power-normalized Rabi frequencies are measured to be 13.0(8) times stronger than those driven by the (vortex) beams. This is consistent with the expected relative strength21 for the measured beam waist, as determined by the ratio of waist to optical wavelength: πw0/λ=12.6(3). Additionally, the relative coupling strengths of different transitions are governed by the Wigner–Eckart theorem to account for coupling of SAM and OAM. For all transitions where angular momentum conservation is not fulfilled, that is, where Δm≠mph, the measured coupling strengths are below 3% of the coupling strengths measured for the mph=Δm=±1 transitions, consistent with our error estimations (see ‘Methods’ section).
For the case of an beam, we observe—within our experimental precision—negligible excitation for all transitions and polarization combinations. This is due to the fact that at the penumbra of the , the field amplitude increases quadratically in the radial direction. Thus, the quadrupole transition—which is driven by field gradients—cannot be excited at the centre of an beam.
We use the ion as a localized field probe34,35 to map out the transverse and longitudinal field gradients for the , and beams by transversely moving the ion through the focus, see Fig. 3. Here we choose the magnetic field at 45° with respect to the propagation direction z of the 729 nm beam, which is now linearly polarized. We probe the Δm=±1 transition, where the excitation mechanism is controlled by the optical polarization21 for this setting: if the electric field is vertically (V) polarized (orthogonal to the plane spanned by magnetic field and beam propagation direction), the excitation strength is determined by the longitudinal gradient, proportional to the local intensity. By contrast, for horizontal (H) polarization, the coupling strength is given by the transverse gradient.
For each of the LG beams, we observe that the Rabi frequency measurement with V polarization reproduces the respective field amplitude profile, that is, the coupling strength is proportional to the square root of the laser intensity. Conversely, for the case of the measurements with H polarization, the strength of the transverse gradient is mapped out. At the penumbra of the vortex beam (Fig. 3b), the coupling mediated by the transverse gradient exceeds the one corresponding to the longitudinal gradient case by 6 s.d., that is, the ion is actually excited in the dark. We name these dark regions of an optical beam, where the effects of its gradient can be stronger than those due to the local intensity, the penumbra. This is not to be confused with the vortex or quantum core36. In fact, it is in the penumbra of the where the Δm=0, ±2 transitions were driven in the previous experiment.
By contrast, for the , we observe that both longitudinal- and transverse-gradient-driven excitations are below our sensitivity limit at the central penumbra of the beam, see Fig. 3c. These results show, as mentioned before, that at the centre of this beam both the electric field amplitude and its transverse gradient vanish.
The outer shoulders observed in the measurements represent deviations from ideal Laguerre–Gaussian beam profiles. We confirm this by imaging the beam profiles on a CCD camera before the focusing lenses. The corresponding outer rings are clearly observed, see insets in Fig. 3. These beam imperfections result from fibre out-coupling and diffraction on the holographic plates generating the LG beams.
For all three cases, beam-centre alignment is done with respect to the central feature of the longitudinal gradient. This feature is sharper for the beam than for and , leading to slight miss-alignment of the longitudinal with respect to transverse gradients for these cases.
AC-Stark shift suppression
An important challenge for the operation of laser-driven atomic qubits37 as well as for the implementation of optical frequency standards38 is the mitigation of ac-Stark shifts. These are caused by off-resonant coupling of the probe beam to parasitic atomic transitions. In our setting, the ac-Stark shifts are mainly generated either by off-resonant driving of the quadrupole transition, or by far off-resonant coupling to the 42S1/2↔42P1/2, 42S1/2↔42P3/2 and 32D5/2↔42P3/2 dipole transitions. The quadrupolar ac-Stark shift can be eliminated by polarization and magnetic field alignment, or by additional compensation beams. Here we demonstrate that dipolar shifts are substantially suppressed in the penumbra of a vortex beam, whereas the coherent coupling persists.
We measure the energy shift ΔS caused by the 729 nm beam in the vortex mode, which is red detuned by Δ=2π × 25 MHz with respect to the transition. This is done by carrying out a Ramsey experiment, where a superposition of these two states acquires a phase ϕ=ΔS × t (ref. 37) upon exposure to the beam at power for time t (see ‘Methods’ section). We compare the results for case A, where the ion is placed in the penumbra of the H polarized beam, and for case B, where the ion is placed at the intensity maximum of the side lobe of the V polarized beam, as marked in Fig. 3b). In case A, the transition is driven in the dark by the transverse gradient, whereas for case B, it is driven by the longitudinal gradient, and the ion is exposed to a high intensity. At position A, we measure an ac-Stark shift of ΔS=2π × 1.54(15) kHz at a power of =7.50(15) mW and a Rabi frequency Ω=2π × 11.93(24) kHz at a power of =20(1) μW. At position B, we measure an ac-Stark shift of ΔS=2π × 19.1(1) kHz at a power of =1.75(4) mW and a Rabi frequency Ω=2π × 15.67(31) kHz at a power of =2.6(1) μW.
From the measured values for the ac-Stark shift, the power-normalized quadrupolar contribution is subtracted, that is, . Additionally, the values are normalized by overall optical power . The corrected, normalized shift in case A is determined to be 0.70(25)% of the corresponding value for case B. This residual shift is attributed to thermal fluctuations of the ion position into regions of non-zero field amplitude (see ‘Methods’ section). Moreover, we compare the power-normalized ratios of the residual dipolar shift to the respective Rabi frequency. The quantity is a suitable figure-of-merit, as it gives the ratio of the undesired shift to the desired coherent coupling when multiplied with the square root of the employed optical power. For the transverse-gradient-driven excitation in the dark, we find a suppression by ξA/ξB =2.5(9)% as compared with the longitudinal-gradient-driven case.
Our results open up a realm of future research directions, in which OAM of light can be harnessed as an extra control parameter in light–matter interaction. The key aspects in our study are the use of a quadrupole transition, focusing the probe beam close to the diffraction limit and using a well-localized atomic system. Determining which of these conditions are sufficient to observe enhanced effects due to the structure of the beam is a prerequisite for extending this technique to other physical systems as well as for possible applications. These include the mapping of high-dimensional flying qubits from photons to atomic quantum memories7, tailored interactions to improve quantum logic gates37, the control of quantized motion of trapped particles21,22, the suppression of ac-Stark shifts for optical clock transitions38 and the excitation of high OAM Rydberg states39, exciting molecule complexes40 as well as in artificial atoms41.
For the beam profile reconstructions and the ac-Stark shift experiments, where the magnetic field was at 45° with respect to the 729 nm beam, optical pumping was carried out with σ+ polarized light driving the 42S1/2↔42P1/2 dipole transition near 397 nm. For the experiments on the determination of the transition selection rules, the 729 nm beam is aligned parallel to the magnetic field. Here pumping is carried out by transferring population from the 42S1/2 levels to be depleted to a 32D5/2 level, and then resetting the population to the 42S1/2 manifold with light resonant on the 32D5/2↔42P3/2 transition near 854 nm, see Fig. 1. By repeating this sequence 10 times, we can prepare the desired state at a fidelity ≳99%.
Coupling strength determination sequence
Each sequence starts with Doppler laser cooling, followed by optical pumping into either of the two ground-state sublevels . Next, the probe pulse near 729 nm is applied for driving Rabi oscillations between the ground state and the metastable 32D5/2 state. The final state is determined from observing state-dependent fluorescence on an EMCCD camera, whereas illuminating the ion near 397 and 866 nm. Observation of fluorescence indicates the ion to be in the S1/2 state, whereas absence of fluorescence indicates a collapse into the 32D5/2 state. Before the sequence is repeated, we apply light near 854 nm to remove population from the 32D5/2 manifold, see Fig. 1. By repeating this sequence 200 times, we obtain an estimate of the 32D5/2 state occupation probability. By measuring this excitation probability versus the probe pulse duration, ranging up to a few hundred μs, we determine the Rabi frequency Ω.
Error estimation on the coupling strengths
Small residual excitation measured on forbidden transitions, where Δm≠mph, is attributed to three effects: thermal position fluctuations of the ion, imperfect optical polarization and a non-zero angle between the magnetic field and the laser propagation direction. The thermal position spread is most prominent on the transitions involving the vortex beam due to its sharp transverse structure (mph=0, ±2, see Fig. 2c). To estimate the excess excitation, we calculate the overlap between the beam’s field profile with the ion’s thermal position spread. This spread is given by about 60 nm, as independently measured for our experimental conditions of a Doppler-cooled 40Ca+ ion. Consistent with these estimations, all spurious couplings observed are below 3% of the coupling strength pertaining to the mph=Δm=±1 transition.
Stark shift determination sequence
State preparation and read-out are carried out as for the sequence before. After preparation, the ion located either at the penumbra or at the intensity maximum is exposed to the probe beam resonant to the transition at a pulse area of π/2, such that a balanced superposition of both states is created. Next, it is exposed to the off-resonant vortex beam for time t, which induces an ac-Stark phase shift on the superposition. Finally, a second resonant π/2 pulse is applied. After recording the final population in the excited state versus t, the ac-Stark shift is determined by the frequency of the resulting coherent oscillations.
The authors declare that the main data supporting the findings of this study are available within the article and its Supplementary Information files. Extra data are available from the corresponding author upon request.
How to cite this article: Schmiegelow, C. T. et al. Transfer of optical orbital angular momentum to a bound electron. Nat. Commun. 7, 12998 doi: 10.1038/ncomms12998 (2016).
We thank Rupert Ursin and Anton Zeilinger for lending us the holographic phase plates; A. Wiens and A. Walther for contributions on early stages of the experiment; S. Franke-Arnold and D. Budker for useful comments; and A. Z. Khoury for inspiring this work with a lecture on orbital angular momentum of photons at the J. A. Swieca School in 2008 in Sao Paulo. C.T.S. acknowledges the support of the Alexander von Humboldt Foundation.
Raw experimental data for measurements presented in the main text, reporting fluorescence counts as a function of pulse time and ion position.
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