Phonon arithmetic in a trapped ion system

Um, Mark; Zhang, Junhua; Lv, Dingshun; Lu, Yao; An, Shuoming; Zhang, Jingning; Nha, Hyunchul; Kim, M. S.; Kim, Kihwan

doi:10.1038/ncomms11410

Cited by 72 publications

(73 citation statements)

References 44 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…In future experiments, this can be resolved by rotating the two principle axes of transverse motion (X and Y) with respect to the Raman beams such that only one mode is excited. For multi-phonon hopping experiments, it is also necessary to implement fast measurement of phonon distributions (instead of single phonon occupancy) using cascaded sideband pulses, as has been implemented on single ions [25,26].…”

mentioning

confidence: 99%

Observation of Hopping and Blockade of Bosons in a Trapped Ion Spin Chain

et al. 2018

View full text Add to dashboard Cite

The local phonon modes in a Coulomb crystal of trapped ions can represent a Hubbard system of coupled bosons. We selectively prepare single excitations at each site and observe free hopping of a boson between sites, mediated by the long-range Coulomb interaction between ions. We then implement phonon blockades on targeted sites by driving a Jaynes-Cummings interaction on individually addressed ions to couple their internal spin to the local phonon mode. The resulting dressed states have energy splittings that can be tuned to suppress phonon hopping into the site. This new experimental approach opens up the possibility of realizing large-scale Hubbard systems from the bottom up with tunable interactions at the single-site level.Trapped atomic ions are an excellent medium for quantum computation and quantum simulation, acting as a many-body system of spins with programmable and reconfigurable Ising couplings [1][2][3]. In this system, the long-range spin-spin interaction is mediated by the collective motion of an ion chain and emerges over time scales longer than the propagation time of mechanical waves or phonons through the crystal [4,5]. On the other hand, at shorter timescales, such a chain represents a bosonic system of phonon modes that describe the local motion of individual ions. Here each local mode is defined by the harmonic confinement of a particular ion with all other ions pinned. In this picture, phonons hop between the local modes due to the long-range Coulomb interaction between ions [6][7][8]. This intrinsic hopping in trapped ion crystals makes it a viable candidate for simulating manybody systems of bosons [6,7], boson interference [9] and applications such as boson sampling [10].Such a system of local oscillators can be approximated to the lowest order of the transverse ion displacement by the phonon Hamiltonian (h = 1),Here the local mode frequency of each ion is expressed as a sum of the common mode transverse trap frequency ω x and a position-dependent frequency shift ω j experienced by the j−th ion [6,7]. The local mode bosonic creation and annihilation operators are a † j and a j , respectively. The long-range hopping term κ jk = e 2 /(2M ω x d 3 jk ) is determined by the distance d jk between ions j and k, where e and M are the charge and mass of a single ion.By applying external controls to the system, on-site interactions between phonons lead to the simulation of Hubbard models of bosons. For instance, applied position-dependent Stark shifts can result in effective phonon-phonon interactions [6]. Combined with phonon hopping between sites, such a system follows the BoseHubbard model. In the approach considered here, the internal spin is coupled to the external phonon mode by driving the spin resonance on a motion-induced sideband transition [11]. This gives rise to nonlinear onsite interactions between spin-phonon excitations (polaritons). Such a system simulates the Jaynes-CummingsHubbard model, which describes an array of coupled cavities [7,8,[12][13][14].In order to study the dynami...

show abstract

mentioning

confidence: 99%

Observation of Hopping and Blockade of Bosons in a Trapped Ion Spin Chain

et al. 2018

View full text Add to dashboard Cite

show abstract

“…In optics such methods include homodyning [1], photon counting [2] and photon number resolving detection [3,4]. In a trapped-ion system the motion of ions is usually probed by coupling it to the ion's internal state via a motional sideband transition, which enables reconstruction of phonon number distribution [5][6][7][8][9] or measurement of the parity of the motional state [10]. However most of the methods to determine the motional state are destructive in nature and the state of the oscillator after measurement does not correspond to its outcome.An ideal projective measurement should leave the quantum system immediately after measurement in the state defined by the measurement outcome.…”

mentioning

confidence: 99%

Cross-Kerr Nonlinearity for Phonon Counting

Ding¹,

Maslennikov²,

Hablutzel³

et al. 2017

Phys. Rev. Lett.

View full text Add to dashboard Cite

State measurement of a quantum harmonic oscillator is essential in quantum optics and quantum information processing. In a system of trapped ions, we experimentally demonstrate the projective measurement of the state of the ions' motional mode via an effective cross-Kerr coupling to another motional mode. This coupling is induced by the intrinsic nonlinearity of the Coulomb interaction between the ions. We spectroscopically resolve the frequency shift of the motional sideband of the first mode due to presence of single phonons in the second mode and use it to reconstruct the phonon number distribution of the second mode.The quantum harmonic oscillator is one of the foundational models in physics which describes, among many other systems, the mode of the electromagnetic field and the motion of trapped particles. A rich toolbox of methods exists to characterize its quantum state. In optics such methods include homodyning [1], photon counting [2] and photon number resolving detection [3,4]. In a trapped-ion system the motion of ions is usually probed by coupling it to the ion's internal state via a motional sideband transition, which enables reconstruction of phonon number distribution [5][6][7][8][9] or measurement of the parity of the motional state [10]. However most of the methods to determine the motional state are destructive in nature and the state of the oscillator after measurement does not correspond to its outcome.An ideal projective measurement should leave the quantum system immediately after measurement in the state defined by the measurement outcome. Such measurements have been performed by utilizing the nonlinear dispersive interaction between the oscillator and another quantum system such as Rydberg atoms [11,12], superconducting circuits [13,14] or electron motion in a Penning trap [15]. An example of such an interaction in the context of a projective measurement of the Fock state [16][17][18] is the cross-Kerr nonlinear coupling between two different quantum oscillators. This coupling is described by the HamiltonianĤ kerr ∼ χn anb , wherê However, several difficulties arise in the practical implementation of the cross-Kerr nonlinearity. In optics, the interaction between the photons is usually weak [22] and difficult to control. In addition, locality and causality arguments preclude large conditional phase shifts for traveling single photon wave packets [23][24][25][26]. One way of overcoming these limitations was recently demonstrated by mapping one of the photons to an atomic excitation [27][28][29]. Other similar schemes have also been proposed [30].In our approach we simulate the cross-Kerr interaction in quantum optics in a system of trapped ions. The anharmonicity of the Coulomb interaction induces a strong nonlinear interaction between the motional modes [31]. In the dispersive regime, where no energy exchange between the modes is possible, this coupling manifests itself as a shift of the frequency of the motional mode that is proportional to the number of phonons in another motional mode ...

show abstract

“…The “uniform red sideband” 46 – 48 is implemented as an adiabatic transition where the transfer speed between and is the same for all n = 1, 2, …. It is realized by adding a time-dependent amplitude A ( t ) = sin( πt / d ) and a time-dependent phase φ ( t ) = −1/ β sin( πt / d ) to the normal red-sideband operation, and some additional terms to compensate for the AC Stark shift.…”

Section: Methodsmentioning

confidence: 99%

“…To measure , however, we need a phonon projective measurement 46 – 48 . Instead of using fluorescence detection together with a post-selection scheme, which may introduce significant heating errors because of photon scattering, here we use an auxiliary state as a swap buffer.…”

Section: Methodsmentioning

confidence: 99%

“…For the average boson number measurement, we first use optical pumping to trace out electronic states 48 and then apply a blue sideband time sweep from t = 0 to t = 12 π blue 50 . We get the phonon number distribution by fitting the result signals through the maximum likelihood method with parameters of the Fock state populations 46 , 47 . The main uncertainty in the average phonon measurement comes from fitting and we include one standard deviation as an uncertainty throughout the manuscript.…”

Section: Methodsmentioning

confidence: 99%

See 1 more Smart Citation

Experimental quantum simulation of fermion-antifermion scattering via boson exchange in a trapped ion

Zhang

Shen

et al. 2018

Nat Commun

Self Cite

View full text Add to dashboard Cite

Quantum field theories describe a variety of fundamental phenomena in physics. However, their study often involves cumbersome numerical simulations. Quantum simulators, on the other hand, may outperform classical computational capacities due to their potential scalability. Here we report an experimental realization of a quantum simulation of fermion-antifermion scattering mediated by bosonic modes, using a multilevel trapped ion, which is a simplified model of fermion scattering in both perturbative and non-perturbative quantum electrodynamics. The simulated model exhibits prototypical features in quantum field theory including particle pair creation and annihilation, as well as self-energy interactions. These are experimentally observed by manipulating four internal levels of a 171 Yb + trapped ion, where we encode the fermionic modes, and two motional degrees of freedom that simulate the bosonic modes. Our experiment establishes an avenue towards the efficient implementation of field modes, which may prove useful in studies of quantum field theories including non-perturbative regimes.

show abstract

Phonon arithmetic in a trapped ion system

Cited by 72 publications

References 44 publications

Observation of Hopping and Blockade of Bosons in a Trapped Ion Spin Chain

Observation of Hopping and Blockade of Bosons in a Trapped Ion Spin Chain

Cross-Kerr Nonlinearity for Phonon Counting

Experimental quantum simulation of fermion-antifermion scattering via boson exchange in a trapped ion

Contact Info

Product

Resources

About