Disentanglement of qubits 1 and 2 based on conditional state transfer and blockade

<p><strong>Figure 5.</strong> Disentanglement of qubits 1 and 2 based on conditional state transfer and blockade. Parameters are (a) γ<sub>01</sub>/Ω<sub>01</sub> = 0, Δ<sub><em>r</em></sub>/Ω<sub>01</sub> = 10, (b) γ<sub>01</sub>/Ω<sub>01</sub> = 0.02, Δ<sub><em>r</em></sub>/Ω<sub>01</sub> = 10, (c) γ<sub>01</sub>/Ω<sub>01</sub> = 0, Δ<sub><em>r</em></sub>/Ω<sub>01</sub> = 5, (d) γ<sub>01</sub>/Ω<sub>01</sub> = 0.02, Δ<sub><em>r</em></sub>/Ω<sub>01</sub> = 5. Without dissipation, transferring from initial state |0〉<sub>1</sub>|0〉<sub>2</sub> to |1〉<sub>1</sub>|0〉<sub>2</sub> is perfect (solid). The system in the state |0〉<sub>1</sub>|<em>r</em>〉<sub>2</sub> is blocked depending on the Rydberg interaction strength Δ<sub><em>r</em></sub> (dash). Involving spontaneous emission reduces the fidelity of the disentangled operation.</p> <p><strong>Abstract</strong></p> <p>Neutral atoms excited to Rydberg states can interact with each other via dipole–dipole interaction, which results in a physical phenomenon called the Rydberg blockade mechanism. The effect attracts much attention due to its potential applications in quantum computation and quantum simulation. Quantum teleportation has been the core protocol in quantum information science playing a key role in efficient long-distance quantum communication. Here, we first propose the implementation of a teleportation scheme with neutral atoms via Rydberg blockade, in which the entangled states of qubits can readily be prepared and the Bell state measurements just require single qubit operations without precise control of Rydberg interaction. The rapid experimental progress of coherent control of Rydberg excitation, optical trapping techniques and state-selective atomic detection promise the application of the teleportation scheme for scalable quantum computation and many-body quantum simulation using the protocol proposed by Gottesman and Chuang (1999 <em>Nature</em> <strong>402</strong> 390) with Rydberg atoms in an optical lattice.</p>