The squeezed Kerr oscillator: spectral kissing and phase-flip robustness

  1. Nicholas E. Frattini,
  2. Rodrigo G. Cortiñas,
  3. Jayameenakshi Venkatraman,
  4. Xu Xiao,
  5. Qile Su,
  6. Chan U Lei,
  7. Benjamin J. Chapman,
  8. Vidul R. Joshi,
  9. S. M. Girvin,
  10. Robert J. Schoelkopf,
  11. Shruti Puri,
  12. and Michel H. Devoret
By applying a microwave drive to a specially designed Josephson circuit, we have realized an elementary quantum optics model, the squeezed Kerr oscillator. This model displays, as the
squeezing amplitude is increased, a cross-over from a single ground state regime to a doubly-degenerate ground state regime. In the latter case, the ground state manifold is spanned by Schrödinger-cat states, i.e. quantum superpositions of coherent states with opposite phases. For the first time, having resolved up to the tenth excited state in a spectroscopic experiment, we confirm that the proposed emergent static effective Hamiltonian correctly describes the system, despite its driven character. We also find that the lifetime of the coherent state components of the cat states increases in steps as a function of the squeezing amplitude. We interpret the staircase pattern as resulting from pairwise level kissing in the excited state spectrum. Considering the Kerr-cat qubit encoded in this ground state manifold, we achieve for the first time quantum nondemolition readout fidelities greater than 99%, and enhancement of the phase-flip lifetime by more than two orders of magnitude, while retaining universal quantum control. Our experiment illustrates the crucial role of parametric drive Hamiltonian engineering for hardware-efficient quantum computation.

Fast Universal Control of an Oscillator with Weak Dispersive Coupling to a Qubit

  1. Alec Eickbusch,
  2. Volodymyr Sivak,
  3. Andy Z. Ding,
  4. Salvatore S. Elder,
  5. Shantanu R. Jha,
  6. Jayameenakshi Venkatraman,
  7. Baptiste Royer,
  8. S. M. Girvin,
  9. Robert J. Schoelkopf,
  10. and Michel H. Devoret
Efficient quantum control of an oscillator is necessary for many bosonic applications including error-corrected computation, quantum-enhanced sensing, robust quantum communication,
and quantum simulation. For these applications, oscillator control is often realized through off-resonant hybridization to a qubit with dispersive shift χ where typical operation times of 2π/χ are routinely assumed. Here, we challenge this assumption by introducing and demonstrating a novel control method with typical operation times over an order of magnitude faster than 2π/χ. Using large auxiliary displacements of the oscillator to enhance gate speed, we introduce a universal gate set with built-in dynamical decoupling consisting of fast conditional displacements and qubit rotations. We demonstrate the method using a superconducting cavity weakly coupled to a transmon qubit in a regime where previously known methods would fail. Our demonstrations include preparation of a single-photon state 30 times faster than 2π/χ with 98±1(%) fidelity and preparation of squeezed vacuum with a squeezing level of 11.1 dB, the largest intracavity squeezing reported in the microwave regime. Finally, we demonstrate fast measurement-free preparation of logical states for the binomial and Gottesman-Kitaev-Preskill (GKP) code, and we identify possible fidelity limiting mechanisms including oscillator dephasing.

Resonator reset in circuit QED by optimal control for large open quantum systems

  1. Samuel Boutin,
  2. Christian Kraglund Andersen,
  3. Jayameenakshi Venkatraman,
  4. Andrew J. Ferris,
  5. and Alexandre Blais
We study an implementation of the open GRAPE (Gradient Ascent Pulse Engineering) algorithm well suited for large open quantum systems. While typical implementations of optimal control
algorithms for open quantum systems rely on a transformation to Liouville space, our implementation avoid this transformation which leads to a polynomial speed-up of the open GRAPE algorithm in cases of interest. As an example, we apply our implementation to active reset of a readout resonator in circuit QED. In this problem, the shape of a microwave pulse is optimized to steer the cavity state towards its ground state as fast as possible. Using our open GRAPE implementation, we obtain pulse shapes leading to a reset time over four times faster than typical passive reset.