Physical Review Research (Sep 2021)

Fast and differentiable simulation of driven quantum systems

  • Ross Shillito,
  • Jonathan A. Gross,
  • Agustin Di Paolo,
  • Élie Genois,
  • Alexandre Blais

DOI
https://doi.org/10.1103/PhysRevResearch.3.033266
Journal volume & issue
Vol. 3, no. 3
p. 033266

Abstract

Read online Read online

The controls enacting logical operations on quantum systems are described by time-dependent Hamiltonians that often include rapid oscillations. In order to accurately capture the resulting time dynamics in numerical simulations, a very small integration time step is required, which can severely impact the simulation run time. Here, we introduce a semianalytic method based on the Dyson expansion that allows us to time-evolve driven quantum systems much faster than standard numerical integrators. This solver, which we name Dysolve, efficiently captures the effect of the highly oscillatory terms in the system Hamiltonian, significantly reducing the simulation's run time as well as its sensitivity to the time-step size. Furthermore, this solver provides the exact derivative of the time-evolution operator with respect to the drive amplitudes. This key feature allows for optimal control in the limit of strong drives and goes beyond common pulse-optimization approaches that rely on rotating-wave approximations. As an illustration of our method, we show results of the optimization of a two-qubit gate using transmon qubits in the circuit QED architecture.