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Time-optimal state transfer for an open qubit

Published 18 Jan 2024 in quant-ph, math.OC, math-ph, and math.MP | (2401.10099v1)

Abstract: Finding minimal time and establishing the structure of the corresponding optimal controls which can transfer a given initial state of a quantum system into a given target state is a key problem of quantum control. In this work, this problem is solved for a basic component of various quantum technology processes -- a qubit interacting with the environment and experiencing an arbitrary time-dependent coherent driving. We rigorously derive both upper and lower estimates for the minimal steering time. Surprisingly, we discover that the optimal controls have a very special form -- they consist of two impulses, at the beginning and at the end of the control period, which can be assisted by a smooth time-dependent control in between. Moreover, an important for practical applications explicit almost optimal state transfer protocol is provided which only consists of four impulses and gives an almost optimal time of motion. The results can be directly applied to a variety of experimental situations for estimation of the ultimate limits of state control for quantum technologies.

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References (22)
  1. Quantum technology: from research to application. Applied Physics B, 122(5):130, May 2016. doi:10.1007/s00340-016-6353-8.
  2. The quantum technologies roadmap: a european community view. New Journal of Physics, 20(8):080201, August 2018. doi:10.1088/1367-2630/aad1ea.
  3. Quantum optimal control in quantum technologies. strategic report on current status, visions and goals for research in europe. EPJ Quantum Technology, 9(1):19, December 2022. doi:10.1140/epjqt/s40507-022-00138-x.
  4. Optimal control for maximally creating and maintaining a superposition state of a two‐level system under the influence of markovian decoherence. Journal of the Chinese Chemical Society, 70(3):328–340, March 2023. doi:10.1002/jccs.202200451.
  5. Singular extremals for the time-optimal control of dissipative spin 1 2 particles. Physical Review Letters, 104(8):083001, February 2010. doi:10.1103/PhysRevLett.104.083001.
  6. Time-optimal control of spin 1/2 particles in the presence of radiation damping and relaxation. The Journal of Chemical Physics, 134(5):054103, February 2011. doi:10.1063/1.3543796.
  7. Photosynthetic light harvesting: excitons and coherence. Journal of The Royal Society Interface, 11(92):20130901, March 2014. doi:10.1098/rsif.2013.0901.
  8. Quantum feedback control in quantum photosynthesis. Physical Review A, 106(3):032218, September 2022. doi:10.1103/PhysRevA.106.032218.
  9. Time-optimal control of a two-level dissipative quantum system. Physical Review A, 76(2):023419, August 2007. doi:10.1103/PhysRevA.76.023419.
  10. U. Boscain and B. Picolli. Optimal syntheses for control systems on 2-d manifolds. Springer SMAI, 43:1–259, 2004.
  11. Optimal control at the quantum speed limit. Physical Review Letters, 103(24):240501, December 2009. doi:10.1103/PhysRevLett.103.240501.
  12. Gerhard C. Hegerfeldt. Driving at the quantum speed limit: Optimal control of a two-level system. Physical Review Letters, 111(26):260501, December 2013. doi:10.1103/PhysRevLett.111.260501.
  13. Gerhard C. Hegerfeldt. High-speed driving of a two-level system. Physical Review A, 90(3):032110, September 2014. doi:10.1103/PhysRevA.90.032110.
  14. Time-optimal control of a dissipative qubit. Physical Review A, 101(2):022320, February 2020. doi:10.1103/PhysRevA.101.022320.
  15. Time-optimal universal control of two-level systems under strong driving. Physical Review B, 89(24):245311, June 2014. doi:10.1103/PhysRevB.89.245311.
  16. Geometric quantum speed limits for markovian dynamics in open quantum systems. New Journal of Physics, 24(5):055003, May 2022. doi:10.1088/1367-2630/ac696b.
  17. E. Dionis and D. Sugny. Time-optimal control of two-level quantum systems by piecewise constant pulses. Physical Review A, 107(3):032613, March 2023. doi:10.1103/PhysRevA.107.032613.
  18. Reachable sets for two-level open quantum systems driven by coherent and incoherent controls. Journal of Physics A: Mathematical and Theoretical, 54(39):395304, October 2021. doi:10.1088/1751-8121/ac19f8.
  19. Teaching the environment to control quantum systems. Physical Review A, 73(6):062102, June 2006. doi:10.1103/PhysRevA.73.062102.
  20. Minimal time generation of density matrices for a two-level quantum system driven by coherent and incoherent controls. International Journal of Theoretical Physics, 60(2):576–584, February 2021. doi:10.1007/s10773-019-04149-w.
  21. Gurman V.I. Turnpike solutions in optimal control problems for quantum-mechanical systems. Automation and Remote Control, 72(6):1248–1257, September 2011. doi:10.1134/S0005117911060129.
  22. Control Theory from the Geometric Viewpoint. Bantam, London, 2004.
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