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Q:What characterizes an “ideal” quantum detector?

Mesoscopic Detectors and the Quantum Limit. (cond-mat/0211001). A. A. Clerk, S. M. Girvin, and A. D. Stone Departments of Applied Physics and Physics, Yale University. (and many discussions with M. Devoret & R. Schoelkopf). Q:What characterizes an “ideal” quantum detector?. “gain”. I. Q.

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Q:What characterizes an “ideal” quantum detector?

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  1. Mesoscopic Detectors and the Quantum Limit (cond-mat/0211001) A. A. Clerk, S. M. Girvin, and A. D. StoneDepartments of Applied Physics and Physics,Yale University (and many discussions with M. Devoret & R. Schoelkopf) Q:What characterizes an “ideal” quantum detector?

  2. “gain” I Q • Measurement Rate: How quickly can we distinguish the two qubit states? P(m,t) 0 m • Dephasing Rate: How quickly does the measurement decohere the qubit? SQQ´2 sdt hdQ(t) dQ(0) i Generic Weakly-Coupled Detector

  3. I Q • Dephasing? Need orthogonal to The Quantum Limit of Detection Quantum limit: the best you can do is measure as fast as you dephase: • Measurement? Need distinguishable from • What symmetries/properties must an arbitrary detector possess to reach the quantum limit?

  4. Detecting coherent qubit oscillations (Averin & Korotkov) SI sz Q I w Why care about the quantum limit? • Minimum Noise Energy in Amplifiers: (Caves; Clarke; Devoret & Schoelkopf) • Minimum power associated with Vnoise?

  5. I Q • Quantum limit requires: • (i.e. no extra degrees of freedom) • λ’ vanishes (monitoring output does not further dephase) Q I • λ’ is the “reverse gain”: How to get to the Quantum Limit A.C., Girvin & Stone, cond-mat/0211001Averin, cond-mat/0301524 • Now, we have:

  6. I Q L R What does it mean? Mesoscopic Scattering Detector: (Pilgram & Buttiker; AC, Girvin & Stone) • To reach the quantum limit, there should be no unused information in the detector… mL mR

  7. I Q L R What does it mean? Mesoscopic Scattering Detector: (Pilgram & Buttiker; AC, Girvin & Stone) • To reach the quantum limit, there should be no unused information in the detector… mL mR Transmission probability depends on qubit:

  8. I Q • Phase condition? • Qubit cannot alter relative phase between reflection and transmission • No “lost” information that could have been gained in an interference experiment…. L R The Proportionality Condition • Need: Not usual symmetries!

  9. I Q mL mR R L mL mR Transmission Amplitude Condition Ensures that no information is lost when averaging over energy 1) versus 2)

  10. The Ideal Transmission Amplitude Necessary energy dependence to be at the quantum limit Corresponds to a real system-- the adiabatic quantum point contact! (Glazman, Lesovik, Khmelnitskii & Shekhter, 1988) T 1 0.8 0.6 0.4 0.2 e - e0 - 4 - 2 2 4

  11. R L I Q Gmeas for current experiment Gmeas for phase experiment Information and Fluctuations • Reaching quantum limit = no wasted information • No information lost in phase changes: • No information lost when energy averaging: Look at charge fluctuations:

  12. Gmeas for current experiment Gmeas for phase experiment Measurement Rate for Phase Experiment t r

  13. R L I Q Information and Fluctuations (2) • Reaching quantum limit = no wasted information Can connect charge fluctuations to information in more complex cases: 1. Multiple Channels Extra terms due to channel structure 2. Normal-Superconducting Detector Gmeas for phase experiment Gmeas for current experiment

  14. Partially Coherent Detectors • What is the effect of adding dephasing to the mesoscopic scattering detector? Look at a resonant-level model… • Symmetric coupling to leads  no information in relative phase mL mR  I = 0 • Assume dephasing due to an additional voltage probe (Buttiker) R L

  15. Partially Coherent Detectors • Reducing the coherence of the detector enhances charge fluctuations… total accessible information is increased • A resulting departure from the quantum limit… Charge Noise (SQ)

  16. I Q Conclusions • Reaching the quantum limit requires that there be no wasted information in the detector; can make this condition precise. • Looking at information provides a new way to look at mesoscopic systems: • New symmetry conditions • New way to view fluctuations • Reducing detector coherence enhances charge fluctuations, leads to a departure from the quantum limit

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