Undoing a quantum measurement.

In general, a quantum measurement yields an undetermined answer and alters the system to be consistent with the measurement result. This process maps multiple initial states into a single state and thus cannot be reversed. This has important implications in quantum information processing, where errors can be interpreted as measurements. Therefore, it seems that it is impossible to correct errors in a quantum information processor, but protocols exist that are capable of eliminating them if they affect only part of the system. In this work we present the deterministic reversal of a fully projective measurement on a single particle, enabled by a quantum error-correction protocol in a trapped ion quantum information processor. We further introduce an in-sequence, single-species recooling procedure to counteract the motional heating of the ion string due to the measurement.

[1]  Yong-Su Kim,et al.  Reversing the weak quantum measurement for a photonic qubit , 2010 .

[2]  M. Steffen,et al.  Coherent State Evolution in a Superconducting Qubit from Partial-Collapse Measurement , 2006, Science.

[3]  C. F. Roos,et al.  Quantum teleportation with atoms: quantum process tomography , 2007, 0704.2027.

[4]  J. Fiurášek,et al.  Quantum inference of states and processes , 2002, quant-ph/0210146.

[5]  Christoph Becher,et al.  The coherence of qubits based on single Ca+ions , 2003 .

[6]  Yong-Su Kim,et al.  Protecting entanglement from decoherence using weak measurement and quantum measurement reversal , 2012 .

[7]  E. Lucero,et al.  Reversal of the weak measurement of a quantum state in a superconducting phase qubit. , 2008, Physical review letters.

[8]  Timothy F. Havel,et al.  EXPERIMENTAL QUANTUM ERROR CORRECTION , 1998, quant-ph/9802018.

[9]  W. Wootters,et al.  A single quantum cannot be cloned , 1982, Nature.

[10]  Daniel Nigg,et al.  Experimental Repetitive Quantum Error Correction , 2011, Science.

[11]  R. Jozsa Fidelity for Mixed Quantum States , 1994 .

[12]  E. Knill,et al.  Realization of quantum error correction , 2004, Nature.

[13]  K. Mølmer,et al.  QUANTUM COMPUTATION WITH IONS IN THERMAL MOTION , 1998, quant-ph/9810039.

[14]  Samuel L. Braunstein,et al.  Quantum error correction beyond qubits , 2008, 0811.3734.

[15]  J. D. Franson,et al.  Demonstration of quantum error correction using linear optics (4 pages) , 2005 .

[16]  Shor,et al.  Good quantum error-correcting codes exist. , 1995, Physical review. A, Atomic, molecular, and optical physics.

[17]  Steane,et al.  Error Correcting Codes in Quantum Theory. , 1996, Physical review letters.

[18]  Thierry Paul,et al.  Quantum computation and quantum information , 2007, Mathematical Structures in Computer Science.