1. Hamiltonian extensions in quantum metrology
- Author
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Julien Mathieu Elias Fraïsse and Daniel Braun
- Subjects
Physics ,Quantum Physics ,Technology ,quantum fisher information ,ancilla assisted quantum metrology ,Hilbert space ,FOS: Physical sciences ,02 engineering and technology ,Quantum fisher information ,021001 nanoscience & nanotechnology ,01 natural sciences ,Metrology ,symbols.namesake ,Quantum mechanics ,0103 physical sciences ,symbols ,Quantum metrology ,Quantum Physics (quant-ph) ,010306 general physics ,0210 nano-technology ,Hamiltonian (quantum mechanics) ,Quantum ,phase shift estimation - Abstract
We study very generally towhat extent the uncertainty with which a phase shift can be estimated in quantum metrology can be reduced by extending the Hamiltonian that generates the phase shift to an ancilla system with a Hilbert space of arbitrary dimension, and allowing arbitrary interactions between the original system and the ancilla. Such Hamiltonian extensions provide a general framework for open quantum systems, as well as for “non-linear metrology schemes” that have been investigated over the last few years. We prove that such Hamiltonian extensions cannot improve the sensitivity of the phase shift measurement when considering the quantum Fisher information optimized over input states.
- Published
- 2017
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