Xiao-Xing Jing scite author profile

We find a phase matching condition for enhancement of sensitivity in a Mach-Zehnder interferometer illuminated by an arbitrary state in one input port and an odd(even) state in the other port. Under this condition, the Fisher information becomes maximal with respect to the relative phase of two modes and the phase sensitivity is enhanced. For the case with photon losses, we further find that the phase matching condition keeps unchanged with a coherent state and a coherent superposition state as the input states.

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Quantum metrology with unitary parametrization processes

Liu

Jing

Wang

2015

Sci Rep

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Quantum Fisher information is a central quantity in quantum metrology. We discuss an alternative representation of quantum Fisher information for unitary parametrization processes. In this representation, all information of parametrization transformation, i.e., the entire dynamical information, is totally involved in a Hermitian operator . Utilizing this representation, quantum Fisher information is only determined by and the initial state. Furthermore, can be expressed in an expanded form. The highlights of this form is that it can bring great convenience during the calculation for the Hamiltonians owning recursive commutations with their partial derivative. We apply this representation in a collective spin system and show the specific expression of . For a simple case, a spin-half system, the quantum Fisher information is given and the optimal states to access maximum quantum Fisher information are found. Moreover, for an exponential form initial state, an analytical expression of quantum Fisher information by operator is provided. The multiparameter quantum metrology is also considered and discussed utilizing this representation.

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Quantum Fisher Information for Density Matrices with Arbitrary Ranks

Liu¹,

Jing²,

Zhong³

et al. 2014

Commun. Theor. Phys.

105

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Xiao-Xing Jing

Phase-matching condition for enhancement of phase sensitivity in quantum metrology

Quantum metrology with unitary parametrization processes

Quantum Fisher Information for Density Matrices with Arbitrary Ranks

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