论文信息 - Estimation of a generalized amplitude-damping channel

Estimation of a generalized amplitude-damping channel

The problem of finding the optimal strategy for estimating a generalized amplitude damping channel ${\ensuremath{\Gamma}}_{\ensuremath{\eta}}^{(p)}$ by means of the extension $\mathrm{id}\ensuremath{\bigotimes}{\ensuremath{\Gamma}}_{\ensuremath{\eta}}^{(p)}$ is addressed. We first evaluate the quantum Fisher information of output states based on the symmetric logarithmic derivative and specify all pure-state inputs that maximize the quantum Fisher information. We next investigate the ${\ensuremath{\nabla}}^{e}$ autoparallelity of output state manifolds and characterize the condition for the existence of an efficient estimator. A comparison of these results concludes that, while there is no uniformly optimal input for all $p$ and $\ensuremath{\eta}$, a maximally entangled input is an admissible one under a nonasymptotic setting.

Akio Fujiwara | A. Fujiwara

[1] Manuel A. Ballester. Estimation of unitary quantum operations , 2004 .

[2] W. Stinespring. Positive functions on *-algebras , 1955 .

[3] A. Acin,et al. Optimal estimation of quantum dynamics , 2001 .

[4] Masashi Ban,et al. Optimal parameter estimation of a depolarizing channel , 2002 .

[5] G. Lindblad. Completely positive maps and entropy inequalities , 1975 .

[6] Akio Fujiwara,et al. Quantum channel identification problem , 2001 .

[7] C. Helstrom. Quantum detection and estimation theory , 1969 .

[8] L. Ballentine,et al. Probabilistic and Statistical Aspects of Quantum Theory , 1982 .

[9] Hiroshi Imai,et al. Quantum parameter estimation of a generalized Pauli channel , 2003 .

[10] Akio Fujiwara,et al. Estimation of SU(2) operation and dense coding: An information geometric approach , 2001 .

[11] Shun-ichi Amari,et al. Methods of information geometry , 2000 .