Non-orthogonal bases for quantum metrology

Genoni, Marco G.; Tufarelli, Tommaso

doi:10.1088/1751-8121/ab3fe0

Cited by 23 publications

(22 citation statements)

References 81 publications

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“…The Tracy-Singh product [53,54] defined for matrices A and B subdivided into blocks A ij and B kl is 11 12 21 22 11 11 11 12 12 11 12 12 11 21 11 22 12 21 12 22 21 11 21 12 22 11 22 12 21 21 21 22 22 21 22 22…”

Section: Appendix B Analytic Results For N Sourcesmentioning

confidence: 99%

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Quantum limits of localisation microscopy

2019

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Localisation microscopy of multiple weak, incoherent point sources with possibly different intensities in one spatial dimension is equivalent to estimating the amplitudes of a classical mixture of coherent states of a simple harmonic oscillator. This enables us to bound the multi-parameter covariance matrix for an unbiased estimator for the locations in terms of the quantum Fisher information matrix, which we obtained analytically. In the regime of arbitrarily small separations we find it to be no more than rank two-implying that no more than two independent parameters can be estimated irrespective of the number of point sources. We use the eigenvalues of the classical and quantum Fisher information matrices to compare the performance of spatial-mode demultiplexing and direct imaging in localisation microscopy with respect to the quantum limits.

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Section: Appendix B Analytic Results For N Sourcesmentioning

confidence: 99%

“…Using the Tracy-Singh block kronecker product  and the block column 'vecb' operator [53] defined as…”

Section: Analytical Expression Of Qfimmentioning

confidence: 99%

Quantum limits of localisation microscopy

2019

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“…IV we consider the state Eq. ( 16), whose QFI is most conveniently derived using a non-orthogonal basis [36]. With the non-orthognal basis {|0 , |φ M , |φ M }, where |φ M = ∂ ϕ |φ M , the SLD solution is As the SLD in Eq.…”

Section: Discussionmentioning

confidence: 99%

“…For mixed states the required expressions can be far more involved [4,33,36] Among fixed-number states the maximum QFI comes from the N00N state [1,2], which is a balanced superposition of all photons in one mode or the other…”

Section: B Precision In Interferometrymentioning

confidence: 99%

Average number is an insufficient metric for interferometry

Branford,

Rubio

2021

Preprint

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We argue that analysing schemes for metrology solely in terms of the average particle number can obscure the number of particles effectively used in informative events. For a number of states we demonstrate that, in both frequentist and Bayesian frameworks, the average number of a state can essentially be decoupled from the aspects of the total number distribution that are associated with the metrological advantage.

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“…In section 4 we consider the state equation ( 16), whose QFI is most conveniently derived using a non-orthogonal basis [37]. With the non-orthognal basis {|0 , |φ M , |φ M }, where |φ M = ∂ ϕ |φ M , the SLD solution is…”

Section: Data Availability Statementmentioning

confidence: 99%