Quantum metrological gain explained

The quantum metrological gain is defined in the context of carrying out a metrological task using a quantum state of a multiparticle system. It is the sensitivity of parameter estimation using the state compared to what can be reached using separable states, i.e., states without quantum entanglement. Hence, the quantum metrological gain is given as the fraction of the sensitivity achieved by the stateand the maximal sensitivity achieved by separable states. The best separable state is often the trivial fully polarized state, in which all spins point into the same direction. If the metrological gain is larger than one then the quantum state is more useful for making precise measurements than separable states. Clearly, in this case the quantum state is also entangled.

Background

The metrological gain is, in general, the gain in sensitivity of a quantum state compared to a product state.^[1] Metrological gains up to 100 are reported in experiments.^[2]

Let us consider a unitary dynamics with a parameter

\theta

from initial state

\varrho₀

\varrho(\theta)=\exp(-iA\theta)\varrho_{0\exp(+iA\theta),}

F_\rm

constrains the achievable precision in statistical estimation of the parameter

\theta

via the quantum Cramér–Rao bound as

(\Delta\theta)²\ge

	1
	mF_\rm[\varrho,A]

where

is the number of independent repetitions. For the formula, one can see that the larger the quantum Fisher information, the smaller can be the uncertainty of the parameter estimation.

For a multiparticle system of

spin-1/2 particles^[3]

F_\rm[\varrho,J_z]\leN

holds for separable states, where

F_\rm

is the quantum Fisher information,

J_z=\sum

	N

	n=1

	(n)
j
	z

and

	(n)
j
	z

is a single particle angular momentum component. Thus, the metrological gain can be characterize by

	F_\rm[\varrho,J_z]
	N

The maximum for general quantum states is given by

F_\rm[\varrho,J_z]\leN^2.

F_\rm[\varrho,J_z]\lesk²+r²

holds, where

s=\lfloorN/k\rfloor

is the largest integer smaller than or equal to

N/k,

and

r=N-sk

is the remainder from dividing

. Hence, a higher and higher levels of multipartite entanglement is needed to achieve a better and better accuracy in parameter estimation.^[4] ^[5] It is possible to obtain a weaker but simpler bound ^[6]

F_\rm[\varrho,J_z]\leNk.

Hence, a lower bound on the entanglement depth is obtained as

	F_\rm[\varrho,J_z]
	N

\lek.

Mathematical definition for a system of qudits

The situation for qudits with a dimension larger than

d=2

is more complicated. In this more general case, the metrological gain for a given Hamiltonian is defined as the ratio of the quantum Fisher information of a state and the maximum of the quantum Fisher information for the same Hamiltonian for separable states

g_lH(\varrho)=

	lF_{Q[\varrho,{lH}
	]}{lF

	({\rmsep

	Q

)}(lH)},

where the Hamiltonian is

lH=h_1+h_2+...+h_N,

and

h_n

acts on the nth spin.The maximum of the quantum Fisher information for separable states is given as^[7] ^[8] ^[9]

	({\rmsep
lF
	Q

	N
)}(lH)=\sum
	n=1

[λ_max(h_n)-λ_min(h_n)]^2,

where

λ_max(X)

and

λ_min(X)

denote the maximum and minimum eigenvalues of

respectively.

We also define the metrological gain optimized over all local Hamiltonians as

g(\varrho)=max_lHg_lH(\varrho).

The case of qubits is special. In this case, if the local Hamitlonians are chosen to be

h_n=\sum_l=x,y,zc_l,n\sigma_l,

where

c_l,n

are real numbers, and

|\vecc_n|=1,

then

	({\rmsep
lF
	Q

)}(lH)=4N

independently from the concrete values of

c_l,n

.^[10] Thus, in the case of qubits, the optimization of the gain over the local Hamiltonian can be simpler. For qudits with a dimension larger than 2, the optimization is more complicated.

Relation to quantum entanglement

If the gain larger than one

g(\varrho)>1,

then the state is entangled, and its is more useful metrologically than separable states. In short, we call such states metrologically useful. If

h_n

all have identical lowest and highest eigenvalues, then

g(\varrho)>k-1

implies metrologically useful

-partite entanglement. If for the gain^[11]

g(\varrho)>N-1

holds, then the state has metrologically useful genuine multipartite entanglement.^[9] In general, for quantum states

g(\varrho)\leN

holds.

Properties of the metrological gain

The metrological gain cannot increase if we add an ancilla to a subsystem or we provide an additional copy of the state.^[9] The metrological gain

g(\varrho)

is convex in the quantum state.^[9]

Numerical determination of the gain

There are efficient methods to determine the metrological gain via an optimization over local Hamiltonians. They are based on a see-saw method that iterates two steps alternatively. ^[9]

Notes and References

Pezzè . Luca . Smerzi . Augusto . Oberthaler . Markus K. . Schmied . Roman . Treutlein . Philipp . Quantum metrology with nonclassical states of atomic ensembles . Reviews of Modern Physics . 5 September 2018 . 90 . 3 . 035005 . 10.1103/RevModPhys.90.035005. 1609.01609 . 2018RvMP...90c5005P .
Hosten . Onur . Engelsen . Nils J. . Krishnakumar . Rajiv . Kasevich . Mark A. . Measurement noise 100 times lower than the quantum-projection limit using entangled atoms . Nature . 28 January 2016 . 529 . 7587 . 505–508 . 10.1038/nature16176. 26751056 . 2016Natur.529..505H .
Pezzé . Luca . Smerzi . Augusto . Entanglement, Nonlinear Dynamics, and the Heisenberg Limit . Physical Review Letters . 10 March 2009 . 102 . 10 . 100401 . 10.1103/PhysRevLett.102.100401. 19392092 . 2009PhRvL.102j0401P . 0711.4840 . 13095638 .
Hyllus. Philipp. 2012. Fisher information and multiparticle entanglement. Physical Review A. 85. 2. 022321. 10.1103/physreva.85.022321. 1006.4366. 2012PhRvA..85b2321H. 118652590.
Tóth. Géza. 2012. Multipartite entanglement and high-precision metrology. Physical Review A. 85. 2. 022322. 10.1103/physreva.85.022322. 1006.4368. 2012PhRvA..85b2322T. 119110009.
Book: Tóth . Géza . Entanglement detection and quantum metrology in quantum optical systems . 2021 . Doctoral Dissertation submitted to the Hungarian Academy of Sciences . Budapest . 68 .
Ciampini . Mario A. . Spagnolo . Nicolò . Vitelli . Chiara . Pezzè . Luca . Smerzi . Augusto . Sciarrino . Fabio . Quantum-enhanced multiparameter estimation in multiarm interferometers . Scientific Reports . 6 July 2016 . 6 . 1 . 28881 . 10.1038/srep28881. 27381743 . 4933875 . 1507.07814 . 2016NatSR...628881C .
Tóth . Géza . Vértesi . Tamás . Quantum States with a Positive Partial Transpose are Useful for Metrology . Physical Review Letters . 12 January 2018 . 120 . 2 . 020506 . 10.1103/PhysRevLett.120.020506. 29376687 . 1709.03995 .
Tóth . Géza . Vértesi . Tamás . Horodecki . Paweł . Horodecki . Ryszard . Activating Hidden Metrological Usefulness . Physical Review Letters . 7 July 2020 . 125 . 2 . 020402 . 10.1103/PhysRevLett.125.020402. 32701319 . 1911.02592 . 2020PhRvL.125b0402T .
Hyllus . Philipp . Gühne . Otfried . Smerzi . Augusto . Not all pure entangled states are useful for sub-shot-noise interferometry . Physical Review A . 30 July 2010 . 82 . 1 . 012337 . 10.1103/PhysRevA.82.012337. 0912.4349 . 2010PhRvA..82a2337H .
Trényi . Róbert . Lukács . Árpád . Horodecki . Paweł . Horodecki . Ryszard . Vértesi . Tamás . Tóth . Géza . Activation of metrologically useful genuine multipartite entanglement . New Journal of Physics . 1 February 2024 . 26 . 2 . 023034 . 10.1088/1367-2630/ad1e93. 2203.05538 . 2024NJPh...26b3034T .