Symmetric logarithmic derivative

The symmetric logarithmic derivative is an important quantity in quantum metrology, and is related to the quantum Fisher information.

Definition

Let $\rho$ and $A$ be two operators, where $\rho$ is Hermitian and positive semi-definite. In most applications, $\rho$ and $A$ fulfill further properties, that also $A$ is Hermitian and $\rho$ is a density matrix (which is also trace-normalized), but these are not required for the definition.

The symmetric logarithmic derivative $L_{\varrho }(A)$ is defined implicitly by the equation^[1]^[2]

i={\frac {1}{2}}\{\varrho ,L_{\varrho }(A)\}

where $=XY-YX$ is the commutator and $\{X,Y\}=XY+YX$ is the anticommutator. Explicitly, it is given by^[3]

L_{\varrho }(A)=2i\sum _{k,l}{\frac {\lambda _{k}-\lambda _{l}}{\lambda _{k}+\lambda _{l}}}\langle k\vert A\vert l\rangle \vert k\rangle \langle l\vert

where $\lambda _{k}$ and $\vert k\rangle$ are the eigenvalues and eigenstates of $\varrho$ , i.e. $\varrho \vert k\rangle =\lambda _{k}\vert k\rangle$ and $\varrho =\sum _{k}\lambda _{k}\vert k\rangle \langle k\vert$ .

Formally, the map from operator $A$ to operator $L_{\varrho }(A)$ is a (linear) superoperator.

Properties

The symmetric logarithmic derivative is linear in $A$ :

L_{\varrho }(\mu A)=\mu L_{\varrho }(A)

L_{\varrho }(A+B)=L_{\varrho }(A)+L_{\varrho }(B)

The symmetric logarithmic derivative is Hermitian if its argument $A$ is Hermitian:

A=A^{\dagger }\Rightarrow ^{\dagger }=L_{\varrho }(A)

The derivative of the expression $\exp(-i\theta A)\varrho \exp(+i\theta A)$ w.r.t. $\theta$ at $\theta =0$ reads

{\frac {\partial }{\partial \theta }}{\Big }{\bigg \vert }_{\theta =0}=i(\varrho A-A\varrho )=i={\frac {1}{2}}\{\varrho ,L_{\varrho }(A)\}

where the last equality is per definition of $L_{\varrho }(A)$ ; this relation is the origin of the name "symmetric logarithmic derivative". Further, we obtain the Taylor expansion

\exp(-i\theta A)\varrho \exp(+i\theta A)=\varrho +\underbrace {{\frac {1}{2}}\theta \{\varrho ,L_{\varrho }(A)\}} _{=i\theta \varrho ,A}+{\mathcal {O}}(\theta ^{2})

.

Referencesedit

^ Braunstein, Samuel L.; Caves, Carlton M. (1994-05-30). "Statistical distance and the geometry of quantum states". Physical Review Letters. 72 (22). American Physical Society (APS): 3439–3443. Bibcode:1994PhRvL..72.3439B. doi:10.1103/physrevlett.72.3439. ISSN 0031-9007. PMID 10056200.
^ Braunstein, Samuel L.; Caves, Carlton M.; Milburn, G.J. (April 1996). "Generalized Uncertainty Relations: Theory, Examples, and Lorentz Invariance". Annals of Physics. 247 (1): 135–173. arXiv:quant-ph/9507004. Bibcode:1996AnPhy.247..135B. doi:10.1006/aphy.1996.0040. S2CID 358923.
^ Paris, Matteo G. A. (21 November 2011). "Quantum Estimation for Quantum Technology". International Journal of Quantum Information. 07 (supp01): 125–137. arXiv:0804.2981. doi:10.1142/S0219749909004839. S2CID 2365312.

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[BraunstenCaves1994-1] Braunstein, Samuel L.; Caves, Carlton M. (1994-05-30). "Statistical distance and the geometry of quantum states". Physical Review Letters. 72 (22). American Physical Society (APS): 3439–3443. Bibcode:1994PhRvL..72.3439B. doi:10.1103/physrevlett.72.3439. ISSN 0031-9007. PMID 10056200.

[2] Braunstein, Samuel L.; Caves, Carlton M.; Milburn, G.J. (April 1996). "Generalized Uncertainty Relations: Theory, Examples, and Lorentz Invariance". Annals of Physics. 247 (1): 135–173. arXiv:quant-ph/9507004. Bibcode:1996AnPhy.247..135B. doi:10.1006/aphy.1996.0040. S2CID 358923.

[3] Paris, Matteo G. A. (21 November 2011). "Quantum Estimation for Quantum Technology". International Journal of Quantum Information. 07 (supp01): 125–137. arXiv:0804.2981. doi:10.1142/S0219749909004839. S2CID 2365312.

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