Comment on "Thermodynamic Principle for Quantum Metrology"

Abstract

In Phys. Rev. Lett. 128, 200501 (2022) the authors consider the thermodynamic cost of quantum metrology. One of the main results is S ≥ (2) \| hλ \|-2 FQ [λ], which purports to relate the Shannon entropy S of an optimal measurement (i.e., in the basis of the symmetric logarithmic derivative) to the quantum Fisher information FQ of the pure state |λ. However, we show that in the setting considered by the authors we have S = (2) and \| hλ \|2 = _λ FQ[λ], so that their inequality reduces to the trivial inequality _λ FQ[λ] ≥ FQ[λ], and does not in fact relate the entropy S to the quantum Fisher information. Moreover, for pure state quantum metrology, there exist optimal measurements (though not in the basis of the symmetric logarithmic derivative) for which 0 ≤ S ≤ (2), leading to violations of the inequality for some states |λ.

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