A Volume Inequality for Quantum Fisher Information and the Uncertainty Principle |
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| Authors: | Paolo Gibilisco Daniele Imparato Tommaso Isola |
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| Affiliation: | (1) Dipartimento SEFEMEQ, Facoltà di Economia, Università di Roma “Tor Vergata”, Via Columbia 2, 00133 Rome, Italy;(2) Dipartimento di Matematica, Politecnico di Torino, Corso Duca degli Abruzzi 24, 10129 Turin, Italy;(3) Dipartimento di Matematica, Università di Roma “Tor Vergata”, Via della Ricerca Scientifica, 00133 Rome, Italy |
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| Abstract: | ![]()
Let A 1,…,A N be complex self-adjoint matrices and let ρ be a density matrix. The Robertson uncertainty principle gives a bound for the quantum generalized covariance in terms of the commutators [A h ,A j ]. The right side matrix is antisymmetric and therefore the bound is trivial (equal to zero) in the odd case N=2m+1. Let f be an arbitrary normalized symmetric operator monotone function and let 〈⋅,⋅〉 ρ,f be the associated quantum Fisher information. Based on previous results of several authors, we propose here as a conjecture the inequality whose validity would give a non-trivial bound for any N∈ℕ using the commutators i[ρ,A h ]. |
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| Keywords: | Generalized variance Uncertainty principle Operator monotone functions Matrix means Quantum Fisher information |
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![$$det{mathop{Cov}_{rho}(A_{h},A_{j})}geq det biggl{-frac{i}{2}mathop{Tr}(rho [A_{h},A_{j}])biggr}$$](/content/p6335p83k2762104/10955_2007_9454_Article_Equa.gif)
![$$det{mathop{Cov}_{rho}(A_{h},A_{j})}geq det biggl{frac{f(0)}{2}langle i[rho,A_{h}],i[rho,A_{j}]rangle_{rho,f}biggr}$$](/content/p6335p83k2762104/10955_2007_9454_Article_Equb.gif)