A volume inequality for quantum Fisher information and the uncertainty principle

Abstract

Let A1,...,AN be complex self-adjoint matrices and let be a density matrix. The Robertson uncertainty principle det(Cov(Ah,Aj)) ≥ det(- i2 Tr( [Ah,Aj])) gives a bound for the quantum generalized covariance in terms of the commutators [Ah,Aj]. 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 <·, · >,f be the associated quantum Fisher information. In this paper we conjecture the inequality det (Cov(Ah,Aj)) ≥ det (f(0)2 < i[, Ah],i[,Aj] >,f) that gives a non-trivial bound for any natural number N using the commutators i[, Ah]. The inequality has been proved in the cases N=1,2 by the joint efforts of many authors. In this paper we prove the case N=3 for real matrices.