Coherence and imaginarity of quantum states

Abstract

Baumgratz, Cramer and Plenio established a rigorous framework (BCP framework) for quantifying the coherence of quantum states [http://dx.doi.org/10.1103/PhysRevLett.113.140401Phys. Rev. Lett. 113, 140401 (2014)]. In BCP framework, a quantum state is called incoherent if it is diagonal in the fixed orthonormal basis, and a coherence measure should satisfy some conditions. For a fixed orthonormal basis, if a quantum state has nonzero imaginary part, then must be coherent. How to quantitatively characterize this fact? In this work, we show that any coherence measure C in BCP framework has the property C( )-C(Re )≥ 0 if C is invariant under state complex conjugation, i.e., C( )=C( ), here is the conjugate of , Re is the real part of . If C does not satisfy C( )=C( ), we can define a new coherence measure C ( )=12[C( )+C( )] such that C ( )=C ( ). We also establish some similar results for bosonic Gaussian states.

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