Quantum coherence fraction

Abstract

As an analogy of fully entangled fraction in the framework of entanglement theory, we have introduced the notion of quantum coherence fraction CF, which quantifies the closeness between a given state and the set of maximally coherent states. By providing an alternative formulation of the robustness of coherence CR, we have elucidated the relationship between quantum coherence fraction and the normalized version of CR (i.e., CR), where the role of genuinely incoherent operations (GIO) is highlighted. Numerical simulation shows that though as expected CF is upper bounded by CR, CF constitutes a good approximation to CR especially in low-dimensional Hilbert spaces. Even more intriguingly, we can analytically prove that CF is exactly equivalent to CR for qubit and qutrit states. Moreover, some intuitive properties and implications of CF are also indicated.