Abstract
We analyze, for a general concave entropic form, the associated conditional entropy of a quantum system A + B, obtained as a result of a local measurement on one of the systems (B). This quantity is a measure of the average mixedness of A after such measurement, and its minimum over all local measurements is shown to be the associated entanglement of formation between A and a purifying third system C. In the case of the von Neumann entropy, this minimum determines also the quantum discord. For classically correlated states and mixtures of a pure state with the maximally mixed state, we show that the minimizing measurement can be determined analytically and is universal, i.e., the same for all concave forms. While these properties no longer hold for general states, we also show that in the special case of the linear entropy, an explicit expression for the associated conditional entropy can be obtained, whose minimum among projective measurements in a general qudit–qubit state can be determined analytically, in terms of the largest eigenvalue of a simple 3 × 3 correlation matrix. Such minimum determines the maximum conditional purity of A, and the associated minimizing measurement is shown to be also universal in the vicinity of maximal mixedness. Results for X states, including typical reduced states of spin pairs in XY chains at weak and strong transverse fields, are also provided and indicate that the measurements minimizing the von Neumann and linear conditional entropies are typically coincident in these states, being determined essentially by the main correlation. They can differ, however, substantially from that minimizing the geometric discord.
Highlights
There is presently a great interest in the investigation of quantum correlations in mixed states of composite quantum systems
While for pure states such correlations can be identified with entanglement, the situation in mixed states is more complex, as separable mixed states, defined as convex mixtures of product states [1], can still exhibit signatures of quantum-like correlations, manifested for instance in a non-zero quantum discord [2,3,4]
The quantum discord for a bipartite system A + B can be written [2] as the minimum difference between two distinct quantum extensions of the classical Shannon based conditional entropy S(A|B) [12], one involving a local measurement MB on one of the systems (B), over which the minimization is to be performed, and the other the direct quantum version of the classically equivalent expression S(A, B) − S(B)
Summary
There is presently a great interest in the investigation of quantum correlations in mixed states of composite quantum systems. 3 to derive a closed expression for the conditional S2 entropy and discuss its fundamental properties, including its minimum over projective measurements for a general A+qubit system, which is shown to be determined by the largest eigenvalue of a simple 3 × 3 contracted correlation matrix. This permits to recognize the minimizing measurement and understand its behavior.
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