Quantum discord, a kind of quantum correlation based on entropic measures, is defined as the difference between quantum mutual information and classical correlation in a bipartite system. Procedures are available for analytical calculation of discord when one of the parties is a qubit with dimension two and measurements made on it to get that one-way discord. We extend now to systems when both parties are of larger dimension and of interest to qudit–quDit with d, D≥ 3 or spin chains of spins ≥ 1. While recognizing that no universal scheme is feasible, applicable to all density matrices, nevertheless, a procedure similar to that for d= 2 that works for many mixed-state density matrices remains of interest as shown by recent such applications. We focus on this method that uses unitary operations to describe measurements, reducing them to a compact form so as to minimize the number of variables needed for extremizing the classical correlation, often the most difficult part of the discord calculation. Results are boiled down to a simple recipe for that extremization; for some classes of density matrices, the procedure even gives trivially the final value of the classical correlation without that extremization. A qutrit–qutrit (d= D= 3) system is discussed in detail with specific applications to density matrices for whom other calculations involved difficult numerics. Special attention is given to the so-called X-states and Werner and isotropic states when the calculations become particularly simple. An appendix discusses an independent but related question of the systematics of X-states of arbitrary dimension. It forms a second, separate, part of this paper, extending our previous group-theoretic considerations of systematics for qubits now to higher d.
Publication Source (Journal or Book title)
Quantum Information Processing
Rau, A. (2018). Calculation of quantum discord in higher dimensions for X- and other specialized states. Quantum Information Processing, 17 (9) https://doi.org/10.1007/s11128-018-1985-8