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Complete Optimal Convex Approximations of Qubit States under $B_2$ Distance

arXiv:1806.05080 · doi:10.1007/s11128-018-1948-0

Abstract

We consider the optimal approximation of arbitrary qubit states with respect to an available states consisting the eigenstates of two of three Pauli matrices, the $B_2$-distance of an arbitrary target state. Both the analytical formulae of the $B_2$-distance and the corresponding complete optimal decompositions are obtained. The tradeoff relations for both the sum and the squared sum of the $B_2$-distances have been analytically and numerically investigated.

8 pages, 5 figures