Complete Optimal Convex Approximations of Qubit States under B2 Distance
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 B2-distance of an arbitrary target state. Both the analytical formulae of the B2-distance and the corresponding complete optimal decompositions are obtained. The tradeoff relations for both the sum and the squared sum of the B2-distances have been analytically and numerically investigated.
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