Geometric Construction of Optimal Teleportation Witnesses

Abstract

Not all entangled states are useful for quantum teleportation. We present a geometric method to construct optimal teleportation witnesses, which provide operational necessary and sufficient criteria for identifying the teleportation usefulness of arbitrary two-qudit entangled states. Specifically, by developing a two-layer iterative cutting-plane algorithm to solve the shortest distance problem from the target state ρ to the convex set S of useless states, we obtain the projection point σ* ∈ S and then construct the optimal teleportation witness from the projection geometry. Moreover, the shortest distance D(ρ) obtained during this construction also serves as a necessary and sufficient criterion for usefulness. We apply our method to identify the teleportation usefulness of three classes of entangled states.