Entanglement entropy of multipartite pure states
Abstract
Consider a system consisting of n d-dimensional quantum particles and arbitrary pure state of the whole system. Suppose we simultaneously perform complete von Neumann measurements on each particle. One can ask: what is the minimal possible value S[] of the entropy of outcomes joint probability distribution? We show that S[] coincides with entanglement entropy for bipartite states. We compute S[] for two sample multipartite states: the hexacode state (n=6, d=2) and determinant states (n=d). The generalization of determinant states to the case d<n is considered.
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