Non-local properties of multi-particle density matrices

Abstract

As far as entanglement is concerned, two density matrices of n particles are equivalent if they are on the same orbit of the group of local unitary transformations, U(d1)×...× U(dn) (where the Hilbert space of particle r has dimension dr). We show that for n greater than or equal to two, the number of independent parameters needed to specify an n-particle density matrix up to equivalence is r dr2 - Σr dr2 + n - 1. For n spin-1 2 particles we also show how to characterise generic orbits, both by giving an explicit parametrisation of the orbits and by finding a finite set of polynomial invariants which separate the orbits.

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