Abstract

Entanglement detection in high dimensional systems is a NP-hard problem since it is lacking an efficient way. Given a bipartite quantum state of interest free entanglement can be detected efficiently by the PPT-criterion (Peres-Horodecki criterion), in contrast to detecting bound entanglement, i.e. a curious form of entanglement that can also not be distilled into maximally (free) entangled states. Only a few bound entangled states have been found, typically by constructing dedicated entanglement witnesses, so naturally the question arises how large is the volume of those states. We define a large family of magically symmetric states of bipartite qutrits for which we find 82% to be free entangled, 2% to be certainly separable and as much as 10% to be bound entangled, which shows that this kind of entanglement is not rare. Via various machine learning algorithms we can confirm that the remaining 6% of states are more likely to belonging to the set of separable states than bound entangled states. Most important we find via dimension reduction algorithms that there is a strong two-dimensional (linear) sub-structure in the set of bound entangled states. This revealed structure opens a novel path to find and characterize bound entanglement towards solving the long-standing problem of what the existence of bound entanglement is implying.

Highlights

  • Entanglement detection in high dimensional systems is a NP-hard problem since it is lacking an efficient way

  • Free entanglement is efficiently detected via the Positive Partial Transpose (PPT) criterion, to test whether a simplex states belongs to the kernel polytope K, and is certainly separable, needs to solve the linear equations defining K with 12 unknown variables, which is quite time consuming and needs a careful programming

  • For the generation of data vectors for the machine learning algorithms we can concentrate on data vectors that are within the polytope P (in Fig. 3 depicted by a dashed lines)

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Summary

Introduction

Entanglement detection in high dimensional systems is a NP-hard problem since it is lacking an efficient way. For two families, corresponding to different slices via the eight-dimensional magic simplex, we show the power of different analytical entanglement witnesses to detect bound entanglement and show the exemplary region of states that are certainly separable and those that are certainly free entangled.

Results
Conclusion

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