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Main Authors: Leone, Hudson, Miller, Nathaniel R., Singh, Deepesh, Langford, Nathan K., Rohde, Peter P.
Format: Preprint
Published: 2021
Subjects:
Online Access:https://arxiv.org/abs/2105.00418
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author Leone, Hudson
Miller, Nathaniel R.
Singh, Deepesh
Langford, Nathan K.
Rohde, Peter P.
author_facet Leone, Hudson
Miller, Nathaniel R.
Singh, Deepesh
Langford, Nathan K.
Rohde, Peter P.
contents We present a static framework for analysing quantum routing protocols that we call the \textit{cost-vector formalism}. Here, quantum networks are recast as multi-graphs where edges represent two-qubit entanglement resources that \textit{could} exist under some sequence of operations. Each edge is weighted with a \textit{transmission probability} that represents the likelihood of the pair existing and a \textit{coherence probability} which is the likelihood that the pair is suitable for teleportation. Routing operations such as entanglement swapping and purification are then interpreted as \textit{contractions on the multi-graph} with relatively simple rules for updating the edge-weights. Moreover, we extend our formalism to include routing scenarios over time by developing a compatible resource theory for quantum memories. We develop rudimentary greedy algorithms for routing in this framework and test them over a variety of toy networking scenarios. Our results indicate that congestion in quantum networks does not improve significantly when more nodes (computers) are added. Rather, we find that congestion is all but eliminated by waiting a small amount of time.
format Preprint
id arxiv_https___arxiv_org_abs_2105_00418
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Cost vector analysis & multi-path entanglement routing in quantum networks
Leone, Hudson
Miller, Nathaniel R.
Singh, Deepesh
Langford, Nathan K.
Rohde, Peter P.
Quantum Physics
We present a static framework for analysing quantum routing protocols that we call the \textit{cost-vector formalism}. Here, quantum networks are recast as multi-graphs where edges represent two-qubit entanglement resources that \textit{could} exist under some sequence of operations. Each edge is weighted with a \textit{transmission probability} that represents the likelihood of the pair existing and a \textit{coherence probability} which is the likelihood that the pair is suitable for teleportation. Routing operations such as entanglement swapping and purification are then interpreted as \textit{contractions on the multi-graph} with relatively simple rules for updating the edge-weights. Moreover, we extend our formalism to include routing scenarios over time by developing a compatible resource theory for quantum memories. We develop rudimentary greedy algorithms for routing in this framework and test them over a variety of toy networking scenarios. Our results indicate that congestion in quantum networks does not improve significantly when more nodes (computers) are added. Rather, we find that congestion is all but eliminated by waiting a small amount of time.
title Cost vector analysis & multi-path entanglement routing in quantum networks
topic Quantum Physics
url https://arxiv.org/abs/2105.00418