Quantum max-flow in the bridge graph

Department of Mathematical Sciences

Research output: Working paper › Preprint › Research

Standard

Quantum max-flow in the bridge graph. / Steffan, Vincent; Lysikov, Vladimir; Gesmundo, Fulvio.

arXiv preprint, 2022.

Research output: Working paper › Preprint › Research

Harvard

Steffan, V, Lysikov, V & Gesmundo, F 2022 'Quantum max-flow in the bridge graph' arXiv preprint. <https://arxiv.org/abs/2212.09794>

APA

Steffan, V., Lysikov, V., & Gesmundo, F. (2022). Quantum max-flow in the bridge graph. arXiv preprint. https://arxiv.org/abs/2212.09794

Vancouver

Steffan V, Lysikov V, Gesmundo F. Quantum max-flow in the bridge graph. arXiv preprint. 2022.

Author

Steffan, Vincent ; Lysikov, Vladimir ; Gesmundo, Fulvio. / Quantum max-flow in the bridge graph. arXiv preprint, 2022.

Bibtex

@techreport{a33a51d3490c4f40829155fd95bcbe76,

title = "Quantum max-flow in the bridge graph",

abstract = "The quantum max-flow quantifies the maximal possible entanglement between two regions of a tensor network state for a fixed graph and fixed bond dimensions. In this work, we calculate the quantum max-flow exactly in the case of the bridge graph. The result is achieved by drawing connections to the theory of prehomogenous tensor and the representation theory of quivers. Further, we highlight relations to invariant theory and to algebraic statistics.",

author = "Vincent Steffan and Vladimir Lysikov and Fulvio Gesmundo",

year = "2022",

language = "English",

publisher = "arXiv preprint",

type = "WorkingPaper",

institution = "arXiv preprint",

}

RIS

TY - UNPB

T1 - Quantum max-flow in the bridge graph

AU - Steffan, Vincent

AU - Lysikov, Vladimir

AU - Gesmundo, Fulvio

PY - 2022

Y1 - 2022

N2 - The quantum max-flow quantifies the maximal possible entanglement between two regions of a tensor network state for a fixed graph and fixed bond dimensions. In this work, we calculate the quantum max-flow exactly in the case of the bridge graph. The result is achieved by drawing connections to the theory of prehomogenous tensor and the representation theory of quivers. Further, we highlight relations to invariant theory and to algebraic statistics.

AB - The quantum max-flow quantifies the maximal possible entanglement between two regions of a tensor network state for a fixed graph and fixed bond dimensions. In this work, we calculate the quantum max-flow exactly in the case of the bridge graph. The result is achieved by drawing connections to the theory of prehomogenous tensor and the representation theory of quivers. Further, we highlight relations to invariant theory and to algebraic statistics.

M3 - Preprint

BT - Quantum max-flow in the bridge graph

PB - arXiv preprint

ER -

ID: 330733734