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Entanglement Classification via Operator Size

by Qi-Feng Wu

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Submission summary

Authors (as registered SciPost users): Qi-Feng Wu
Submission information
Preprint Link: https://arxiv.org/abs/2111.07636v7  (pdf)
Date accepted: 2023-08-07
Date submitted: 2023-06-27 06:59
Submitted by: Wu, Qi-Feng
Submitted to: SciPost Physics
Ontological classification
Academic field: Physics
Specialties:
  • Quantum Physics
Approach: Theoretical

Abstract

In this work, multipartite entanglement is classified by polynomials. I show that the operator size is closely related to the entanglement structure. Given a generic quantum state, I define a series of subspaces generated by operators of different sizes acting on it. The information about the entanglement is encoded into these subspaces. With the dimension of these subspaces as coefficients, I define a polynomial which I call the entanglement polynomial. The entanglement polynomial induces a homomorphism from quantum states to polynomials. It implies that we can characterize and find the building blocks of entanglement by polynomial factorization. Two states share the same entanglement polynomial if they are equivalent under the stochastic local operations and classical communication. To calculate the entanglement polynomial practically, I construct a series of states, called renormalized states, whose ranks are related to the coefficients of the entanglement polynomial.

Published as SciPost Phys. Core 6, 063 (2023)


Reports on this Submission

Report #1 by Anonymous (Referee 1) on 2023-7-12 (Invited Report)

Report

The current version looks good and can be published on Scipost.

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