English

Quantum mutual information redistribution by Number Partitioning algorithm

Quantum Physics 2023-11-30 v1

Abstract

Quantum information distribution in a tripartite state plays a fundamental role in quantum information processes. Here we investigate how a bipartite unitary transformation UABU_{AB} redistributes the quantum mutual information with the third party CC in a tripartite pure state ψABC|\psi\rangle_{ABC} in a dA×dB×dCd_A\times d_B\times d_C dimensional Hilbert space. In particular, we focus on finding out the optimal unitary transformation UABU_{AB}^{\ast} that maximizes the quantum mutual entropy between party AA and party CC, I(A:C)=S(ρA)S(ρB)+S(ρC)I(A:C)=S(\rho_A)-S(\rho_B)+S(\rho_C). We show that the mutual entropy I(A:C)I(A:C) is upper bounded by 2S(ρC)2S(\rho_C) derived from the Araki-Lieb inequality. This upper bound can be realized via an optimal unitary transformation for any pure state with the rank rCr_{C} of ρC\rho_C satisfying rCdAr_C\le d_A. For a generic pure state with rC>dAr_C> d_A, the upper bound can not be realized by any bipartite unitary transformation. To maximize the mutual entropy in the latter case, we propose a fast numerical algorithm to produce an approximate optimal unitary transformation, where our optimization is transformed into a modified number partition problem. The validness of our algorithm is confirmed by its comparison with the results from the Adam algorithm for parameterized unitary transformations. Our approximate algorithm thus provides a practical protocol to implement redistribution of quantum mutual information for a tripartite quantum state with high dimensions.

Keywords

Cite

@article{arxiv.2306.10297,
  title  = {Quantum mutual information redistribution by Number Partitioning algorithm},
  author = {Muchun Yang and Cheng-Qian Xu and D. L. Zhou},
  journal= {arXiv preprint arXiv:2306.10297},
  year   = {2023}
}

Comments

13 pages, 4 figures

R2 v1 2026-06-28T11:07:51.352Z