English

On a matrix equality involving partial transposition and its relation to the separability problem

Quantum Physics 2021-04-14 v1

Abstract

In matrix theory, a well established relation (AB)T=BTAT(AB)^{T}=B^{T}A^{T} holds for any two matrices AA and BB for which the product ABAB is defined. Here TT denote the usual transposition. In this work, we explore the possibility of deriving the matrix equality (AB)Γ=AΓBΓ(AB)^{\Gamma}=A^{\Gamma}B^{\Gamma} for any 4×44 \times 4 matrices AA and BB, where Γ\Gamma denote the partial transposition. We found that, in general, (AB)ΓAΓBΓ(AB)^{\Gamma}\neq A^{\Gamma}B^{\Gamma} holds for 4×44 \times 4 matrices AA and BB but there exist particular set of 4×44 \times 4 matrices for which (AB)Γ=AΓBΓ(AB)^{\Gamma}= A^{\Gamma}B^{\Gamma} holds. We have exploited this matrix equality to investigate the separability problem. Since it is possible to decompose the density matrices ρ\rho into two positive semi-definite matrices AA and BB so we are able to derive the separability condition for ρ\rho when ρΓ=(AB)Γ=AΓBΓ\rho^{\Gamma}=(AB)^{\Gamma}=A^{\Gamma}B^{\Gamma} holds. Due to the non-uniqueness property of the decomposition of the density matrix into two positive semi-definte matrices AA and BB, there is a possibility to generalise the matrix equality for density matrices lives in higher dimension. These results may help in studying the separability problem for higher dimensional and multipartite system.

Cite

@article{arxiv.2104.06117,
  title  = {On a matrix equality involving partial transposition and its relation to the separability problem},
  author = {Vaibhav Soni and Rishone Deshwal and Aayush Garg and Rohit Kumar and Satyabrata Adhikari},
  journal= {arXiv preprint arXiv:2104.06117},
  year   = {2021}
}

Comments

This paper is a part of B.Tech project. It consist of 5 pages and 1 figure

R2 v1 2026-06-24T01:07:06.908Z