Related papers: Towards parameterizing the entanglement body of a qubit pair

Towards parameterizing the entanglement body of a qubit pair

URL: http://arxiv.org/abs/2411.17620v1
Date: Tue, 26 Nov 2024 17:32:43 GMT
Title: Towards parameterizing the entanglement body of a qubit pair
Authors: Arsen Khvedelidze, Dimitar Mladenov, Astghik Torosyan,
Abstract summary: Method is based on the construction of coordinates on a generic section of 2-qubit's entanglement space. Subset $mathcalSE_2times2 subsetmathcalE_2times2$ corresponding to rank-4 2-qubit states is described.
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Abstract: A method allowing to increase a computational efficiency of evaluation of non-local characteristics of a pair of qubits is described. The method is based on the construction of coordinates on a generic section of 2-qubit's entanglement space $\mathcal{E}_{2\times2}$ represented as the direct product of an ordered 3-dimensional simplex and the double coset $\mathrm{SU(2)}\times\mathrm{SU(2)}{\backslash} {\mathrm{SU(4)}}/ \mathrm{T^3}\,.$ Within this framework, the subset $\mathcal{SE}_{2\times2} \subset\mathcal{E}_{2\times2}$ corresponding to the rank-4 separable 2-qubit states is described as a semialgebraic variety given by a system of 3rd and 4th order polynomial inequalities in eigenvalues of the density matrix, whereas the polynomials coefficients are trigonometric functions defined over a direct product of two regular octahedra.

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