Single-spin entanglement

TL;DR

This paper demonstrates how a spin (3/2) system can be represented as two coupled spin (1/2) systems, enabling the study of entanglement and potential quantum computing applications.

Contribution

It introduces a novel representation of a single spin (3/2) as two coupled spin (1/2) systems, linking Hamiltonians to well-known spin models and exploring entanglement properties.

Findings

Concurrence tends to 0.5 with increasing magnetic field.

Representation facilitates analysis of entanglement in single spins.

Potential application in quantum computation.

Abstract

We show that the operators and the quadrupole and Zeeman Hamiltonians for a spin (3/2) can be represented in terms for a system of two coupling fictitious spins (1/2) using the Kronecker product of Pauli matrices. Particularly, the quadrupole Hamiltonian which describes the interaction of the nuclear quadrupole moment with an electric field gradient is represented as the Hamiltonian of Ising model in a transverse selective magnetic field. The Zeeman Hamiltonian, which describes interaction of the nuclear spin with the external magnetic field, can be considered as the Hamiltonian of the Heisenberg model in a selective magnetic field. The total Hamiltonian can be interpreted as the Hamiltonian of 3D Heisenberg model in an inhomogeneous magnetic field applied along the x-axis. The representation of a single spin (3/2) as two-spin (1/2) system allows us to study entanglement in the spin system. One of the features of the fictitious spin system is that, in both the pure and the mixed states, the concurrence tends to 0.5 with increase of applied magnetic field. The representation of a spin (3/2) as a system of two coupling fictitious spins (1/2) and possibility of formation of the entangled states in this system open a way to the application of a single spin (3/2) in quantum computation.