Berry phase and entanglement of 3 qubits in a new Yang-Baxter system

Abstract

In this paper we construct a new 8×8 M matrix from the 4×4 M matrix, where M / M is the image of the braid group representation. The 8×8 M matrix and the 4×4 M matrix both satisfy extraspecial 2-groups algebra relations. By Yang-Baxteration approach, we derive a unitary R(θ, φ) matrix from the M matrix with parameters φ and θ. Three-qubit entangled states can be generated by using the R(θ,φ) matrix. A Hamiltonian for 3 qubits is constructed from the unitary R(θ,φ) matrix. We then study the entanglement and Berry phase of the Yang-Baxter system.