Geometric measure of quantum discord for a two-parameter class of states in a qubit-qutrit system under various dissipative channels

TL;DR

This paper derives explicit formulas for the geometric measure of quantum discord in a qubit-qutrit system and analyzes its dynamics under various dissipative channels, revealing different asymptotic behaviors.

Contribution

It provides the first explicit analytical expressions for GMQD in a two-parameter qubit-qutrit state and studies its evolution under multiple noise channels.

Findings

GMQD does not vanish suddenly under any studied channel.

Quantum correlations decay asymptotically under dephasing, phase-flip, and depolarizing noise.

Quantum correlations persist indefinitely under trit-flip and trit-phase-flip channels.

Abstract

Quantum discord, as a measure of all quantum correlations, has been proposed as the key resource in certain quantum communication tasks and quantum computational models without containing much entanglement. Daki\'{c}, Vedral, and Brukner [Phys. Rev. Lett. 105, 190502 (2010)] introduced a geometric measure of quantum discord (GMQD) and derived an explicit formula for any two-qubit state. Luo and Fu [Phys. Rev. A 82, 034302 (2010)] introduced another form of GMQD and derived an explicit formula for arbitrary state in a bipartite quantum system. However, the explicit analytical expression for any bipartite system was not given. In this work, we give out the explicit analytical expressions of the GMQD for a two-parameter class of states in a qubit-qutrit system and study its dynamics for the states under various dissipative channels in the first time. Our results show that all these dynamic evolutions do not lead to a sudden vanishing of GMQD. Quantum correlations vanish at an asymptotic time for local or multi-local dephasing, phase-flip, and depolarizing noise channels. However, it does not disappear even though t ---> $\infty$ for local trit-flip and local trit-phase-flip channels. Our results maybe provide some important information for the application of GMQD in hybrid qubit-qutrit systems in quantum information.