Fidelity time evolution of a single-qutrit dephasing model with the initial state
ho _0=frac{1-M}{2}I_3+frac{3M-1}{2}|psi _0
angle langle psi _0|, where <em>M</em> is the degree of mixing and |psi (0)
angle =frac{1}{sqrt{3}}(|0
angle +|1
angle +|2
angle )
Wenchong Shu
Xinyu Zhao
Jun Jing
Lian-Ao Wu
Ting Yu
10.6084/m9.figshare.1012653.v1
https://iop.figshare.com/articles/_Fidelity_time_evolution_of_a_single_qutrit_dephasing_model_with_the_initial_state_span_class_inline/1012653
<p><strong>Figure 3.</strong> Fidelity time evolution of a single-qutrit dephasing model with the initial state \rho _0=\frac{1-M}{2}I_3+\frac{3M-1}{2}|\psi _0\rangle \langle \psi _0|, where <em>M</em> is the degree of mixing and |\psi (0)\rangle =\frac{1}{\sqrt{3}}(|0\rangle +|1\rangle +|2\rangle ). The environment memory time <em>t</em> = 1/γ with γ = 1.</p> <p><strong>Abstract</strong></p> <p>In this paper, we use the quantum state diffusion (QSD) equation to implement the Uhrig dynamical decoupling to a three-level quantum system coupled to a non-Markovian reservoir comprising of infinite numbers of degrees of freedom. For this purpose, we first reformulate the non-Markovian QSD to incorporate the effect of the external control fields. With this stochastic QSD approach, we demonstrate that an unknown state of the three-level quantum system can be universally protected against both coloured phase and amplitude noises when the control-pulse sequences and control operators are properly designed. The advantage of using non-Markovian QSD equations is that the control dynamics of open quantum systems can be treated exactly without using Trotter product formula and be efficiently simulated even when the environment is comprised of infinite numbers of degrees of freedom. We also show how the control efficacy depends on the environment memory time and the designed time points of applied control pulses.</p>
2013-08-27 00:00:00
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control efficacy
frac
environment memory time
control dynamics
control fields
equation
QSD approach
quantum systems
Trotter product formula
control pulses
time points
freedom
control operators
environment memory time t
quantum state diffusion
psi
1. Abstract
amplitude noises