图 1  二能级原子系统量子态的两种量子速率极限时间${\tau _{{\rm{QSL}}}}$与实际演化时间τ的比值随未参加相互作用光场b的相干参数β和初始量子态参数θ的变化, 这里$g = 1$, 彩虹图形描述Campaioli表达式(8), 灰色图形描述Deffner表达式(7)　(a) $\alpha = 1$和$\tau = 1$时, 初始纠缠相干光场状态为${N_ + }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} + {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$; (b) $\alpha = 1$和$\tau = 1$时, 初始纠缠相干光场状态为${N_ - }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} - {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$

Figure 1.  Ratio of the quantum speed limit time ${\tau _{{\rm{QSL}}}}$ to the actual evolution time τ for the two-level atomic system quantum state as a function of the dimensionless initial state parameter θ and the coherent parameter β of the non-interaction light field b, and $g = 1$, the rainbow graph describes Campaioli’s expression (8) and the gray graph describes Deffner’s expression (7). (a) When $\alpha = 1$and $\tau = 1$, the initial entangled coherent state is ${N_ + }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} + {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$; (b) when $\alpha = 1$and $\tau = 1$, the initial entangled coherent state is ${N_ - }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} - {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$.

图 2  原子系统量子态的量子速率极限时间与实际演化时间的比值${\tau _{{\rm{QSL}}}}/\tau $随双模纠缠相干光场参数α和β的变化规律, 这里$g = 1$, $\theta = 3{\text{π}}/4$, 彩虹图形描述Campaioli表达式(8), 灰色图形描述Deffner表达式(7)　(a)和(c)分别为$\tau = 1$和$\tau = 5$时, 初始时刻双模纠缠相干光场为${N_ + }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} + {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$; (b)和(d)分别为$\tau = 1$和$\tau = 5$时, 初始时刻双模纠缠相干光场为${N_ - }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} - {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$

Figure 2.  Ratio ${\tau _{{\rm{QSL}}}}/\tau $of the quantum speed limit time to the actual evolution time for the two-level atomic system quantum state as a function of the two-mode entangled coherent light field parameters α and β, and $g = 1$, $\theta = 3{\text{π}} /4$, the rainbow graph describes Campaioli’s expression (8) and the gray graph describes Deffner’s expression (7). Here, in (a) and (c) the initial entangled coherent state is ${N_ + }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} + {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$, for $\tau = 1$ and $\tau = 5$ respectively; in (b) and (d) the initial entangled coherent state is ${N_ - }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} + {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$, for $\tau = 1$ and $\tau = 5$ respectively.

图 3  考虑不同的实际演化时间τ时, 二能级原子系统量子态的量子速率极限时间与实际演化时间的比值${\tau _{{\rm{QSL}}}}/\tau $随参加相互作用光场a的相干参数α的变化规律, 这里 $\beta = 0$, $g = 1$, $\theta = 3{\text{π}} /4$　(a)初始光场a为$\left( {{\left| \alpha \right\rangle _a} + {\left| { - \alpha } \right\rangle _a}} \right)/{\left( {2 + 2{{\rm{e}}^{ - 2{{\left| \alpha \right|}^2}}}} \right)^{ - 1/2}}$; (b)初始光场a为$\left( {{\left| \alpha \right\rangle _a} - {\left| { - \alpha } \right\rangle _a}} \right)/{\left( {2 - 2{{\rm{e}}^{ - 2{{\left| \alpha \right|}^2}}}} \right)^{ - 1/2}}$

Figure 3.  By considering different actual evolution times, the ratio ${\tau _{{\rm{QSL}}}}/\tau $of the quantum speed limit time to the actual evolution time for the two-level atomic system quantum state as a function of the coherent parameter α of the interaction light field a, and $\beta = 0$, $g = 1$, $\theta = 3{\text{π}}/4$: (a) The initial state of the light field a is $\left( {{\left| \alpha \right\rangle _a} + {\left| { - \alpha } \right\rangle _a}} \right)/{\left( {2 + 2{{\rm{e}}^{ - 2{{\left| \alpha \right|}^2}}}} \right)^{ - 1/2}}$; (b) the initial state of the light field a is $\left( {{\left| \alpha \right\rangle _a} - {\left| { - \alpha } \right\rangle _a}} \right)/{\left( {2 - 2{{\rm{e}}^{ - 2{{\left| \alpha \right|}^2}}}} \right)^{ - 1/2}}$.

图 4  二能级原子系统量子态的量子速率极限时间与实际演化时间的比值${\tau _{{\rm{QSL}}}}/\tau $随双模纠缠光场相干参数α, β的变化规律, 这里$\tau = 1$, $g = 1$, $\theta = 3{\text{π}}/4$　(a)初始双模纠缠相干光场${N_ + }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} + {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$; (b)初始双模纠缠相干光场${N_ - }\left( { {\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} - {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$

Figure 4.  Ratio ${\tau _{{\rm{QSL}}}}/\tau $of the quantum speed limit time to the actual evolution time for the two-level atomic system quantum state as a function of the two-mode entangled coherent light field parameters α and β, and $\tau = 1$, $g = 1$, $\theta = 3{\text{π}}/4$: (a) The initial entangled coherent state is ${N_ + }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} + {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$; (b) the initial entangled coherent state is ${N_ - }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} - {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$.

图 5  二能级原子系统量子态的量子速率极限时间与实际演化时间的比值${\tau _{{\rm{QSL}}}}/\tau $随双模纠缠相干光场参数α, β的变化规律, 这里$\tau = 15$, $g = 1$, $\theta = 3{\text{π}}/4$　(a)初始双模纠缠相干光场为${N_ + }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} + {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$; (b)初始双模纠缠相干光场为${N_ - }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} - {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$

Figure 5.  Ratio ${\tau _{{\rm{QSL}}}}/\tau $of the two quantum speed limit time to the actual evolution time for the two-level atomic system quantum state as a function of the two-mode entangled coherent light field parameters α and β, here parameters $\tau = 15$, $g = 1$, $\theta = 3{\text{π}}/4$: (a) The initial entangled coherent state is ${N_ + }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} + {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$; (b) the initial entangled coherent state ${N_ - }\left( {{\left| \alpha \right\rangle _a}{\left| \beta \right\rangle _b} - {\left| { - \alpha } \right\rangle _a}{\left| { - \beta } \right\rangle _b}} \right)$.