图 1  单量子点系统输运过程示意图, $ {E_{\text{e}}} $和$ {E_g} $表示激发态与基态能级, $ {E_{\text{l}}} $和$ {E_{\text{r}}} $为左右两侧化学势, $ {\varGamma _{{\text{e}}\left( {\text{g}} \right)}} $为左侧电子隧穿进入激发态(基态)能级的隧穿概率, $ {\varGamma _{{\text{E}}\left( {\text{G}} \right)}} $为激发态(基态)电子隧穿进入右侧电子库的隧穿概率

Fig. 1.  The diagram of the single quantum dot system in transport process , $ {E_{\text{e}}} $and $ {E_g} $denotes two energy levels in quantum dot, $ {E_{\text{l}}} $ and$ {E_{\text{r}}} $denotes the left and right electrode potentials $ {\varGamma _{{\text{e}}\left( {\text{g}} \right)}} $ is the tunneling probability of the left electron tunneling into the excited(ground) state energy level, $ {\varGamma _{{\text{E}}\left( {\text{G}} \right)}} $ is the tunneling probability of the excited (ground) state electron tunneling into the right electron library.

图 2  初态为g态与相干态下量子速度极限时间比值${{{\tau _{{\text{QSL}}}}} /\tau }$随驱动时间变化图　(a)初态为g态时$ {{{\tau _{{\text{QSL}}}}}/ \tau } $随驱动时间的变化; (b)初态为相干态时$ {{{\tau _{{\text{QSL}}}}} \mathord{\left/ {\vphantom {{{\tau _{{\text{QSL}}}}} \tau }} \right. } \tau } $随驱动时间的变化, 左侧量子点与电子库耦合强度${\varOmega _{\text{r}}} = 1$, 电子的隧穿概率$ {\varGamma _{\text{E}}} = 0.5 $

Fig. 2.  The ratio of the quantum speed limit time $ {{{\tau _{{\text{QSL}}}}} / \tau } $ varies with the driving time in the initial g state and the superposition state: (a) The change of the$ {{{\tau _{{\text{QSL}}}}}/\tau } $with driving time when the initial state is coherent state; (b)the change of the $ {{{\tau _{{\text{QSL}}}}} /\tau } $with driving time when the initial state is superposition state ; the left coupling strength parameter ${\varOmega _{\text{r}}} = 1$, tunneling probability of electrons${\varGamma _{\text{E}}} = 0.5$.

图 3  单量子点系统的速度极限时间比值$ {{{\tau _{{\text{QSL}}}}} / \tau } $随左侧隧穿概率与驱动时间的变化图　(a)不同左侧激发态隧穿概影响下$ {{{\tau _{{\text{QSL}}}}} / \tau } $随驱动时间变化; (b)不同左侧基态隧穿概率影响下$ {{{\tau _{{\text{QSL}}}}} / \tau } $随驱动时间变化, 量子点与左侧电子库耦合强度${\varOmega _{\text{r}}} = 1$, 能级差$\varepsilon = 5{\varOmega _{\text{r}}}$

Fig. 3.  The diagram of the quantum speed limit time ratio $ {{{\tau _{{\text{QSL}}}}}/ \tau } $as a function of left tunneling probability and driving time for a single quantum dot system: (a) Variation of $ {{{\tau _{{\text{QSL}}}}}/\tau } $with driving time under the influence of left different tunneling probabilities into excited states; (b) variation of $ {{{\tau _{{\text{QSL}}}}} / \tau } $with driving time under the influence of left different tunneling probabilities into ground states, the left coupling strength parameter ${\varOmega _{\text{r}}} = 1$, the energy displacement $\varepsilon = 5{\varOmega _{\text{r}}}$.

图 4  单量子点系统的速度极限时间比值$ {{{\tau _{{\text{QSL}}}}} / \tau } $随右侧隧穿概率与驱动时间的变化图　(a)不同右侧激发态隧穿概率影响下$ {{{\tau _{{\text{QSL}}}}} / \tau } $随驱动时间的变化; (b)不同右侧基态隧穿概率影响下$ {{{\tau _{{\text{QSL}}}}} / \tau } $随驱动时间的变化. 量子点与左侧电子库耦合强度${\varOmega _{\text{r}}} = 1$, 能极差$\varepsilon = 5{\varOmega _{\text{r}}}$

Fig. 4.  The diagram of the quantum speed limit time ratio $ {{{\tau _{{\text{QSL}}}}} / \tau } $as a function of right tunneling probability and driving time for a single quantum dot system: (a) Variation of $ {{{\tau _{{\text{QSL}}}}} / \tau } $with driving time under the influence of right different tunneling probabilities from excited states ; (b) variation of $ {{{\tau _{{\text{QSL}}}}} / \tau } $with driving time under the influence of right different tunneling probabilities from ground states.The left coupling strength parameter ${\varOmega _{\text{r}}} = 1$, the energy displacement $\varepsilon = 5{\varOmega _{\text{r}}}$.

图 5  单量子点系统的速度极限时间比值$ {{{\tau _{{\text{QSL}}}}} / \tau } $随弛豫速率与驱动时间的变化图　(a) 不同弛豫速率影响下$ {{{\tau _{{\text{QSL}}}}} / \tau } $随驱动时间的变化; (b) $ {{{\tau _{{\text{QSL}}}}} / \tau } $随弛豫速率$ {\gamma _r} $与驱动时间的三维变化图. 量子点与左侧电子库耦合强度${\varOmega _{\text{r}}} = 1$, 能极差$ \varepsilon = 5{\varOmega _{\text{r}}} $

Fig. 5.  The diagram of the quantum speed limit time ratio $ {{{\tau _{{\text{QSL}}}}} / \tau } $as a function of relaxation rates and driving time for a single quantum dot system:(a) Variation of $ {{{\tau _{{\text{QSL}}}}} / \tau } $with driving time under different relaxation rates ; (b) three-dimensional diagram of $ {{{\tau _{{\text{QSL}}}}} / \tau } $ as a function of relaxation rate and driving time. The left coupling strength parameter ${\varOmega _{\text{r}}} = 1$, the energy displacement$\varepsilon = 5{\varOmega _{\text{r}}}$.

图 6  单量子点系统的速度极限时间比值$ {{{\tau _{{\text{QSL}}}}} / \tau } $随能级差$ \varepsilon $与驱动时间的变化图　(a)不同能级差$ \varepsilon $影响下的$ {{{\tau _{{\text{QSL}}}}} / \tau } $随驱动时间变化; (b)能级差产生跃迁原理图. 量子点与左侧电子库耦合强度${\varOmega _{\text{r}}} = 1$, $ {\varGamma _{\text{E}}} = 0.5 $

Fig. 6.  The diagram of the quantum speed limit time ratio $ {{{\tau _{{\text{QSL}}}}} / \tau } $ as a function of energy displacement $ \varepsilon $ and driving time for a single quantum dot system: (a) Variation of $ {{{\tau _{{\text{QSL}}}}} / \tau } $ with driving time under different energy displacement $ \varepsilon $; (b) the schematic diagram of transition generation by difference energy level. The left coupling strength parameter ${\varOmega _{\text{r}}} = 1$, Tunneling probability of electrons $ {\varGamma _{\text{E}}} = 0.5 $.