图 1  (a) 存在输入-输出端口的Su-Schrieffer-Heeger人工原子链-单模腔耦合系统示意图; (b)三维电路QED示意图^[16]

Fig. 1.  (a) Schematic diagram of Su-Schrieffer-Heeger artificial atom chain-single-mode cavity coupling system with input-output ports; (b) three-dimensional circuit QED schematic diagram^[16].

图 2  腔中存在一组共两个人工原子时, 透射率随入射场与腔模失谐$\delta $和原子间耦合$ {t_{\text{A}}} $的变化　(a)双原子与腔模的耦合强度一致, ${\varOmega _1} = {\varOmega _2} = {\varOmega _0}$; (b)双原子与腔模的耦合强度不同, ${\varOmega _1} = 2{\varOmega _0}, {\varOmega _2} = 0.1{\varOmega _0}$, 采用参数$\kappa = \gamma = {\text{0}}{\text{.1}}{\varOmega _0}$

Fig. 2.  In the case of a set of altogether two artificial atoms in the cavity, transmittance varies with the detuning $\delta $ between incident field and cavity mode and interatomic coupling $ {t_{\text{A}}} $: (a) The coupling strength of diatoms and cavity mode is consistent, ${\varOmega _1} = {\varOmega _2} = {\varOmega _0}$; (b) the coupling strength between diatoms and cavity modes is different, ${\varOmega _1} = 2{\varOmega _0}, {\varOmega _2} = 0.1{\varOmega _0}$, the parameters are $\kappa = \gamma = {\text{0}}{\text{.1}}{\varOmega _0}$.

图 3  腔中存在两组共4个人工原子时, (a) 透射谱随原子间耦合强度${t_{\text{B}}}$的变化, $\varOmega = 2{\varOmega _0}$; (b) 透射谱随原子与腔模耦合强度$\varOmega $的变化, ${t_{\text{B}}} = 3{\varOmega _0}$. 采用参数为${t_{\text{A}}} = {\varOmega _0}, \kappa = 0.2{\varOmega _0}, \gamma = 0.1{\varOmega _0}$

Fig. 3.  (a) In the case of two sets of altogether four artificial atoms in the cavity, transmission spectrum varies with the interatomic coupling intensity ${t_{\text{B}}}$, $\varOmega = 2{\varOmega _0}$; (b) The transmission spectrum varies with the coupling strength $\varOmega $ between the atom and the cavity mode, ${t_{\text{B}}} = 3{\varOmega _0}$. The parameters are ${t_{\text{A}}} = {\varOmega _0}, \kappa = 0.2{\varOmega _0}, \gamma = 0.1{\varOmega _0}$.

图 4  腔中存在3组共6个人工原子时, (a) 透射谱随原子间耦合强度${t_{\text{B}}}$的变化, $\varOmega = 2{\varOmega _0}$; (b) 透射谱随原子与腔模耦合强度$\varOmega $的变化, ${t_{\text{B}}} = 3{\varOmega _0}$. 采用参数为${t_{\text{A}}} = {\varOmega _0}, \kappa = 0.2{\varOmega _0}, \gamma = 0.1{\varOmega _0}$, 红圈内为本文定义的劈裂

Fig. 4.  (a) In the case of three sets of altogether six artificial atoms in the cavity, transmission spectrum varies with the interatomic coupling intensity ${t_{\text{B}}}$, $\varOmega = 2{\varOmega _0}$; (b) the transmission spectrum varies with the coupling strength $\varOmega $ between the atom and the cavity mode, ${t_{\text{B}}} = 3{\varOmega _0}$. The parameters are ${t_{\text{A}}} = {\varOmega _0}, \kappa = 0.2{\varOmega _0}, \gamma = 0.1{\varOmega _0}$. The splits defined in this article are circled in red.

图 5  腔内双原子条件下, (a)缀饰态的能级; (b)—(d)各能级对应的原子占据数$ \left\langle{{S}_{zi}}\right\rangle $与腔内平均光子数$ \left\langle{{a}^{+}a}\right\rangle $随${t_{\text{A}}}$的变化; (e)避免交叉点放大图. 其他参数为${\varOmega _1} = {\varOmega _2} = {\varOmega _0}$; 按照本征值从小到大分别用红、绿、蓝三色代表不同的本征态

Fig. 5.  In the case of two atoms in the cavity, (a) the energy levels of the dressed states; (b)–(d) the corresponding atomic excitation probability of each energy level and the average number of photons in the cavity change with ${t_{\text{A}}}$; (e) a larger version of avoid crossing points. The parameters are ${\varOmega _1} = {\varOmega _2} = {\varOmega _0}$. The eigen states are represented by red, green, and blue in order of eigen values from smallest to largest.

图 6  腔内六原子条件下, (a)缀饰态的能级; (b)—(h)各能级对应的原子占居数$ \left\langle{{S}_{zi}}\right\rangle $与腔内平均光子数$ \left\langle{{a}^{+}a}\right\rangle $随${t_{\text{B}}}$的变化; (i), (j)避免交叉点放大图. 采用参数为$\varOmega = 2{\varOmega _0}, {t_{\text{A}}} = {\varOmega _0}$; 不同颜色分别代表不同的能级, 并依照本征值的大小编号

Fig. 6.  In the case of six atoms in the cavity, (a) the energy levels of the dressed states; (b)–(h) the corresponding atomic excitation probability of each energy level and the average number of photons in the cavity change with ${t_{\text{B}}}$; (i), (j) two larger versions of avoid crossing points. The parameters are $\varOmega = 2{\varOmega _0}, {t_{\text{A}}} = {\varOmega _0}$. Different colors represent different energy levels and are numbered according to the magnitude of the eigenvalue.

图 7  (a) $\kappa = \gamma = {\text{0}}{\text{.1}}{\varOmega _0}$条件下的透射谱; (b)原子自发衰减增大后的透射谱, $ \kappa = {\text{0}}{\text{.1}}{\varOmega _0}, {\kern 1 pt} {\kern 1 pt} {\kern 1 pt} {\kern 1 pt} \gamma = {\text{0}}{\text{.5}}{\varOmega _0} $; (c)腔的泄漏率增大后的透射谱, $\kappa = {\text{0}}{\text{.5}}{\varOmega _0}, \gamma = {\text{0}}{\text{.1}}{\varOmega _0}$. 采用参数为$\varOmega = {\varOmega _0}, {t_{\text{A}}} = {\varOmega _0}, {t_{\text{B}}} = 3{\varOmega _0}$

Fig. 7.  (a) Transmission spectrum under $\kappa = \gamma = {\text{0}}{\text{.1}}{\varOmega _0}$; (b) the transmission spectrum after the increase of atomic spontaneous attenuation, $ \kappa = {\text{0}}{\text{.1}}{\varOmega _0}, {\kern 1 pt} {\kern 1 pt} {\kern 1 pt} {\kern 1 pt} \gamma = {\text{0}}{\text{.5}}{\varOmega _0} $; (c) the transmission spectrum after the increase of leakage rate of cavity, $\kappa = {\text{0}}{\text{.5}}{\varOmega _0}, $$ \gamma = {\text{0}}{\text{.1}}{\varOmega _0}$. The parameters are $\varOmega = {\varOmega _0}, {t_{\text{A}}} = {\varOmega _0}, {t_{\text{B}}} = 3{\varOmega _0}$.