图 1  双腔双光力系统示意图, 其中光学腔${a_i}$通过光力耦合相互作用${g_{ij}}$与力学振子${b_j}$相耦合, 同时两光学腔之间存在腔模线性耦合相互作用, 腔模两侧存在振幅为${\varepsilon _{{\text{d}}i}}$的驱动场和${\varepsilon _{{\text{p}}i}}$的探测场

Fig. 1.  Diagram of double-cavity dual-optomechanical system. The optical cavity ${a_i}$ is coupled to the mechanical oscillator ${b_j}$ by the optomechanical coupling interaction $ {g}_{ij}$. And there is a cavity mode linear coupling interaction between two optical cavities, and there are the coupling fields with amplitude ${\varepsilon _{{\text{d}}i}}$ and the probe fields with amplitude ${\varepsilon _{{\text{p}}i}}$ on both sides of the cavity modes.

图 2  ${x / \kappa } = 0$时, 传输振幅T随相位差α的变化 (其他参数: ${J/\kappa } = C = 1$)

Fig. 2.  Transmission amplitudes T at ${x / \kappa } = 0$ are plotted against the phase difference α (Other parameters: ${J/\kappa } = $$ C = 1$).

图 3  单个力学振子b₁影响下, 不同方向输入场${\varepsilon _{{\text{p}}1}}$(a)和${\varepsilon _{{\text{p}}2}}$(b)的传输振幅T随标准化失谐$x/\kappa $的变化 (其他参数: $\alpha = {{\text{π }} \mathord{\left/ {\vphantom {{\text{π }} 2}} \right. } 2}$, ${J \mathord{\left/ {\vphantom {J \kappa }} \right. } \kappa } = 1$, ${{{\gamma _1}} \mathord{\left/ {\vphantom {{{\gamma _1}} \kappa }} \right. } \kappa } = 0.25$, ${G_2} = 0$, ${{{G_1}}/ \kappa } = 0.5$)

Fig. 3.  Transmission amplitude T of input fields ${\varepsilon _{{\text{p}}1}}$(a) and ${\varepsilon _{{\text{p}}2}}$(b) in different directions as a function of normalized detuning $x/\kappa $ for only a single mechanical oscillator b₁ (Other parameters: $\alpha = {{\text{π }}/2}$, ${J/ \kappa } = 1$, ${{{\gamma _1}} / \kappa } = 0.25$, ${G_2} = 0$, ${{{G_1}} / \kappa } = 0.5$)

图 4  x = 0时, 单向隔离率I 随有效光力耦合强度${G_1}$的变化 (给定的参数: $\alpha = {{\text{π }}/ 2}$, ${J/ \kappa } = 1$, ${G_2} = 0$, ${{{\gamma _1}}/ \kappa } = $$ 0.25$)

Fig. 4.  Unidirectional isolation rate I at x = 0 versus effective optomechanical coupling strengths ${G_1}$ (The given parameters: $\alpha = {{\text{π }}/ 2}$, ${J / \kappa } = 1$, ${G_2} = 0$, ${{{\gamma _1}} / \kappa } = 0.25$)

图 5  x = 0时, 单向隔离率I随有效光力耦合强度${G_1}$和${G_2}$的变化 (给定的参数: $\alpha = {{\text{π }}/ 2}$, ${J/\kappa } = 1$, ${{{\gamma _1}}/ \kappa } = 0.25$, ${{{\gamma _2}}/ \kappa } = 9$)

Fig. 5.  Unidirectional isolation rate I at x = 0 versus the effective optomechanical coupling strengths G₁ and G₂ (The given parameters: $\alpha = {{\text{π }}/ 2}$, ${J/ \kappa } = 1$, ${{{\gamma _1}}/\kappa } = 0.25$, ${{{\gamma _2}}/\kappa } = $$ 9$).

图 6  透射振幅T和对应的隔离率I随标准化失谐$x/\kappa $的变化 (其他参数与图5相同)　(a1) G₂ = 0, G₁/κ = 0.5; (a2) G₂ = 0, G₁/κ = 0.3; (b1) G₁/κ = 0.3, G₂/κ = 2.4; (b2) G₁/κ = 0.3, G₂/κ = 3.0

Fig. 6.  Transmission amplitudes T and the corresponding isolation rate I versus normalized detuning $x/\kappa $ (The given parameters are the same as the ones in Fig. 5): (a1) G₁/κ = 0.5; (a2) G₁/κ = 0.3; (b1) G₂/κ = 2.4; (b2) G₂/κ = 3.0.

图 7  透射振幅T和对应的隔离率I随标准化失谐$x/\kappa $的变化 (其他参数: $\alpha = {{\text{π }} / 2}$, ${J /\kappa } = 1$, ${{{\gamma _2}}/ \kappa } = 9$, ${{{G_2}} / \kappa } = 3$)　(a1) γ₁/κ = 0.01, G₁/κ = 0; (a2) γ₁/κ = 0.01, G₁/κ = 0.3; (b1) γ₁ = 0, G₁/κ = 0.3; (b2) γ₁ = 0, G₁/κ = 0.8

Fig. 7.  Transmission amplitudes T and the corresponding isolation rate I versus normalized detuning $x/\kappa $ (The other parameters are $\alpha = {{\text{π }}/ 2}$, ${J / \kappa } = 1$, ${{{\gamma _2}}/ \kappa } = 9$, ${{{G_2}} / \kappa } = 3$): (a1) γ₁/κ = 0.01, G₁/κ = 0; (a2) γ₁/κ = 0.01, G₁/κ = 0.3; (b1) γ₁ = 0, G₁/κ = 0.3; (b2) γ₁ = 0, G₁/κ = 0.8.

图 8  隔离率I随有效光力耦合强度${{{G_1}}/\kappa }$和${{{G_2}} / \kappa }$的单峰区及双峰区 (其他参数与图5相同)

Fig. 8.  Single peak region and double peak region of the isolation rate I versus the effective optomechanical coupling strengths ${{{G_1}} / \kappa }$ and ${{{G_2}} / \kappa }$ (Other parameters are the same as the ones in Fig. 5).