图 1  一维超导微波腔晶格系统模型图　(a) 该系统由$ a_n $和$ b_n $两种超导微波腔组成, 其中$ a_n $和$ b_n $的耦合系数为$ J_1 $, $ b_n $和$ a_{n+1} $的耦合系数为$ J_2 $, $ a_n $和$ a_{n+1} $的耦合系数为$ T_1 $, $ b_n $和$ b_{n+1} $的耦合系数为$ T_2 $; (b) 晶格等价的电路图, 其中$ L_n $和$ C_n $是超导微波腔总的电感和电容, 他们之间的耦合通过磁通超导量子比特调节

Fig. 1.  One-dimensional superconducting microwave cavity lattice system model diagram: (a) The system consists of two superconducting microwave cavities $ a_n $ and $ b_n $, where $ a_n $ and $ b_n $ coupling coefficient is $ J_1 $, $ b_n $ and $ a_{n+1} $ coupling coefficient is $ J_2 $, $ a_n $ and $ a_{n+1} $ coupling coefficient is $ T_1 $, $ b_n $ and $ b_{n+1} $ coupling coefficient is $ T_2 $; (b) equivalent circuit diagram, where $ L_n $ and $ C_n $ are the total inductance and capacitance of the superconducting microwave cavity, and the coupling coefficients can be regulated by the magnetic flux superconducting qubit

图 2  绘制系统能谱E与参数ϕ的物理图像　(a) N = 17时能谱图; (b) N = 18时能谱图, 参数ϕ取值范围为(0, $ 2\pi $)

Fig. 2.  The energy spectrum E of the system via the parameter ϕ: (a) N = 17; (b) N = 18. The range of parameter ϕ is (0, $ 2\pi $)

图 3  绘制系统能谱E与奇偶晶格数的物理图像:　(a)—(d) N = 17, ϕ分别选取0, $ \pi/3 $, $ 2\pi/3 $和π; (e)—(h) N = 18, ϕ分别选取0, $ \pi/4 $, $ \pi/2 $和π

Fig. 3.  The energy spectrum E of the system via the odd and even lattice numbers: (a)–(d) N = 17, $ \phi=0 $, $ \pi/3 $, $ 2\pi/3 $ and π; (e)–(h) N = 18, $ \phi=0 $, $ \pi/4 $, $ \pi/2 $ and π

图 4  绘制系统零模能级态的分布与奇偶晶格数的物理图像:　(a)—(d) N = 17, ϕ分别选取0, $ \pi/3 $, $ 2\pi/3 $和π; (e)—(h) N = 18, ϕ分别选取0, $ \pi/3 $, $ \pi/2 $和$ 1.99\pi $; (i)—(l) N = 18, ϕ分别选取0, $ \pi/3 $, $ \pi/2 $和$ 1.99\pi $

Fig. 4.  The state distribution of the zero-mode energy and the odd-even lattice number: (a)–(d) N = 17, $ \phi=0 $, $ \pi/3 $, $ 2\pi/3 $ and π; (e)–(h) N = 18, $ \phi=0 $, $ \pi/3 $, $ \pi/2 $ and $ 1.99\pi $. (i)–(l) N = 18, $ \phi=0 $, $ \pi/3 $, $ \pi/2 $ and $ 1.99\pi $

图 5  绘制系统能谱E与参数ϕ的物理图像, 选取晶格数N = 17　(a) $ T_{1}=0.4 $, $ T_{2}=0 $; (b) $ T_{1}=0 $, $ T_{2}=0.4 $; (c) $ T_{1}=0.4 $, $ T_{2}=0.3 $

Fig. 5.  The energy spectrum E of the system via the parameter ϕ, N = 17: (a) $ T_{1}=0.4 $, $ T_{2}=0 $; (b) $ T_{1}=0 $, $ T_{2}=0.4 $; (c) $ T_{1}=0.4 $, $ T_{2}=0.3 $

图 6  绘制系统能谱E与参数ϕ的物理图像, 选取晶格数N = 18　(a) T₁ = 0.2, T₂ = 0; (b) T₁ = 0, T₂ = 0.2; (c) T₁ = 0.2, T₂ = 0.2

Fig. 6.  The energy spectrum E of the system via the parameter ϕ, N = 18: (a) $ T_{1}=0.2 $, $ T_{2}=0 $; (b) $ T_{1}=0 $, $ T_{2}=0.2 $; (c) $ T_{1}=0.2 $, $ T_{2}=0.2 $

图 7  绘制态的分布与参数ϕ和晶格数的物理图像, 选取晶格数N = 17　(a) $ T_{1}=0 $, $ T_{2}=0 $; (b) $ T_{1}=0.6 $, $ T_{2}=0 $; (c) $ T_{1}= $$ 0 $, $ T_{2}=0.3 $; (d) $ T_{1}=0.6 $, $ T_{2}=0.3 $

Fig. 7.  The state distribution via the lattice numbers and the parameter ϕ, N = 17: (a) $ T_{1}=0 $, $ T_{2}=0 $; (b) $ T_{1}=0.6 $, $ T_{2}=0 $; (c) $ T_{1}=0 $, $ T_{2}=0.3 $; (d) $ T_{1}=0.6 $, $ T_{2}=0.3 $

图 8  绘制态的分布与参数ϕ和晶格数的物理图像, 选取晶格数N = 18　(a) $ T_{1}=0.1 $, $ T_{2}=0.1 $; (b) $ T_{1}=0.01 $, $ T_{2}=0 $; (c) $ T_{1}= $$ 0 $, $ T_{2}=0.01 $; (d) $ T_{1}=0.2 $, $ T_{2}=0.19 $

Fig. 8.  The state distribution via the lattice numbers and the parameter ϕ, N = 18: (a) $ T_{1}=0.1 $, $ T_{2}=0.1 $; (b) $ T_{1}= 0.01 $, $ T_{2}=0 $; (c) $ T_{1}=0 $, $ T_{2}=0.01 $; (d) $ T_{1}=0.2 $, $ T_{2}=0.19 $

图 9  绘制能谱E与参数ϕ的物理图像, 选取晶格数N = 18　(a) 在第9个和第10个晶格分别加入缺陷势能$ \text {δ}W=-0.1 $, $ \text {δ} W =0.1 $; (b) 在第9个和第10个晶格分别加入缺陷势能$ \text {δ} W =0.1 $, $ \text {δ} W =-0.1 $; (c) 每个晶格引入缺陷势能$ \text {δ} W=0.5 $; (d) 每个晶格引入随机位缺陷势能δW = –0.1—0.1; (e) 每个晶格引入随机位缺陷势能δW = –0.3—0.3; (f) 每个晶格引入随机位缺陷势能δW = –0.8—0.8

Fig. 9.  The energy spectrum E of the system via the parameter ϕ, N = 18: (a) Add defect potentials $ \text {δ} W=-0.1 $ and $ \text {δ} W=0.1 $ to the 9 and 10 lattices, respectively; (b) add defect potentials $ \text {δ} W=0.1 $ and $ \text {δ}W=-0.1 $ to the 9 and 10 lattices, respectively; (c) each lattice point introduces a defect potential energy $ \text {δ} W=0.5 $; (d) potential energy δW = –0.1–0.1 for the introduction of random site defects at lattice point; (e) potential energy δW = –0.3–0.3 for the introduction of random site defects at lattice point; (f) potential energy δW = –0.8–0.8 for the introduction of random site defects at lattice point