图 1  准一维非厄米菱形晶格示意图

Fig. 1.  Schematic of non-Hermitian quasi-one-dimensional rhombic chain.

图 2  周期边界条件(蓝色实心圆)和开放边界条件(红色空心圆)下的复能谱　(a)—(c) 分别对应厄米情况下(h = 0)规范势 φ = 0, 0.5π, π 的能谱图; (d)—(f) 分别对应非厄米情况下(h = 0.6)规范势 φ = 0, 0.5π, π 的能谱图

Fig. 2.  Complex energy spectra under periodic (blue solid circles) and open boundary conditions (red hollow circles): (a)–(c) Energy spectra for Hermitian cases (h = 0) with φ = 0, 0.5π, π, respectively; (d)–(f) energy spectra for non-Hermitian cases (h = 0.6) with φ = 0, 0.5π, π, respectively.

图 3  不同参数下的本征模式分布和MPR变化　(a)—(c) φ = 0时, h 取0, 0.6, 1.2时的本征模式分布; (d)—(f) φ = π时, h 取0, 0.6, 1.2时的本征模式分布; (g) 规范势 φ = 0 时MPR随h变化情况; (h) 规范势 φ = π 时MPR随h变化情况; 蓝色圆点表示数值计算的结果, 红色实线表示回归分析的结果

Fig. 3.  The distribution of eigenmodes and the variation of MPR via h under different parameters: (a)–(c) the distributions of eigenmodes with φ = 0 as h = 0, 0.6, and 1.2, respectively; (d)–(f) the distributions of eigenmodes with φ = π as h = 0, 0.6, and 1.2, respectively; (g) MPR as a function of h for φ = 0; (h) MPR as a function of h for φ = π. The blue dots indicate the result of numerical calculation and the red solid lines indicate the result of regression.

图 4  不同参数下的单点激发随时间演化特性　(a)—(c) 规范势 φ = 0 时h 分别取0, 0.6, –0.6时的演化; (d)—(f) 规范势 φ = π 时h 分别取0, 0.6, –0.6时的演化

Fig. 4.  Time-dependent wave dynamics for single-site injection with different parameters: (a)–(c) For φ = 0 with h = 0, 0.6, –0.6, respectively; (d)–(f) for φ = π with h = 0, 0.6, –0.6, respectively.

图 5  单点激发下一段时间演化后(时间取20)的输出模场分布随规范势φ的变化情况. 格点总数N = 31, 激发位置始终位于结构的正中间A格点(n = 16), 选取固定不变的趋肤强度h = 0.6, 模场强度已做归一化处理

Fig. 5.  The variation of the output field distribution with the gauge potential φ after a period of evolution under single-site excitation (Time is 20). The total number of site N = 31. The field is incident from the middle A site of the structure (n = 16), the skin strength is fixed at h = 0.6, and the intensity of the field is normalized.

图 6  微环耦合特性示意图　(a) 一维环形谐振腔阵列演示传输矩阵法的原理示意图; (b) 利用连接环实现不同类型的耦合

Fig. 6.  Schematic diagram of microring coupling characteristics: (a) Schematic diagram of the 1D array of ring resonators to demonstrate the principle of the transmission matrix method; (b) implementation of different types of coupling using link rings.

图 7  耦合微环谐振腔阵列的趋肤效应模拟结果　(a) 菱形微环谐振腔阵列示意图; (b)—(g) 分别展示了规范势φ和用于引入增益损耗的折射率虚部大小γ取不同值时的模场强度空间分布(|E|²); (h) S21随φ的变化趋势

Fig. 7.  Simulation results based on coupled resonator arrays: (a) Geometry of non-Hermitian quasi 1D rhombic chain with ring resonator arrays; (b)–(g) the spatial intensity (|E|²) distributions of light with different values of gauge potential φ and the imaginary index γ used to introduce gain and loss; (h) the trend of S21 with φ.