图 1  干净晶格情况　(a) 一维非厄米十字晶格示意图; (b) $ U=1 $类非厄米十字晶格的CLS占据; (c) $ U=2 $类非厄米十字晶格的CLS占据; (d)开边界条件下, $ U=1 $类十字晶格色散带中所有本征态的密度分布$ \rho_n^{(l)} $. 这里的参数选取$ h=0.6 $, $ t=2 $, $ L=100 $

Fig. 1.  Crystalline case: (a) Schematic diagram of the one-dimensional non-Hermitian cross-stitch lattice; (b) CLS occupations of the $ U=1 $ class non-Hermitian cross-stitch lattice with $ A=1 $; (c) CLS occupations of the $ U=2 $ class non-Hermitian cross-stitch lattice with $ A=-1 $; (d) density distributions $ \rho_n^{(l)} $ for all the eigenstates in dispersive bands of the cross-stitch lattice under open bonudary conditions. Here, $ h=0.6 $, $ t=2 $, $ L=100 $

图 2  对称情况时, $ U=1 $ 类非厄米十字晶格的局域化性质　(a) $ \sigma_p $谱的分型维度$ D_2^{(l)} $随着能量实部$ {\rm{Re}}(E) $和无序强度$ \lambda $的变化, 颜色表示分形维度$ D_2^{(l)} $的大小. (b) $ \sigma_p $谱的能量虚部$ \ln{|{\rm{Im}}(E)|} $随着能量实部$ {\rm{Re}}(E) $和无序强度$ \lambda $的变化, 颜色表示$ \ln{|{\rm{Im}}(E)|} $的大小, 实线表示扩展-局域转变, $ \sigma_f $被省略, 边界用虚线表示. (c)$ \lambda=5 $时, $ \sigma_p $所对应的能谱. (d)$ \lambda=10 $时, $ \sigma_p $所对应的能谱. 这里$ L=1000 $

Fig. 2.  Symmetric case of the $ U=1 $ class non-Hermitian cross-stitch lattice: (a) Real part of the spectrum $ \sigma_p $ as a function of $ \lambda $, where the color denotes the value of the fractal dimension $ D_2^{(l)} $. (b) $ \ln{|{\rm{Im}}(E)|} $ of $ \sigma_p $ as a function of $ \lambda $ and $ {\rm{Re}}(E) $, where the color denotes the value of $ \ln{|{\rm{Im}}(E)|} $. Black solid lines represent the delocalization-localization transition. The spectrum $ \sigma_{f} $ is omitted, but its boundaries are indicated by black dashed lines. (c) Energy spectrum of $ \sigma_p $ with $ \lambda=5 $. (d) Energy spectrum of $ \sigma_p $ with $ \lambda=10 $. Here, $ L=1000 $.

图 3  反对称情况时, $ U=1 $ 类非厄米十字型晶格的局域化　(a)分型维度$ D_2^{(l)} $随着能量实部$ {\rm{Re}}(E) $和无序强度$ \lambda $的变化; (b)能量虚部$ \ln{|{\rm{Im}}(E)|} $随着能量实部$ {\rm{Re}}(E) $和无序强度$ \lambda $的变化. 实线表示迁移率边. 这里$ L=1000 $

Fig. 3.  Antisymmetric case of the $ U=1 $ class non-Hermitian cross-stitch lattice: (a) $D_2^{(l)} $ of the spectrum as a function of $ \lambda $, where the color denotes the value of the fractal dimension $ D_2^{(l)} $; (b) $ \ln{|{\rm{Im}}(E)|} $ of the spectrum as a function of $ \lambda $ and $ {\rm{Re}}(E) $, where the color denotes the value of $ \ln{|{\rm{Im}}(E)|} $. The black solid lines represent the mobility edges. Here, $ L=1000 $.

图 4  反对称情况时, $ U=2 $类非厄米十字晶格的局域化　(a)分型维度$ D_2^{(l)} $随着能量实部$ {\rm{Re}}(E) $和无序强度$ \lambda $的变化, 颜色表示分形维度$ D_2^{(l)} $的大小. (b)能量虚部$ \ln{|{\rm{Im}}(E)|} $随着能量实部$ {\rm{Re}}(E) $和无序强度$ \lambda $的变化, 颜色表示$ \ln{|{\rm{Im}}(E)|} $的大小, 实线表示多重分形-局域的转变, 这里$ L=1000 $. (c)多重分形区域的MIPR标度分析, 插图为局域区域的MIPR标度分析

Fig. 4.  Antisymmetric case of $ U=2 $ non-Hermitian cross-stitch lattice: (a) $D_2^{(l)} $ of the spectrum as a function of $ \lambda $ and Re(E), where the color denotes the value of the fractal dimension $ D_2^{(l)} $. (b) $ \ln{|{\rm{Im}}(E)|} $ of the spectrum as a function of $ \lambda $ and $ {\rm{Re}}(E) $, where the color denotes the value of $ \ln{|{\rm{Im}}(E)|} $. The black solid lines represent the multifractal-to-localized transition. Here, $ L=1000 $. (c) The MIPR scaling of multifractal regions for different $ \lambda $. The inset shows the MIPR scaling of localized regions for $ \lambda=10 $.