图 1  (a) 锯齿型石墨烯p-n结示意图, 红色格点表示在这些格点上耦合了虚拟导线, 图中$ D=4, N=12, L=11, M=3 $; (b), (c) 不同无序强度W下电导G随着$ {E}_{\mathrm{R}} $的变化曲线. 当$ \mathrm{W}\ne 0 $时, 无序构型平均取$ 2000 $次. 图(b)中$ {E}_{\mathrm{L}}=-0.1 $($ {\nu }_{\mathrm{L}}=1 $), 图(c)中$ {E}_{\mathrm{L}}=-0.2 $($ {\nu }_{\mathrm{L}}=3 $)

Fig. 1.  (a) Schematic diagram for a zigzag graphene p-n junction. The red sites indicate that virtual leads are coupled to these sites, and $ D=4, N=12, L=11, M=3 $ in this diagram. (b), (c) The conductance G vs. $ {E}_{\mathrm{R}} $ for different disorder strengths W. Here the conductance is averaged up to 2000 configurations when $ W\ne 0 $. The parameters $ {E}_{\mathrm{L}}=-0.1 $ ($ {\nu }_{\mathrm{L}}=1 $) in panel (b), $ {E}_{\mathrm{L}}=-0.2 $ ($ {\nu }_{\mathrm{L}}=3 $) in panel (c).

图 2  局域热产生$ {Q}_{\mathrm{L}} $随着格点位置坐标$ (x, y) $的变化, 带箭头的黑色实线代表手性边缘态的数目和传播方向. 符号■, ▲, ◆, ●, ★标记的位置分别是$ (10,  10) $, $ \left(\mathrm{46, 10}\right) $, $ \left(\mathrm{46, 100}\right) $, $ \left(\mathrm{46, 190}\right) $, $ \left(\mathrm{10, 190}\right) $, 在图4中将给出这些位置上的电子能量分布. $ \left({E}_{\mathrm{L}}, {E}_{\mathrm{R}}\right) $=$ (-0.1, -0.1) $ (a)$ , (-0.2, -0.1) $ (b), $ (-\mathrm{0.1, 0.1}) $ (c), $ (-\mathrm{0.2, 0.2}) $ (d), 分别对应左右填充因子$ ({\nu }_{\mathrm{L}}, {\nu }_{\mathrm{R}})=\left(\mathrm{1, 1}\right) $ (a), $ \left(\mathrm{3, 1}\right) $ (b), $ (1, -1) $ (c), $ (3, -3) $ (d)

Fig. 2.  Local heat generation $ {Q}_{\mathrm{L}} $ vs. lattice position $ (x, y) $, the black solid lines with arrows represent the number and propagation direction of the chiral edge states. Positions marked by symbols ■, ▲, ◆, ●, ★ are, respectively, $ \left(\mathrm{10, 10}\right) $, $ \left(\mathrm{46, 10}\right) $, $ \left(\mathrm{46, 100}\right) $, $ \left(\mathrm{46, 190}\right) $, $ \left(\mathrm{10, 190}\right) $, and energy distribution of electrons at these positions will be shown in Fig. 4. $ \left({E}_{\mathrm{L}}, {E}_{\mathrm{R}}\right)=(-0.1, -0.1) $ (a), $ (-0.2, -0.1) $ (b), $ (-\mathrm{0.1, 0.1}) $ (c), $ (-\mathrm{0.2, 0.2}) $ (d), which correspond to the left and right filling factors $ ({\nu }_{\mathrm{L}}, {\nu }_{\mathrm{R}})=\left(\mathrm{1, 1}\right) $ (a), $ \left(\mathrm{3, 1}\right) $ (b), $ (1, -1) $ (c), and $ (3, -3) $ (d), respectively.

图 3  局域热产生$ {Q}_{\mathrm{L}} $随着格点位置坐标$ (x, y) $的变化, 带箭头的黑色实线代表手性边缘态的数目和传播方向. 符号■, ▲, ◆, ●, ★标记的位置分别是$ \left(\mathrm{10, 10}\right) $, $ \left(\mathrm{46, 10}\right) $, $ \left(\mathrm{46, 100}\right) $, $ \left(\mathrm{46, 190}\right) $, $ \left(\mathrm{10, 190}\right) $, 在图4中将给出这些位置上的电子能量分布. (a), (b) $ \left({E}_{\mathrm{L}}, {E}_{\mathrm{R}}\right)=(-0.2, -0.1) $; $ \left(\mathrm{c}\right), \left(\mathrm{d}\right) $ $ \left({E}_{\mathrm{L}}, {E}_{\mathrm{R}}\right)= (-\mathrm{0.1, 0.1}) $. (a), (c) 无序强度$ W=1 $; (b), (d) 无序强度$ W= $2. 无序构型平均取$ 400 $次

Fig. 3.  Local heat generation $ {Q}_{\mathrm{L}} $ vs. lattice position $ (x, y) $, the black solid lines with arrows represent the number and propagation direction of the chiral edge states. Positions marked by symbols ■, ▲, ◆, ●, ★ are $ \left(\mathrm{10, 10}\right) $, $ \left(\mathrm{46, 10}\right) $, $ \left(\mathrm{46, 100}\right) $, $ \left(\mathrm{46, 190}\right) $, $ \left(\mathrm{10, 190}\right) $, respectively, and energy distribution of electrons at these positions will be shown in Fig. 4. (a), (b) $\left({E}_{\mathrm{L}}, {E}_{\mathrm{R}}\right)= $$ (-0.2, -0.1)$; (c), (d) $ \left({E}_{\mathrm{L}}, {E}_{\mathrm{R}}\right)=(-\mathrm{0.1, 0.1}) $. (a), (c) Disorder strength $ W=1 $; (b) (d)$ W= $2. Here the local heat generation is averaged up to 400 configurations.

图 4  不同位置处的分布函数F随着能量E的变化, 符号■, ▲, ◆, ●, ★对应图2和图3中标记的位置. (a), (b) $\left({E}_{\mathrm{L}}, {E}_{\mathrm{R}}\right)= $$ (-0.2, -0.1)$; (c), (d) $ (-\mathrm{0.1, 0.1}) $. (a), (c) 无序强度$ W=0 $; (b), (d) $ W=1 $. 当$ \mathrm{W}\ne 0 $时, 无序构型平均取$ 400 $次

Fig. 4.  Distribution function F vs. energy E for different positions, the symbols ■, ▲, ◆, ●, ★ correspond to positions marked in Fig. 2 and Fig. 3. (a), (b) $ \left({E}_{\mathrm{L}}, {E}_{\mathrm{R}}\right)=(-0.2, -0.1) $; (c), (d) $ \left({E}_{\mathrm{L}}, {E}_{\mathrm{R}}\right)=(-\mathrm{0.1, 0.1}) $. (a), (c) Disorder strength $ W=0 $; (b), (d) $ W= $1. Here distribution function F is averaged up to 400 configurations when $ W\ne 0 $.