图 1  坐标空间中高斯波包线性干涉图样　(a)$ xz $空间两个波包干涉随时间演化; (b)波包中心($ z = 0 $) 处波函数密度对时间演化.宽度为a、振幅为S, $ t = 0 $时刻位于$ (0, 0) $处具有相反x方向动量$\pm k\hat{{\boldsymbol{e}}}_x$的高斯波包. 实际参数$S = a = 1, k = 5 $

Fig. 1.  Linear interference of two Gaussian wave packets in position space: (a) Time evolution of Gaussian wave packet interference in $ xz $-space; (b) density plot of wave packet center($ z = 0 $) vs. time t. The wave packets of width a and amplitude S start at $ (0, 0) $ with opposite momentum $\pm k\hat{{\boldsymbol{e}}}_x$ in x-direction. The actual parameters are $S = a = 1, k = 5 $.

图 2  坐标空间中孤子非线性干涉图样　(a)$ xz $ 空间两个孤子干涉随时间演化； (b)孤子中心($ z = 0 $) 处波函数密度对时间演化. 两个具有相反方向速度$ b_1, b_2 $的完全相同的孤子. 实际参数为$ a_1 = 1, b_1 = 5, g = 1, a_2 = 1, b_2 = -5, c_1 = d_1 = c_2 = d_2 = 0 $, 及$ S= 1, a = 1 $

Fig. 2.  Nonlinear Interference of two solitons in position space: (a) Time evolution of soliton interference in $ xz $-space; (b) density plot of soliton center ($ z = 0 $) vs. time t. Two identical solitons with opposite velocity $ b_1, b_2 $. The actual parameters are $ a_1 = 1, b_1 = 5, g = 1, a_2 = 1, b_2 = -5, c_1 = d_1 = c_2 = d_2 = 0 $, and $ S = 1, a = 1 $.

图 3  $ t = 0.2 $时刻波函数相对相位导数$ \text{d}\phi/\text{d}x $重构、磁单极分布及产生的矢势A　(a) $ t = 0.2 $时刻, 波函数相对相位导数$ \text{d}\phi/\text{d}x $解析解与利用磁单极重构解, 黑色实线为解析解, 红色虚线为磁单极重构解; (b)$ t = 0.2 $时刻复平面上磁单极分布及对应的矢势A, $ \odot, \otimes $分别表示$\mu=\pm\dfrac{1}{2}$的两类磁单极, $ \text{Re}[z], \text{Im}[z] $分别表示实部虚部. 实际参数同图1

Fig. 3.  Derivative of relative phase function $ \text{d}\phi/\text{d}x $, Dirac magnetic monopole distribution and corresponding vector potential A at time $ t = 0.2 $: (a) Analytic solution and reconstruction using magnetic monopoles of phase function derivative $ \text{d}\phi/\text{d}x $ at time $ t = 0.2 $, analytic solution(black solid line), construct using magnetic monopole(red dash line); (b) magnetic monopole distribution and corresponding vector potential A on complex plane at time $ t = 0.2 $, $ \odot, \otimes $ denotes monopoles with $\mu=\pm\dfrac{1}{2}$ and $ \text{Re}[z], \text{Im}[z] $ real part, imaginary part respectively. The actual parameters are same as Fig. 1.

图 4  复平面上磁单极分布及相应矢势A随时间演化, $ \odot, \otimes $分别表示$\mu=\pm\dfrac{1}{2}$ 的两类磁单极, $ \text{Re}[{\cal{Z}}], \text{Im}[{\cal{Z}}] $ 分别表示实部虚部. 实际参数同图1

Fig. 4.  Time evolution of Magnetic monopole distribution and corresponding vector potential A on complex plane, $ \odot, \otimes $ denotes monopoles with $\mu=\pm\dfrac{1}{2}$ and $ \text{Re}[{\cal{Z}}], \text{Im}[{\cal{Z}}] $ real part, imaginary part respectively. The actual parameters are same as Fig. 1.

图 5  $ t = 0.05 $时刻波函数相对相位导数$ \text{d}\phi/\text{d}x $重构、磁单极分布及产生的矢势A　(a)$ t = 0.2 $时刻, 波函数相对相位导数$ \text{d}\phi/\text{d}x $解析解与利用磁单极重构解, 黑色实线为解析解, 红色虚线为磁单极重构解; (b)$ t = 0.2 $时刻复平面上磁单极分布及对应的矢势A, $ \odot, \otimes $分别表示$\mu=\pm\dfrac{1}{2}$的两类磁单极, $ \text{Re}[{\cal{Z}}], \text{Im}[{\cal{Z}}] $ 分别表示实部虚部. 实际参数同图2

Fig. 5.  Derivative of relative phase function $ \text{d}\phi/\text{d}x $, Dirac magnetic monopole distribution and corresponding vector potential A at time $ t = 0.05 $: (a) Analytic solution and reconstruction using magnetic monopoles of phase function derivative $ \text{d}\phi/\text{d}x $at time $ t = 0.2 $, analytic solution(black solid line), construct using magnetic monopole(red dash line); (b) magnetic monopole distribution and corresponding vector potential A on complex plane at time $ t = 0.2 $, $ \odot, \otimes $ denotes monopoles with $\mu=\pm\dfrac{1}{2}$ and $ \text{Re}[{\cal{Z}}], \text{Im}[{\cal{Z}}] $ real part, imaginary part respectively. The actual parameters are same as Fig. 2.

图 6  复平面上磁单极分布及相应矢势A随时间演化. $ \odot, \otimes $分别表示$\mu=\pm\dfrac{1}{2}$ 的两类磁单极, $ \text{Re}[{\cal{Z}}], \text{Im}[{\cal{Z}}] $ 分别表示实部虚部. 实际参数同图2

Fig. 6.  Time evolution of magnetic monopole distribution and corresponding vector potential A on complex plane, $ \odot, \otimes $ denotes monopoles with $\mu=\pm\dfrac{1}{2}$ and $ \text{Re}[{\cal{Z}}], \text{Im}[{\cal{Z}}] $ real part, imaginary part respectively. The actual parameters are same as Fig. 2.

图 7  完全碰撞时刻波函数相位$ \pm\pi $ 跃变与密度零点　(a)高斯波包线性干涉$ t = 0 $时刻波函数相位与密度零点; (b)双孤子非线性干涉$ t = 0 $时刻波函数相位与密度零点. 线性干涉与非线性干涉情形实际参数分别同图1和图2

Fig. 7.  $ \pm\pi $ jump of phase function and zeros of density at complete collision time ($ t = 0 $): (a) Phase jump and density zeros of Gaussian wave packet linear interference at time $ t = 0 $; (b) phase jump and density zeros of double soliton nonlinear interference at time $ t = 0 $. The actual parameters for linear and nonlinear case are same as Fig. 1 and Fig. 2, respectively.