The study of Laplacian matrix is important for graphs 'study because we can estimate many invariants of g, such as connectedness, diameter, bandwidth.
拉普拉斯矩阵对研究图论之所以重要,是因为可以用其特征值来估计图的诸多不变量,如连通度、直径、带宽等等。
The study of Laplacian matrix is important for graphs 'study because we can estimate many invariants of g, such as connectedness, diameter, bandwidth.
拉普拉斯矩阵对研究图论之所以重要,是因为可以用其特征值来估计图的诸多不变量,如连通度、直径、带宽等等。
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