Graph Laplacian, (aka Laplace Matrix, Admittance Matrix, Kirchhoff Matrix, Discrete Laplacian, Laplace-Beltrami operator), is simply a matrix representation of a graph.
Laplacian Matrix can be computed as:
Where is Laplacian Matrix, is Degree Matrix and is Adjacency matrix.
Labelled graph
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Degree matrix
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Adjacency matrix
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Laplacian matrix
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Diagonalization of Laplacian
- The Laplacian of an undirected graph is symmetric as well as unitary.
- Using diagonalization: (where is a set of eigenvectors and is a diagonal matrix containing eigenvalues)
- Then OR
Normalized Laplacian
Random-walk Laplacian
Keywords
Laplacian Matrix, GNN, Laplace Matrix, Degree Matrix