directed_laplacian_matrix#
- directed_laplacian_matrix(G, nodelist=None, weight='weight', walk_type=None, alpha=0.95)[source]#
Returns the directed Laplacian matrix of G.
The graph directed Laplacian is the matrix
\[L = I - (\Phi^{1/2} P \Phi^{-1/2} + \Phi^{-1/2} P^T \Phi^{1/2} ) / 2\]where
I
is the identity matrix,P
is the transition matrix of the graph, andPhi
a matrix with the Perron vector ofP
in the diagonal and zeros elsewhere [1].Depending on the value of walk_type,
P
can be the transition matrix induced by a random walk, a lazy random walk, or a random walk with teleportation (PageRank).- Parameters:
- GDiGraph
A NetworkX graph
- nodelistlist, optional
The rows and columns are ordered according to the nodes in nodelist. If nodelist is None, then the ordering is produced by G.nodes().
- weightstring or None, optional (default=’weight’)
The edge data key used to compute each value in the matrix. If None, then each edge has weight 1.
- walk_typestring or None, optional (default=None)
If None,
P
is selected depending on the properties of the graph. Otherwise is one of ‘random’, ‘lazy’, or ‘pagerank’- alphareal
(1 - alpha) is the teleportation probability used with pagerank
- Returns:
- LNumPy matrix
Normalized Laplacian of G.
See also
Notes
Only implemented for DiGraphs
References
[1]Fan Chung (2005). Laplacians and the Cheeger inequality for directed graphs. Annals of Combinatorics, 9(1), 2005