The non-backtracking transition probability matrix and its usage for node clustering

Abstract: Relation between the real eigenvalues of the non-backtracking matrix and those of the non-backtracking Laplacian is considered with respect to node clustering. For this purpose we use the real eigenvalues of the transition probability matrix (when the random walk goes through the oriented edges with the rule of not going back in the next step'') which have a linear relation to those of the non-backtracking Laplacian of Jost,Mulas.Inflation--deflation'' techniques are also developed for clustering the nodes of the non-backtracking graph. With further processing, it leads to the clustering of the nodes of the original graph, which usually comes from a sparse stochastic block model of Bordenave,Decelle.