# Optimizing vectorized code for graph adjacency

I am writing some Machine Learning code in MATLAB, and I am representing a graph with an adjacency matrix A, and a clustering of the graph with a matrix Z defined in the following ways.

A: a_ij is 1 if there is an edge between node i, and node j. 0 otherwise. Z: z_ij is 1 if node j is in cluster i. 0 otherwise.

I am computing a matrix N, which is the number of edges between clusters, defined in the following way:

N: n_ij is the number of edges between nodes in cluster i and nodes in cluster j. n_ii is the number of edges inside cluster i.

N can be computed by:

``````N = zAz'
``````

where z' is z-transposed.

If I have a lot of nodes, then computing this takes some time, but that is not the problem. The problem is, that I move the nodes from cluster to cluster a lot of times, and each time I want to compute N.

So the problem is the following: Given that I know N, and that I then move node i from cluster c_1 to cluster c_2, how can I update N in an efficient way?

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