A New Perspective on the Average Mixing Matrix
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We consider the continuous-time quantum walk defined on the adjacency matrix of a graph. At each instant, the walk defines a mixing matrix which is doubly-stochastic. The average of the mixing matrices contains relevant information about the quantum walk and about the graph. We show that it is the matrix of transformation of the orthogonal projection onto the commutant algebra of the adjacency matrix, restricted to diagonal matrices. Using this formulation of the average mixing matrix, we find connections between its rank and automorphisms of the graph.
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Schur States, Average Mixing, and Counting Trees on Line Graphs' CTQW
For uniform commutative initial edge states in CTQW on the line graph, the weighted spanning tree count tn(G, 1/m) equals tn(G) divided by m to the power n-1.
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