ε-Uniform Mixing in Discrete Quantum Walks
Abstract
We study whether the probability distribution of a discrete quantum walk can get arbitrarily close to uniform, given that the walk starts with a uniform superposition of the outgoing arcs of some vertex. We establish a characterization of this phenomenon on regular non-bipartite graphs in terms of their adjacency eigenvalues and eigenprojections. Using theory from association schemes, we show this phenomenon happens on a strongly regular graph X if and only if X or X has parameters (4m2, 2m2 m, m2 m, m2 m) where m 2.
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