Physics – Quantum Physics
Scientific paper
2008-08-18
International Journal of Quantum Information 6(6):1135-1148, 2008.
Physics
Quantum Physics
13 pages, 4 figures
Scientific paper
We study continuous-time quantum walks on graphs which generalize the hypercube. The only known family of graphs whose quantum walk instantaneously mixes to uniform is the Hamming graphs with small arities. We show that quantum uniform mixing on the hypercube is robust under the addition of perfect matchings but not much else. Our specific results include: (1) The graph obtained by augmenting the hypercube with an additive matching is instantaneous uniform mixing whenever the parity of the matching is even, but with a slower mixing time. This strictly includes Moore-Russell's result on the hypercube. (2) The class of Hamming graphs is not uniform mixing if and only if its arity is greater than 5. This is a tight characterization of quantum uniform mixing on Hamming graphs; previously, only the status of arity less than 5 was known. (3) The bunkbed graph B(A[f]), defined by a hypercube-circulant matrix A and a Boolean function f, is not uniform mixing if the Fourier transform of f has small support. This explains why the hypercube is uniform mixing and why the join of two hypercubes is not.
Best Ana
Kliegl Markus
Mead-Gluchacki Shawn
Tamon Christino
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