Chris Godsil, Krystal Guo, Tor G. J. Myklebust
Published 2015-11-06Version 1
We study the transition matrix of a quantum walk on strongly regular graphs. It is proposed by Emms, Hancock, Severini and Wilson in 2006, that the spectrum of $S^+(U^3)$, a matrix based on the amplitudes of walks in the quantum walk, distinguishes strongly regular graphs. We probabilistically compute the spectrum of the line intersection graphs of two non-isomorphic generalized quadrangles of order $(5^2,5)$ under this matrix and thus provide strongly regular counter-examples to the conjecture.
Quantum Walks on Regular Graphs and Eigenvalues
Quantum walks defined by digraphs and generalized Hermitian adjacency matrices
A family of quantum walks on a finite graph corresponding to the generalized weighted zeta function
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