Coins Make Quantum Walks Faster
Abstract
We show how to search N items arranged on a N×N grid in time O( N N), using a discrete time quantum walk. This result for the first time exhibits a significant difference between discrete time and continuous time walks without coin degrees of freedom, since it has been shown recently that such a continuous time walk needs time (N) to perform the same task. Our result furthermore improves on a previous bound for quantum local search by Aaronson and Ambainis. We generalize our result to 3 and more dimensions where the walk yields the optimal performance of O(N) and give several extensions of quantum walk search algorithms for general graphs. The coin-flip operation needs to be chosen judiciously: we show that another ``natural'' choice of coin gives a walk that takes (N) steps. We also show that in 2 dimensions it is sufficient to have a two-dimensional coin-space to achieve the time O(N N).
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