English

Finding paths with quantum walks or quantum walking through a maze

Quantum Physics 2017-09-19 v2

Abstract

We show that it is possible to use a quantum walk to find a path from one marked vertex to another. In the specific case of MM stars connected in a chain, one can find the path from the first star to the last one in O(MN)O(M\sqrt{N}) steps, where NN is the number of spokes of each star. First we provide an analytical result showing that by starting in a phase-modulated highly superposed initial state we can find the path in O(MNlogM)O(M\sqrt{N}\log M) steps. Next, we improve this efficiency by showing that the recovery of the path can also be performed by a series of successive searches when we start at the last known position and search for the next connection in O(N)O(\sqrt{N}) steps leading to the overall efficiency of O(MN)O(M\sqrt{N}). For this result we use the analytical solution that can be obtained for a ring of stars of double the length of the chain.

Cite

@article{arxiv.1707.01581,
  title  = {Finding paths with quantum walks or quantum walking through a maze},
  author = {Daniel Reitzner and Mark Hillery and Daniel Koch},
  journal= {arXiv preprint arXiv:1707.01581},
  year   = {2017}
}

Comments

10 pages, 3 figures, this version contains updated parts and added Appendices

R2 v1 2026-06-22T20:39:08.359Z