English

Absorption Probabilities of Quantum Walks

Quantum Physics 2019-05-13 v1

Abstract

Quantum walks are known to have nontrivial interaction with absorbing boundaries. In particular, Ambainis et.\ al.\ \cite{ambainis01} showed that in the (Z,C1,H)(\Z ,C_1,H) quantum walk (one-dimensional Hadamard walk) an absorbing boundary partially reflects information. These authors also conjectured that the left absorption probabilities Pn(1)(1,0)P_n^{(1)}(1,0) related to the finite absorbing Hadamard walks (Z,C1,H,{0,n})(\Z ,C_1,H,\{ 0,n\} ) satisfy a linear fractional recurrence in nn (here Pn(1,0)P_n(1,0) is the probability that a Hadamard walk particle initialized in 1R|1\rangle |R\rangle is eventually absorbed at 0|0\rangle and not at n|n\rangle). This result, as well as a third order linear recurrence in initial position mm of Pn(m)(1,0)P_n^{(m)}(1,0), was later proved by Bach and Borisov \cite{bach09} using techniques from complex analysis. In this paper we extend these results to general two state quantum walks and three-state Grover walks, while providing a partial calculation for absorption in dd-dimensional Grover walks by a d1d-1-dimensional wall. In the one-dimensional cases, we prove partial reflection of information, a linear fractional recurrence in lattice size, and a linear recurrence in initial position.

Keywords

Cite

@article{arxiv.1905.04239,
  title  = {Absorption Probabilities of Quantum Walks},
  author = {Parker Kuklinski and Mark Kon},
  journal= {arXiv preprint arXiv:1905.04239},
  year   = {2019}
}
R2 v1 2026-06-23T09:03:03.034Z