Higher-Dimensional Open Quantum Walk Constructed from Quantum Bernoulli Noises
Abstract
Quantum Bernoulli noises are annihilation and creation operators acting on Bernoulli functionals, which satisfy the canonical anti-commutation relations (CAR) in equal-time. In this paper, we use quantum Bernoulli noises to introduce a model of open quantum walk on the -dimensional integer lattice for a general positive integer , which we call the -dimensional open QBN walk. We obtain a quantum channel representation of the -dimensional open QBN walk, and find that it admits the ``separability-preserving'' property. We prove that, for a wide range of choices of its initial state, the -dimensional open QBN walk has a limit probability distribution of -dimensional Gauss type. Finally we unveil links between the -dimensional open QBN walk and the unitary quantum walk recently introduced in [Ce Wang and Caishi Wang, Higher-dimensional quantum walk in terms of quantum Bernoulli noises, Entropy 2020, 22, 504].
Keywords
Cite
@article{arxiv.2006.08090,
title = {Higher-Dimensional Open Quantum Walk Constructed from Quantum Bernoulli Noises},
author = {Ce Wang},
journal= {arXiv preprint arXiv:2006.08090},
year = {2020}
}