Quantum Walks on Embeddings
Combinatorics
2019-09-13 v4 Quantum Physics
Abstract
We introduce a new type of discrete quantum walks, called vertex-face walks, based on orientable embeddings. We first establish a spectral correspondence between the transition matrix and the vertex-face incidence structure. Using the incidence graph, we derive a formula for the principal logarithm of , and find conditions for its underlying digraph to be an oriented graph. In particular, we show this happens if the vertex-face incidence structure forms a partial geometric design. We also explore properties of vertex-face walks on the covers of a graph. Finally, we study a non-classical behavior of vertex-face walks.
Cite
@article{arxiv.1711.08831,
title = {Quantum Walks on Embeddings},
author = {Hanmeng Zhan},
journal= {arXiv preprint arXiv:1711.08831},
year = {2019}
}