English

A Forward Quantum Markov Field on Graphs

Mathematical Physics 2020-04-15 v1 math.MP Representation Theory

Abstract

In this paper, we propose a class of quantum Markov fields QMF on a graphs G=(V,E)G= (V,E). The Markov structure of the considered QMF is investigated in the finer structure of a quasi-local algebrav AV\mathcal{A}_V of observables based over a graphs GG. Namely, the considered Markovian fields are infinite volume states defined through a generating couple (φ(0),(E{y}Ny))(\varphi^{(0)}, (\mathcal{E}_{\{y\}\cup N_y})) of a product state φ(0)\varphi^{(0)} on AV\mathcal{A}_V and a family of local transition expectations E{y}Ny\mathcal{E}_{\{y\}\cup N_y} based on a vertex yy and the set of it nearest-neighbors. The main result of the paper concerns the existence and the uniqueness of QMF associated with a couple (φ(0),(E{y}Ny))(\varphi^{(0)}, (\mathcal{E}_{\{y\}\cup N_y})) for on an important class of graphs including trees strictly.

Keywords

Cite

@article{arxiv.2004.06641,
  title  = {A Forward Quantum Markov Field on Graphs},
  author = {Abdessatar Souissi},
  journal= {arXiv preprint arXiv:2004.06641},
  year   = {2020}
}
R2 v1 2026-06-23T14:51:06.623Z