English

Prefactorization algebras of superselection sectors

Mathematical Physics 2026-04-29 v1 Algebraic Topology math.MP Quantum Algebra

Abstract

This paper revisits the theory of superselection sectors in algebraic quantum field theory from the modern perspective of prefactorization algebras. Under the standard assumptions of Haag duality and a locally faithful vacuum representation, it is shown that every AQFT defined over a filtered orthogonal category of spacetime regions, satisfying some mild additional geometric hypotheses, has an associated locally constant CC^\ast-categorical prefactorization algebra of superselection sectors over the same orthogonal category. In the case of double cones in the (n2)(n\geq 2)-dimensional Minkowski spacetime, our approach provides a conceptual explanation for the well-known En\mathbb{E}_n-monoidal structure on the CC^\ast-category of superselection sectors as the combination, through Dunn-Lurie additivity EnE1En1\mathbb{E}_n\simeq \mathbb{E}_1\otimes \mathbb{E}_{n-1}, of the familiar E1\mathbb{E}_1-monoidal structure from Haag duality and an En1\mathbb{E}_{n-1}-monoidal structure from Lorentzian geometry. A refinement of our results to equivariant contexts under a discrete group GG is also provided.

Keywords

Cite

@article{arxiv.2604.24865,
  title  = {Prefactorization algebras of superselection sectors},
  author = {Marco Benini and Victor Carmona and Alexander Schenkel},
  journal= {arXiv preprint arXiv:2604.24865},
  year   = {2026}
}

Comments

27 pages

R2 v1 2026-07-01T12:37:56.294Z