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Local Modules in Braided Monoidal 2-Categories

Category Theory 2024-06-27 v1 Strongly Correlated Electrons High Energy Physics - Theory Quantum Algebra

Abstract

Given an algebra in a monoidal 2-category, one can construct a 2-category of right modules. Given a braided algebra in a braided monoidal 2-category, it is possible to refine the notion of right module to that of a local module. Under mild assumptions, we prove that the 2-category of local modules admits a braided monoidal structure. In addition, if the braided monoidal 2-category has duals, we go on to show that the 2-category of local modules also has duals. Furthermore, if it is a braided fusion 2-category, we establish that the 2-category of local modules is a braided multifusion 2-category. We examine various examples. For instance, working within the 2-category of 2-vector spaces, we find that the notion of local module recovers that of braided module 1-category. Finally, we examine the concept of a Lagrangian algebra, that is a braided algebra with trivial 2-category of local modules. In particular, we completely describe Lagrangian algebras in the Drinfeld centers of fusion 2-categories, and we discuss how this result is related to the classifications of topological boundaries of (3+1)d topological phases of matter.

Keywords

Cite

@article{arxiv.2307.02843,
  title  = {Local Modules in Braided Monoidal 2-Categories},
  author = {Thibault D. Décoppet and Hao Xu},
  journal= {arXiv preprint arXiv:2307.02843},
  year   = {2024}
}

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