English

Decorated Corelations

Category Theory 2017-03-30 v1 Logic in Computer Science

Abstract

Let C\mathcal C be a category with finite colimits, and let (E,M)(\mathcal E,\mathcal M) be a factorisation system on C\mathcal C with M\mathcal M stable under pushouts. Writing C;Mop\mathcal C;\mathcal M^{\mathrm{op}} for the symmetric monoidal category with morphisms cospans of the form cm\stackrel{c}\to \stackrel{m}\leftarrow, where cCc \in \mathcal C and mMm \in \mathcal M, we give method for constructing a category from a symmetric lax monoidal functor F ⁣:(C;Mop,+)(Set,×)F\colon (\mathcal C; \mathcal M^{\mathrm{op}},+) \to (\mathrm{Set},\times). A morphism in this category, termed a \emph{decorated corelation}, comprises (i) a cospan XNYX \to N \leftarrow Y in C\mathcal C such that the canonical copairing X+YNX+Y \to N lies in E\mathcal E, together with (ii) an element of FNFN. Functors between decorated corelation categories can be constructed from natural transformations between the decorating functors FF. This provides a general method for constructing hypergraph categories---symmetric monoidal categories in which each object is a special commutative Frobenius monoid in a coherent way---and their functors. Such categories are useful for modelling network languages, for example circuit diagrams, and such functors their semantics.

Keywords

Cite

@article{arxiv.1703.09888,
  title  = {Decorated Corelations},
  author = {Brendan Fong},
  journal= {arXiv preprint arXiv:1703.09888},
  year   = {2017}
}

Comments

35 pages

R2 v1 2026-06-22T19:00:23.189Z