English

Frobenius structures in star-autonomous categories

Logic in Computer Science 2022-07-29 v1 Category Theory Logic

Abstract

It is known that the quantale of sup-preserving maps from a complete lattice to itself is a Frobenius quantale if and only if the lattice is completely distributive. Since completely distributive lattices are the nuclear objects in the autonomous category of complete lattices and sup-preserving maps, we study the above statement in a categorical setting. We introduce the notion of Frobenius structure in an arbitrary autonomous category, generalizing that of Frobenius quantale. We prove that the monoid of endomorphisms of a nuclear object has a Frobenius structure. If the environment category is star-autonomous and has epi-mono factorizations, a variant of this theorem allows to develop an abstract phase semantics and to generalise the previous statement. Conversely, we argue that, in a star-autonomous category where the monoidal unit is a dualizing object, if the monoid of endomorphisms of an object has a Frobenius structure and the monoidal unit embeds into this object as a retract, then the object is nuclear.

Cite

@article{arxiv.2207.13912,
  title  = {Frobenius structures in star-autonomous categories},
  author = {Luigi Santocanale and Cédric de Lacroix},
  journal= {arXiv preprint arXiv:2207.13912},
  year   = {2022}
}
R2 v1 2026-06-25T01:17:44.484Z