English

From Coherent Structures to Universal Properties

Category Theory 2007-05-23 v1

Abstract

Given a 2-category \twocatK\twocat{K} admitting a calculus of bimodules, and a 2-monad T on it compatible with such calculus, we construct a 2-category \twocatL\twocat{L} with a 2-monad S on it such that: (1)S has the adjoint-pseudo-algebra property. (2)The 2-categories of pseudo-algebras of S and T are equivalent. Thus, coherent structures (pseudo-T-algebras) are transformed into universally characterised ones (adjoint-pseudo-S-algebras). The 2-category \twocatL\twocat{L} consists of lax algebras for the pseudo-monad induced by T on the bicategory of bimodules of \twocatK\twocat{K}. We give an intrinsic characterisation of pseudo-S-algebras in terms of representability. Two major consequences of the above transformation are the classifications of lax and strong morphisms, with the attendant coherence result for pseudo-algebras. We apply the theory in the context of internal categories and examine monoidal and monoidal globular categories (including their monoid classifiers) as well as pseudo-functors into \Cat\Cat.

Keywords

Cite

@article{arxiv.math/0006161,
  title  = {From Coherent Structures to Universal Properties},
  author = {Claudio Hermida},
  journal= {arXiv preprint arXiv:math/0006161},
  year   = {2007}
}

Comments

to appear in Journal of Pure and Applied Algebra