English

On $\mathbf {Cat}$-valued sheaves

Category Theory 2016-02-17 v3

Abstract

Let O~(B){\widetilde {\mathcal O}}(\mathbf B) be the category of (open) subcategories of a topological groupoid B.{\mathbf B}. This paper concerns with the Cat{\mathbf {Cat}}-valued sheaves over category O~(B).{\widetilde {\mathcal O}}(\mathbf B). Since Cat{\mathbf {Cat}} is not a concrete category, traditional definition of presheaf can not deal with the situation. [13] proposes a new framework for the purpose. Starting from the definition given in [13], we build-up the frame work for Cat{\mathbf {Cat}}-valued sheaves. For that purpose we introduce a notion of categorical union, such that categorical union of subcategories is a subcategory, which is required for a meaningful definition of a categorical cover of a topological category. The main result is the following. For a fixed category C,\mathbf C, the categories of local functorial sections from B\mathbf B to C\mathbf C define a Cat{\mathbf {Cat}}-valued sheaf on O~(B).{\widetilde {\mathcal O}}(\mathbf B). Replacing C\mathbf C with a categorical group G,\mathcal G, we find a CatGrp{\mathbf {CatGrp}}-valued sheaf on O~(B).{\widetilde {\mathcal O}}(\mathbf B).

Keywords

Cite

@article{arxiv.1602.01053,
  title  = {On $\mathbf {Cat}$-valued sheaves},
  author = {Saikat Chatterjee},
  journal= {arXiv preprint arXiv:1602.01053},
  year   = {2016}
}

Comments

43 pages, 5 figures; Previous article has been divided into two parts. This is the second part

R2 v1 2026-06-22T12:42:14.794Z