English

Flexible sheaves

q-alg 2008-02-03 v2 alg-geom Algebraic Geometry Quantum Algebra

Abstract

We look at homotopy-coherent diagrams of spaces (after Segal, Leitch, Vogt, Mather, Cordier) over a Grothendieck site; we call these ``flexible presheaves''. After some preliminary materiel, we define the ``flexible sheaf'' condition. This descent condition (known to Thomason) is the same as what Jardine called being ``flasque'' with respect to the presheaves representable by objects in the site; and it is more recently known as the condition of being an nn-stack. We construct the flexible sheaf associated to a flexible presheaf in the nn-truncated case, as an application of a certain natural operation n+2n+2 times. We prove an analogue of Vogt's theorem for the case where the Grothendieck topology is nontrivial, identifying the set of morphisms in Illusie's derived category as the set of homotopy classes of homotopy-coherent morphisms between flexible sheaves. The homotopy-coherent point of view allows one easily to define the flexible mapping sheaf Hom(R,T)Hom (R,T) between two flexible sheaves. This revision fills major gaps in the bibliography. References to the additional items are inserted in the text. A new introduction and abstract are added (the old ones are retained as comments in the source file). A few other minor changes in the exposition include arrangement of internal references.

Keywords

Cite

@article{arxiv.q-alg/9608025,
  title  = {Flexible sheaves},
  author = {Carlos Simpson},
  journal= {arXiv preprint arXiv:q-alg/9608025},
  year   = {2008}
}

Comments

Improves bibliography: all definitions and many results were known from the '70's-'80's. Leaves most mathematical inadequacies untouched