English

Quillen-Segal objects and structures: an overview

Algebraic Topology 2014-07-01 v1 Algebraic Geometry Category Theory K-Theory and Homology

Abstract

Let M\mathscr{M} be a combinatorial and left proper model category, possibly with a monoidal structure. If O\mathscr{O} is either a monad on M\mathscr{M} or an operad enriched over M\mathscr{M}, define a QS-algebra in M\mathscr{M} to be a weak equivalence F:s(F)t(F)\mathscr{F}: s(\mathscr{F}) \xrightarrow{\sim}t(\mathscr{F}) such that the target t(F)t(\mathscr{F}) is an O\mathscr{O}-algebra in the usual sense. A classical O\mathscr{O}-algebra is a QS-algebra supported by an isomorphism F\mathscr{F}. A QS-structure F\mathscr{F} is also a weak equivalence such that t(F)t(\mathscr{F}) has a structure, e.g, Hodge, twistorial, schematic, sheaf, etc. We build a homotopy theory of these objects and compare it with that of usual O\mathscr{O}-algebras/structures. Our results rely on Smith's theorem on left Bousfield localization for combinatorial and left proper model categories. These ideas are derived from the theory of co-Segal algebras and categories.

Keywords

Cite

@article{arxiv.1406.7666,
  title  = {Quillen-Segal objects and structures: an overview},
  author = {Hugo V. Bacard},
  journal= {arXiv preprint arXiv:1406.7666},
  year   = {2014}
}

Comments

24 pages. First draft. Comments are always welcome. arXiv admin note: text overlap with arXiv:1406.1115

R2 v1 2026-06-22T04:51:04.384Z