Quillen-Segal objects and structures: an overview

Abstract

Let M be a combinatorial and left proper model category, possibly with a monoidal structure. If O is either a monad on M or an operad enriched over M, define a QS-algebra in M to be a weak equivalence F: s(F) t(F) such that the target t(F) is an O-algebra in the usual sense. A classical O-algebra is a QS-algebra supported by an isomorphism F. A QS-structure F is also a weak equivalence such that t(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-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.