Add to ORKGWe prove a general version of Quillen’s Theorem B, for actions of simplicial categories, in an arbitrary left Bousfield localization of the homotopy theory of simplicial presheaves over a site. As special cases, we recover a version of the group completion theorem in this general context, as well a version of Puppe’s theorem on the stability of homotopy colimits in an ∞ –topos, due to Rezk
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
We prove a general version of Quillen’s Theorem B, for actions of simplicial categories, in an arbit...
We prove a general version of Quillen’s Theorem B, for actions of simplicial categories, in an arbit...
We prove a general version of Quillen’s Theorem B, for actions of simplicial categories, in an arbit...
We describe left and right Bousfield localisations along Quillen adjunctions of two variables. These...
In a previous work, by extending the classical Quillen construction to the non‐simply connected case...
AbstractWe show that any closed model category of simplicial algebras over an algebraic theory is Qu...
AbstractWe consider the commutation of R∞, the Bousfield–Kan R-completion functor, with homotopy (in...
We extend the theory of Quillen adjunctions by combining ideas of homotopical algebra and of enriche...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
This thesis presents several complete and partial models for the homotopy theory of monoids and the ...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
this paper, and in particular by applying Theorem 3.9 below. In the case corresponding to the identi...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
We prove a general version of Quillen’s Theorem B, for actions of simplicial categories, in an arbit...
We prove a general version of Quillen’s Theorem B, for actions of simplicial categories, in an arbit...
We prove a general version of Quillen’s Theorem B, for actions of simplicial categories, in an arbit...
We describe left and right Bousfield localisations along Quillen adjunctions of two variables. These...
In a previous work, by extending the classical Quillen construction to the non‐simply connected case...
AbstractWe show that any closed model category of simplicial algebras over an algebraic theory is Qu...
AbstractWe consider the commutation of R∞, the Bousfield–Kan R-completion functor, with homotopy (in...
We extend the theory of Quillen adjunctions by combining ideas of homotopical algebra and of enriche...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
This thesis presents several complete and partial models for the homotopy theory of monoids and the ...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
this paper, and in particular by applying Theorem 3.9 below. In the case corresponding to the identi...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
We construct cellular homotopy theories for categories of simplicial presheaves on small Grothendiec...
.png%3Fwidth%3D300&w=3840&q=75)