Add to ORKGWe describe a model structure for coloured operads with values in the category of symmetric spectra (with the positive model structure), in which fibrations and weak equivalences are defined at the level of the underlying collections. This allows us to treat R-module spectra (where R is a cofibrant ring spectrum) as algebras over a cofibrant spectrum-valued operad with R as its first term. Using this model structure, we give sufficient conditions for homotopical localizations in the category of symmetric spectra to preserve module structures
We introduce the symmetricity notions of symmetric hmonoidality, symmetroidality, and symmetric flat...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
We prove that every stable, combinatorial model category has a natural enrichment by symmet...
We establish a highly flexible condition that guarantees that all colored symmetric operads in a sym...
We establish a highly flexible condition that guarantees that all colored symmetric operads in a sym...
This paper sets up the foundations for derived algebraic geometry, Goerss-Hopkins obstruction theory...
We show that for the underlying positive model structure on symmet-ric spectra one obtains cofibranc...
This paper sets up the foundations for derived algebraic geometry, Goerss-Hopkins obstruction theory...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
Abstract. We prove that, under certain conditions, the model structure on a monoidal model category ...
We construct the stable positive admissible model structure on symmetric spectra with values in an a...
We provide general conditions under which the algebras for a coloured operad in a monoidal model ca...
Operads parametrize simple and complicated algebraic structures and naturally arise in several areas...
We introduce the symmetricity notions of symmetric hmonoidality, symmetroidality, and symmetric flat...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
We prove that every stable, combinatorial model category has a natural enrichment by symmet...
We establish a highly flexible condition that guarantees that all colored symmetric operads in a sym...
We establish a highly flexible condition that guarantees that all colored symmetric operads in a sym...
This paper sets up the foundations for derived algebraic geometry, Goerss-Hopkins obstruction theory...
We show that for the underlying positive model structure on symmet-ric spectra one obtains cofibranc...
This paper sets up the foundations for derived algebraic geometry, Goerss-Hopkins obstruction theory...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
Abstract. We prove that, under certain conditions, the model structure on a monoidal model category ...
We construct the stable positive admissible model structure on symmetric spectra with values in an a...
We provide general conditions under which the algebras for a coloured operad in a monoidal model ca...
Operads parametrize simple and complicated algebraic structures and naturally arise in several areas...
We introduce the symmetricity notions of symmetric hmonoidality, symmetroidality, and symmetric flat...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
We prove that every stable, combinatorial model category has a natural enrichment by symmet...