Add to ORKGIt is known by results of Dyckerhoff–Kapranov and of Gálvez-Carrillo–Kock–Tonks that the output of the Waldhausen S • -construction has a unital 2-Segal structure. Here, we prove that a certain S • -functor defines an equivalence between the category of augmented stable double categories and the category of unital 2-Segal sets. The inverse equivalence is described explicitly by a path construction. We illustrate the equivalence for the known examples of partial monoids, cobordism categories with genus constraints and graph coalgebras
We show that a localized version of the 2-category of all categories with an action of a reductive g...
Abstract. The natural transformation Ξ from L–theory to the Tate cohomology of Z/2 acting on K–theor...
In this thesis we analyze 2-dimensional open topological field theories in both 1-categorical and ∞-...
This monograph initiates a theory of new categorical structures that generalize the simplicial Segal...
This thesis contains three chapters, each dealing with one particular aspect of the theory of higher...
We show that the 2-Segal spaces (also called decomposition spaces) of Dyckerhoff-Kapranov and G\'alv...
Topological field theory (TFT) is the study of representations of the cobordism category of manifold...
Abstract. We develop a theory of Spanier–Whitehead duality in categories with cofibrations and weak ...
Let M be a monoidal model category that is also combinatorial and left proper. If O is a monad, oper...
Abstract. Two constructions of paths in double categories are studied, providing algebraic versions ...
AbstractA construction for Segal operations for K-theory of categories with cofibrations, weak equiv...
This PhD thesis consists in a collection of three papers on Koszul duality of categories and on an a...
We show that Segal spaces, and more generally category objects in an -category , can be identified w...
We construct Quillen equivalences between the model categories of monoids (rings), modules and algeb...
International audienceWe establish a Quillen equivalence relating the homotopy theory of Segal opera...
We show that a localized version of the 2-category of all categories with an action of a reductive g...
Abstract. The natural transformation Ξ from L–theory to the Tate cohomology of Z/2 acting on K–theor...
In this thesis we analyze 2-dimensional open topological field theories in both 1-categorical and ∞-...
This monograph initiates a theory of new categorical structures that generalize the simplicial Segal...
This thesis contains three chapters, each dealing with one particular aspect of the theory of higher...
We show that the 2-Segal spaces (also called decomposition spaces) of Dyckerhoff-Kapranov and G\'alv...
Topological field theory (TFT) is the study of representations of the cobordism category of manifold...
Abstract. We develop a theory of Spanier–Whitehead duality in categories with cofibrations and weak ...
Let M be a monoidal model category that is also combinatorial and left proper. If O is a monad, oper...
Abstract. Two constructions of paths in double categories are studied, providing algebraic versions ...
AbstractA construction for Segal operations for K-theory of categories with cofibrations, weak equiv...
This PhD thesis consists in a collection of three papers on Koszul duality of categories and on an a...
We show that Segal spaces, and more generally category objects in an -category , can be identified w...
We construct Quillen equivalences between the model categories of monoids (rings), modules and algeb...
International audienceWe establish a Quillen equivalence relating the homotopy theory of Segal opera...
We show that a localized version of the 2-category of all categories with an action of a reductive g...
Abstract. The natural transformation Ξ from L–theory to the Tate cohomology of Z/2 acting on K–theor...
In this thesis we analyze 2-dimensional open topological field theories in both 1-categorical and ∞-...