Add to ORKGThe notion of an algebraic theory, which is able to describe many algebraic structures, has been used extensively since itsintroduction by Lawvere in 1963. This perspective has been very fruitful for understanding in a wide variety of algebraicstructures, including rigidification results for simplicial algebras over algebraic theories by Badzioch and Bergner. Inthis thesis, we extend the rigidification results to algebras over a larger class of categories, which includes bisimplicialsets. In particular, we prove the rigidification result is true in any diagram category $\SSets^{\mathcal{C}^{op}}$ for a small category $\mathcal{C}$
In this article we prove that the numerical Grothendieck group of every smooth proper dg category is...
Badzioch showed that in the category of simplicial sets each homotopy algebra of a Lawvere theory is...
Abstract. In this short note we show that E ∞ quasi-categories can be re-placed by strictly commutat...
The notion of an algebraic theory, which is able to describe many algebraic structures, has been use...
Algebraic theories, introduced as a concept in the 1960s, have been a fundamental step towards a cat...
In this talk I will explain how the use of functors defined on the category \(I\) of finite sets and...
Introduction Let D be a small category. Suppose that ¯ X is a D-diagram in the homotopy category (i...
We construct a cubical analogue of the rigidification functor from quasi-categories to simplicial ca...
The deformations of an infinite dimensional algebra may be controlled not just by its own cohomology...
AbstractWe show that any closed model category of simplicial algebras over an algebraic theory is Qu...
Abstract. Alas, the motivating examples of algebraically compact categories are not algebraically co...
AbstractThe recollement approach to the representation theory of sequences of algebras is extended t...
Badzioch showed that in the category of simplicial sets each homotopy algebra of a Lawvere theory is...
SummaryThis notes describes an obstruction theory for the category SO-Cat of simplicial categories w...
Schwede S. Stable homotopy of algebraic theories. Ergänzungsreihe / Universität Bielefeld, Sonderfor...
In this article we prove that the numerical Grothendieck group of every smooth proper dg category is...
Badzioch showed that in the category of simplicial sets each homotopy algebra of a Lawvere theory is...
Abstract. In this short note we show that E ∞ quasi-categories can be re-placed by strictly commutat...
The notion of an algebraic theory, which is able to describe many algebraic structures, has been use...
Algebraic theories, introduced as a concept in the 1960s, have been a fundamental step towards a cat...
In this talk I will explain how the use of functors defined on the category \(I\) of finite sets and...
Introduction Let D be a small category. Suppose that ¯ X is a D-diagram in the homotopy category (i...
We construct a cubical analogue of the rigidification functor from quasi-categories to simplicial ca...
The deformations of an infinite dimensional algebra may be controlled not just by its own cohomology...
AbstractWe show that any closed model category of simplicial algebras over an algebraic theory is Qu...
Abstract. Alas, the motivating examples of algebraically compact categories are not algebraically co...
AbstractThe recollement approach to the representation theory of sequences of algebras is extended t...
Badzioch showed that in the category of simplicial sets each homotopy algebra of a Lawvere theory is...
SummaryThis notes describes an obstruction theory for the category SO-Cat of simplicial categories w...
Schwede S. Stable homotopy of algebraic theories. Ergänzungsreihe / Universität Bielefeld, Sonderfor...
In this article we prove that the numerical Grothendieck group of every smooth proper dg category is...
Badzioch showed that in the category of simplicial sets each homotopy algebra of a Lawvere theory is...
Abstract. In this short note we show that E ∞ quasi-categories can be re-placed by strictly commutat...