Add to ORKGevery algebraic theory is homotopically discrete, with the abelian monoid of components isomorphic to the center of the category of discrete algebras. For example, in the case of commutative algebras in characteristic p, this center is freely generated by Frobenius. Our proof involves the calculation of homotopy coherent centers of categories of simplicial presheaves as well as of Bousfield localizations. Numerous other classes of examples are dis-cussed.
AbstractMotivated by algebraic structures appearing in Rational Conformal Field Theory we study a co...
AbstractDown–up algebras which originated in the study of differential posets were recently defined ...
The aim of this work is to explain what a topological quantum field theory (TQFT) is and the relatio...
Centers of categories capture the natural operations on their objects. Homotopy coherent centers are...
Centers of categories capture the natural operations on their objects. Homotopy coherent centers are...
Centers of categories capture the natural operations on their objects. Homotopy coherent centers are...
Centers of categories capture the natural operations on their objects. Homotopy coherent centers are...
We consider a theory of centers and homotopy centers of monoids in monoidal categories which themsel...
The notion of Frobenius algebra originally arose in ring theory, but it is a fairly easy observation...
Monoidal categories have proven to be especially useful in the analysis of both algebraic structures...
It is known that the quantale of sup-preserving maps from a complete lattice to itself is a Frobeniu...
We develop the theory of Frobenioids, which may be regarded as a category-theoretic abstraction of t...
AbstractWe describe in the paper the graded centers of the bounded derived categories of the derived...
Motivated by algebraic structures appearing in Rational Conformal Field Theory we study a constructi...
The aim of this work is to explain what a topological quantum field theory (TQFT) is and the relatio...
AbstractMotivated by algebraic structures appearing in Rational Conformal Field Theory we study a co...
AbstractDown–up algebras which originated in the study of differential posets were recently defined ...
The aim of this work is to explain what a topological quantum field theory (TQFT) is and the relatio...
Centers of categories capture the natural operations on their objects. Homotopy coherent centers are...
Centers of categories capture the natural operations on their objects. Homotopy coherent centers are...
Centers of categories capture the natural operations on their objects. Homotopy coherent centers are...
Centers of categories capture the natural operations on their objects. Homotopy coherent centers are...
We consider a theory of centers and homotopy centers of monoids in monoidal categories which themsel...
The notion of Frobenius algebra originally arose in ring theory, but it is a fairly easy observation...
Monoidal categories have proven to be especially useful in the analysis of both algebraic structures...
It is known that the quantale of sup-preserving maps from a complete lattice to itself is a Frobeniu...
We develop the theory of Frobenioids, which may be regarded as a category-theoretic abstraction of t...
AbstractWe describe in the paper the graded centers of the bounded derived categories of the derived...
Motivated by algebraic structures appearing in Rational Conformal Field Theory we study a constructi...
The aim of this work is to explain what a topological quantum field theory (TQFT) is and the relatio...
AbstractMotivated by algebraic structures appearing in Rational Conformal Field Theory we study a co...
AbstractDown–up algebras which originated in the study of differential posets were recently defined ...
The aim of this work is to explain what a topological quantum field theory (TQFT) is and the relatio...