Add to ORKGFollowing the analogy between algebras (monoids) and monoidal categories the construction of nucleus for non-associative algebras is simulated on the categorical level. Nuclei of categories of modules are considered as an example.33 page(s
AbstractMacLane's original introduction to the theory of monoidal categories presented a short argum...
This paper is a study of monoidal categories with duals where the tensor product need not be commuta...
AbstractThis paper is a study of monoidal categories with duals where the tensor product need not be...
In this paper, we begin with the bar construction of a (noncommutative) dg-algebra. We go over the c...
A formation is a class of algebras that is closed under homomorphic images and finite subdirect prod...
In this thesis we study a tower of biadjunctions coming from a pivotal tensor category with a self d...
Category Theory has developed rapidly. This book aims to present those ideas and methods which can n...
AbstractModels for parallel and concurrent processes lead quite naturally to the study of monoidal c...
Motivated by the weighted Hurwitz product on sequences in an algebra, we produce a family of monoida...
15 pages ; to appear in the proceedings of the Conference Symmetries, Integrable systems and Represe...
Abstract Non-associative algebras appear in some quantum-mechanical systems, for instance if a charg...
AbstractA C∗-algebra is called nuclear if there is a unique way of forming its tensor product with a...
This paper is a study of monoidal categories with duals where the tensor product need not be commuta...
summary:The paper considers a fuzzification of the notion of quantaloid of K. I. Rosenthal, which re...
AbstractWe generalize the notion of nuclear maps from functional analysis by defining nuclear ideals...
AbstractMacLane's original introduction to the theory of monoidal categories presented a short argum...
This paper is a study of monoidal categories with duals where the tensor product need not be commuta...
AbstractThis paper is a study of monoidal categories with duals where the tensor product need not be...
In this paper, we begin with the bar construction of a (noncommutative) dg-algebra. We go over the c...
A formation is a class of algebras that is closed under homomorphic images and finite subdirect prod...
In this thesis we study a tower of biadjunctions coming from a pivotal tensor category with a self d...
Category Theory has developed rapidly. This book aims to present those ideas and methods which can n...
AbstractModels for parallel and concurrent processes lead quite naturally to the study of monoidal c...
Motivated by the weighted Hurwitz product on sequences in an algebra, we produce a family of monoida...
15 pages ; to appear in the proceedings of the Conference Symmetries, Integrable systems and Represe...
Abstract Non-associative algebras appear in some quantum-mechanical systems, for instance if a charg...
AbstractA C∗-algebra is called nuclear if there is a unique way of forming its tensor product with a...
This paper is a study of monoidal categories with duals where the tensor product need not be commuta...
summary:The paper considers a fuzzification of the notion of quantaloid of K. I. Rosenthal, which re...
AbstractWe generalize the notion of nuclear maps from functional analysis by defining nuclear ideals...
AbstractMacLane's original introduction to the theory of monoidal categories presented a short argum...
This paper is a study of monoidal categories with duals where the tensor product need not be commuta...
AbstractThis paper is a study of monoidal categories with duals where the tensor product need not be...