Add to ORKGIn category theory, monads, which are monoid objects on endofunctors, play a central role closely related to adjunctions. Monads have been studied mostly in algebraic situations. In this dissertation, we study this concept in some categories of smooth manifolds.Namely, the tangent functor in the category of smooth manifolds is the functor part of a unique monad, which is the main character of this dissertation.After its construction and the study of uniqueness properties in related categories, we study its algebras, which are to this monad what representations are to a group. We give some examples of algebras, and general conditions that they should satisfy. We characterize them in the category of affine manifolds. We also study an analog o...
AbstractMonads are by now well-established as programming construct in functional languages. Recentl...
New introduction; Section 1 shortened and redispatched with Section 2; Subsections on symmetric oper...
A K.; 1/–foliation is one for which the universal covers of all leaves are contractible (thus all le...
AbstractWe present techniques to construct tangential homotopies of subsets of foliated manifolds an...
This is a report on aspects of the theory and use of monoidal categories. The first section introduc...
At the heart of differential geometry is the construction of the tangent bundle of a manifold. There...
In this paper we consider a category of manifolds over the algebra of even degree exterior forms on ...
AbstractThe purpose of this paper is to develop a transverse notion of Lusternik–Schnirelmann catego...
In this paper we consider a category of manifolds over the algebra of even degree exterior forms on ...
In this paper we consider a category of manifolds over the algebra of even degree exterior forms on ...
AbstractThis paper contributes to the algebraization of topology via the theory of monads and lax ex...
AbstractAfter a review of the concept of “monad with arities” we show that the category of algebras ...
The purpose of this tutorial is to introduce the enriched perspective on tangent categories: they ar...
After a review of the concept of "monad with arities" we show that the category of algebras for such...
We study the existence and left properness of transferred model structures for “monoid-like” objects...
AbstractMonads are by now well-established as programming construct in functional languages. Recentl...
New introduction; Section 1 shortened and redispatched with Section 2; Subsections on symmetric oper...
A K.; 1/–foliation is one for which the universal covers of all leaves are contractible (thus all le...
AbstractWe present techniques to construct tangential homotopies of subsets of foliated manifolds an...
This is a report on aspects of the theory and use of monoidal categories. The first section introduc...
At the heart of differential geometry is the construction of the tangent bundle of a manifold. There...
In this paper we consider a category of manifolds over the algebra of even degree exterior forms on ...
AbstractThe purpose of this paper is to develop a transverse notion of Lusternik–Schnirelmann catego...
In this paper we consider a category of manifolds over the algebra of even degree exterior forms on ...
In this paper we consider a category of manifolds over the algebra of even degree exterior forms on ...
AbstractThis paper contributes to the algebraization of topology via the theory of monads and lax ex...
AbstractAfter a review of the concept of “monad with arities” we show that the category of algebras ...
The purpose of this tutorial is to introduce the enriched perspective on tangent categories: they ar...
After a review of the concept of "monad with arities" we show that the category of algebras for such...
We study the existence and left properness of transferred model structures for “monoid-like” objects...
AbstractMonads are by now well-established as programming construct in functional languages. Recentl...
New introduction; Section 1 shortened and redispatched with Section 2; Subsections on symmetric oper...
A K.; 1/–foliation is one for which the universal covers of all leaves are contractible (thus all le...