In this work, we describe an adjunction between the comma category of Set-based monads under the V-powerset monad and the category of associative lax extensions of Set-based monads to the category of V-relations. In the process, we give a general construction of the Kleisli extension of a monad to the category of V-relations
Lax algebras provide a setting for the simultaneous study of a wide range of topological structures....
Lax algebras provide a setting for the simultaneous study of a wide range of topological structures....
We use the basic expected properties of the Gray tensor product of (∞, 2)-categories to study (co)la...
In this work, we describe an adjunction between the comma category of Set-based monads under the V -...
AbstractThis paper contributes to the algebraization of topology via the theory of monads and lax ex...
AbstractWe combine two research directions of the past decade, namely the development of a lax-algeb...
AbstractWe combine two research directions of the past decade, namely the development of a lax-algeb...
We investigate those lax extensions of a Set-monad T = (T,m, e) to the category V-Rel of sets and V-...
AbstractThis paper contributes to the algebraization of topology via the theory of monads and lax ex...
AbstractRecent work of several authors shows that many categories of interest to topologists can be ...
Abstract. In this paper we construct extensions of Set-monads { and, more generally, lax Rel-monads ...
We show that, for a quantale $V$ and a $\mathsf{Set}$-monad $\mathbb{T}$laxly extended to $V$-$\math...
AbstractWe develop the relationship between algebraic structure and monads enriched over the monoida...
AbstractMotivated by the problem of internalizing Enriched Category Theory in a topos, we investigat...
Abstract. In this paper we construct extensions of Set-monads- and, more gen-erally, of lax Rel-mona...
Lax algebras provide a setting for the simultaneous study of a wide range of topological structures....
Lax algebras provide a setting for the simultaneous study of a wide range of topological structures....
We use the basic expected properties of the Gray tensor product of (∞, 2)-categories to study (co)la...
In this work, we describe an adjunction between the comma category of Set-based monads under the V -...
AbstractThis paper contributes to the algebraization of topology via the theory of monads and lax ex...
AbstractWe combine two research directions of the past decade, namely the development of a lax-algeb...
AbstractWe combine two research directions of the past decade, namely the development of a lax-algeb...
We investigate those lax extensions of a Set-monad T = (T,m, e) to the category V-Rel of sets and V-...
AbstractThis paper contributes to the algebraization of topology via the theory of monads and lax ex...
AbstractRecent work of several authors shows that many categories of interest to topologists can be ...
Abstract. In this paper we construct extensions of Set-monads { and, more generally, lax Rel-monads ...
We show that, for a quantale $V$ and a $\mathsf{Set}$-monad $\mathbb{T}$laxly extended to $V$-$\math...
AbstractWe develop the relationship between algebraic structure and monads enriched over the monoida...
AbstractMotivated by the problem of internalizing Enriched Category Theory in a topos, we investigat...
Abstract. In this paper we construct extensions of Set-monads- and, more gen-erally, of lax Rel-mona...
Lax algebras provide a setting for the simultaneous study of a wide range of topological structures....
Lax algebras provide a setting for the simultaneous study of a wide range of topological structures....
We use the basic expected properties of the Gray tensor product of (∞, 2)-categories to study (co)la...
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