Abstract. We devise a generic framework where a weakest precondi-tion semantics, in the form of indexed posets, is derived from a monad whose Kleisli category is enriched by posets. It is inspired by Jacobs’ recent identification of a categorical structure that is common in various predicate transformers, but adds generality in the following aspects: 1) different notions of modality (such as “may ” vs. “must”) are captured by Eilenberg-Moore algebras; 2) nested branching—like in games and in probabilistic systems with nondeterministic environments—is modularly modeled by a monad on the Eilenberg-Moore category of another.
The purpose of this paper is to describe how some theorems about constructions in categories can be ...
We develop the formal theory of monads, as established by Street, in univalent foundations. This all...
This paper presents a technique called generic composition to provide a uniform basis for modal oper...
Abstract. We devise a generic framework where a weakest precondi-tion semantics, in the form of inde...
Abstract. The Dijkstra monad has been introduced recently for cap-turing weakest precondition comput...
The Dijkstra and Hoare monads have been introduced recently for capturing weak-est precondition comp...
Part 2: Regular ContributionsInternational audienceThe Dijkstra monad has been introduced recently f...
Abstract. We study the construction of preorders on Set-monads by the semantic ⊤⊤-lifting. We show t...
AbstractWe study modularity in denotational semantics. We define the notion of a dyad, generalising ...
The incremental approach to modular monadic semantics constructs complex monads by using monad trans...
Probability theory can be studied synthetically as the computational effect embodied by a commutativ...
The incremental approach to modular monadic semantics constructs complex monads by using monad trans...
AbstractWe characterise bicategories of spans, relations and partial maps universally in terms of fa...
AbstractTrace semantics has been defined for various non-deterministic systems with different input/...
Given a monad T on Set whose functor factors through the category of ordered sets with left adjoint ...
The purpose of this paper is to describe how some theorems about constructions in categories can be ...
We develop the formal theory of monads, as established by Street, in univalent foundations. This all...
This paper presents a technique called generic composition to provide a uniform basis for modal oper...
Abstract. We devise a generic framework where a weakest precondi-tion semantics, in the form of inde...
Abstract. The Dijkstra monad has been introduced recently for cap-turing weakest precondition comput...
The Dijkstra and Hoare monads have been introduced recently for capturing weak-est precondition comp...
Part 2: Regular ContributionsInternational audienceThe Dijkstra monad has been introduced recently f...
Abstract. We study the construction of preorders on Set-monads by the semantic ⊤⊤-lifting. We show t...
AbstractWe study modularity in denotational semantics. We define the notion of a dyad, generalising ...
The incremental approach to modular monadic semantics constructs complex monads by using monad trans...
Probability theory can be studied synthetically as the computational effect embodied by a commutativ...
The incremental approach to modular monadic semantics constructs complex monads by using monad trans...
AbstractWe characterise bicategories of spans, relations and partial maps universally in terms of fa...
AbstractTrace semantics has been defined for various non-deterministic systems with different input/...
Given a monad T on Set whose functor factors through the category of ordered sets with left adjoint ...
The purpose of this paper is to describe how some theorems about constructions in categories can be ...
We develop the formal theory of monads, as established by Street, in univalent foundations. This all...
This paper presents a technique called generic composition to provide a uniform basis for modal oper...