A general functorial framework for recursive definitions is presented in which simulation of a definition scheme by another one implies an ordering between the values defined by these schemes in an arbitrary model. Under mild conditions on the functor involved, the converse implication also holds: a model is constructed such that, if the values defined are ordered, there is a simulation between the definition schemes. The theory is illustrated by applications to context-free grammars, recursive procedures in imperative languages, and simulation and bisimulation of processes. (C) 2000 Elsevier Science B.V. All rights reserved.</p
The syntactic nature of operational reasoning requires techniques to deal with term contexts, especi...
AbstractAn expression such as ∀x(P(x)↔ϕ(P)), where P occurs in ϕ(P), does not always define P. When ...
AbstractThe main problem in recursive scheme theory is determining how to solve a scheme and express...
A general functorial framework for recursive definitions is presented in which simulation of a defin...
AbstractA general functorial framework for recursive definitions is presented in which simulation of...
Communicated by J.W. de Bakker A general functorial framework for recursive denitions is presented i...
In dit proefschrift wordt een fundamenteel wiskundig onderzoek gedaan naar recursie in programmeerta...
The weakest-precondition interpretation of recursive procedures is developed for a language with a c...
AbstractThe question of extending semantic models for a programming language without recursion to a ...
This paper is concerned with the relationship between the computational and fixpoint semantics of no...
AbstractNested simulations define an interesting hierarchy of semantic preorders and equivalences in...
AbstractRewriting logic is a flexible and general logic to specify concurrent systems. To prove prop...
Semantics of recursive programs has been extensively studied for more than 30 years, and now there e...
This paper extends a previous paper [8] where we described a semantics for monadic recursive program...
The notion of recursiveness is treated in a model-theoretical way by using a particular instance of ...
The syntactic nature of operational reasoning requires techniques to deal with term contexts, especi...
AbstractAn expression such as ∀x(P(x)↔ϕ(P)), where P occurs in ϕ(P), does not always define P. When ...
AbstractThe main problem in recursive scheme theory is determining how to solve a scheme and express...
A general functorial framework for recursive definitions is presented in which simulation of a defin...
AbstractA general functorial framework for recursive definitions is presented in which simulation of...
Communicated by J.W. de Bakker A general functorial framework for recursive denitions is presented i...
In dit proefschrift wordt een fundamenteel wiskundig onderzoek gedaan naar recursie in programmeerta...
The weakest-precondition interpretation of recursive procedures is developed for a language with a c...
AbstractThe question of extending semantic models for a programming language without recursion to a ...
This paper is concerned with the relationship between the computational and fixpoint semantics of no...
AbstractNested simulations define an interesting hierarchy of semantic preorders and equivalences in...
AbstractRewriting logic is a flexible and general logic to specify concurrent systems. To prove prop...
Semantics of recursive programs has been extensively studied for more than 30 years, and now there e...
This paper extends a previous paper [8] where we described a semantics for monadic recursive program...
The notion of recursiveness is treated in a model-theoretical way by using a particular instance of ...
The syntactic nature of operational reasoning requires techniques to deal with term contexts, especi...
AbstractAn expression such as ∀x(P(x)↔ϕ(P)), where P occurs in ϕ(P), does not always define P. When ...
AbstractThe main problem in recursive scheme theory is determining how to solve a scheme and express...