We show that the proof-theoretic notion of logical preorder coincides with the process-theoretic notion of contextual preorder for a CCS-like process calculus obtained from the formula-as-process interpretation of a fragment of linear logic. The argument makes use of other standard notions in process algebra, namely simulation and labeled transition systems. This result establishes a connection between an approach to reason about process specifications, the contextual preorder, and a method to reason about logic specifications, the logical preorder.</p
Process algebra is the study of distributed or parallel systems by algebraic means. Originating in c...
A key problem in mixing operational (e.g. process-algebraic) and declarative (e.g. logical) styles o...
We investigate the use of positive linear and relevant logics to provide logical accounts of static ...
We show that the proof-theoretic notion of logical preorder coincides with the process-theoretic not...
We show that the proof-theoretic notion of logical preorder coincides with the process-theoretic no-...
We show that the proof-theoretic notion of logical preorder coincides with the process-theoretic not...
We show that the proof-theoretic notion of logical preorder coincides with the process-theoretic not...
In order to combine operational and logical styles of specifications in one unified framework, the n...
AbstractThere are two ways to define a semantics for process algebras: either directly by means of a...
AbstractThis paper presents the Logical Process Calculus (LPC), a formalism that supports heterogene...
AbstractRecent approaches to the combination of process algebras and temporal logic have shown that ...
This paper presents the Logical Process Calculus (LPC), a formalism that supports heterogeneous syst...
Linear logic has been used to specify the operational semantics of various process calculi. In this ...
: This paper describes a mechanization in higher order logic of the theory for a subset of Milner&ap...
AbstractA key problem in mixing operational (e.g. process-algebraic) and declarative (e.g. logical) ...
Process algebra is the study of distributed or parallel systems by algebraic means. Originating in c...
A key problem in mixing operational (e.g. process-algebraic) and declarative (e.g. logical) styles o...
We investigate the use of positive linear and relevant logics to provide logical accounts of static ...
We show that the proof-theoretic notion of logical preorder coincides with the process-theoretic not...
We show that the proof-theoretic notion of logical preorder coincides with the process-theoretic no-...
We show that the proof-theoretic notion of logical preorder coincides with the process-theoretic not...
We show that the proof-theoretic notion of logical preorder coincides with the process-theoretic not...
In order to combine operational and logical styles of specifications in one unified framework, the n...
AbstractThere are two ways to define a semantics for process algebras: either directly by means of a...
AbstractThis paper presents the Logical Process Calculus (LPC), a formalism that supports heterogene...
AbstractRecent approaches to the combination of process algebras and temporal logic have shown that ...
This paper presents the Logical Process Calculus (LPC), a formalism that supports heterogeneous syst...
Linear logic has been used to specify the operational semantics of various process calculi. In this ...
: This paper describes a mechanization in higher order logic of the theory for a subset of Milner&ap...
AbstractA key problem in mixing operational (e.g. process-algebraic) and declarative (e.g. logical) ...
Process algebra is the study of distributed or parallel systems by algebraic means. Originating in c...
A key problem in mixing operational (e.g. process-algebraic) and declarative (e.g. logical) styles o...
We investigate the use of positive linear and relevant logics to provide logical accounts of static ...