We propose a sound and complete axiomatisation of a class of graphs with nesting and either locally or globally restricted nodes. Such graphs allow to represent explicitly and at the right level of abstraction some relevant topological and logical features of models and systems, including nesting, hierarchies, sharing of resources, and pointers or links. We also provide an encoding of the proposed algebra into terms of a gs-monoidal theory, and through these into a suitable class of well-scoped term graphs, showing that this encoding is sound and complete with respect to the axioms of the algebra
Graphs and term graphs have proved strikingly flexible and expressive in modeling and specifying dis...
Let G be the infinite cyclic group on a generator x. To avoid confusion when working with Z-modules ...
Abstract. Aiming at a unified view of the logics describing spatial structures, we introduce a gener...
We propose a sound and complete axiomatisation of a class of graphs with nesting and either locally ...
Compositional graph models for global computing systems must account for two relevant dimensions, ...
We present a categorical characterization of term graphs (i.e., finite, directed acyclic graphs labe...
We define an algebraic theory of hierarchical graphs, whose axioms characterise graph isomorphism: t...
Abstract. For a graph G, we construct two algebras, whose dimensions are both equal to the number of...
In this thesis, we present a flexible framework for specifying and constructing operads which are su...
We define an algebraic theory of hierarchical graphs, whose axioms characterise graph isomorphism: t...
Graph-monoids are introduced as algebraic objects which correspond to congruences over graphs. Varie...
In [1] an algebra of automata with interfaces, Span(Graph), was introduced with main operation being...
Formalised in the study of symmetric monoidal categories, string diagrams are a graphical syntax tha...
We define an algebraic theory of hierarchical graphs, whose axioms characterise graph isomorphism: t...
International audienceDoes a graph necessarily have nodes? May an edge be adjacent to itself and be ...
Graphs and term graphs have proved strikingly flexible and expressive in modeling and specifying dis...
Let G be the infinite cyclic group on a generator x. To avoid confusion when working with Z-modules ...
Abstract. Aiming at a unified view of the logics describing spatial structures, we introduce a gener...
We propose a sound and complete axiomatisation of a class of graphs with nesting and either locally ...
Compositional graph models for global computing systems must account for two relevant dimensions, ...
We present a categorical characterization of term graphs (i.e., finite, directed acyclic graphs labe...
We define an algebraic theory of hierarchical graphs, whose axioms characterise graph isomorphism: t...
Abstract. For a graph G, we construct two algebras, whose dimensions are both equal to the number of...
In this thesis, we present a flexible framework for specifying and constructing operads which are su...
We define an algebraic theory of hierarchical graphs, whose axioms characterise graph isomorphism: t...
Graph-monoids are introduced as algebraic objects which correspond to congruences over graphs. Varie...
In [1] an algebra of automata with interfaces, Span(Graph), was introduced with main operation being...
Formalised in the study of symmetric monoidal categories, string diagrams are a graphical syntax tha...
We define an algebraic theory of hierarchical graphs, whose axioms characterise graph isomorphism: t...
International audienceDoes a graph necessarily have nodes? May an edge be adjacent to itself and be ...
Graphs and term graphs have proved strikingly flexible and expressive in modeling and specifying dis...
Let G be the infinite cyclic group on a generator x. To avoid confusion when working with Z-modules ...
Abstract. Aiming at a unified view of the logics describing spatial structures, we introduce a gener...