Herein we develop category-theoretic tools for understanding network-style diagrammatic languages. The archetypal network-style diagrammatic language is that of electric circuits; other examples include signal flow graphs, Markov processes, automata, Petri nets, chemical reaction networks, and so on. The key feature is that the language is comprised of a number of components with multiple (input/output) terminals, each possibly labelled with some type, that may then be connected together along these terminals to form a larger network. The components form hyperedges between labelled vertices, and so a diagram in this language forms a hypergraph. We formalise the compositional structure by introducing the notion of a hypergraph category. Netw...
In [1] an algebra of automata with interfaces, Span(Graph), was introduced with main operation being...
In [1] an algebra of automata with interfaces, Span(Graph), was introduced with main operation being...
Span(Graph) was introduced by Katis, Sabadini and Walters as a categorical algebra of automata with ...
Herein we develop category-theoretic tools for understanding network-style diagrammatic languages. T...
Abstract. Networks are often studied as graphs, where the vertices stand for entities in the world a...
We use the framework of ``props" to study electrical circuits, signal-flow diagrams, and bond graphs...
We use the framework of ``props" to study electrical circuits, signal-flow diagrams, and bond graphs...
part : TC 1: Foundations of Computer ScienceInternational audienceSignal flow graphs are combinatori...
Signal flow graphs are combinatorial models for linear dynamical systems, playing a foundational rol...
Signal flow graphs are combinatorial models for linear dynamical systems, playing a foundational rol...
Scientists in diverse fields use diagrammatic formalisms to reason about various kinds of networks,...
This thesis aims to develop a compositional theory for the operational semantics of networks. The ne...
This thesis aims to develop a compositional theory for the operational semantics of networks. The ne...
AbstractWe develop an algebraic foundation for some of the graph-based structures underlying a varie...
Process theories combine a graphical language for compositional reasoning with an underlying categor...
In [1] an algebra of automata with interfaces, Span(Graph), was introduced with main operation being...
In [1] an algebra of automata with interfaces, Span(Graph), was introduced with main operation being...
Span(Graph) was introduced by Katis, Sabadini and Walters as a categorical algebra of automata with ...
Herein we develop category-theoretic tools for understanding network-style diagrammatic languages. T...
Abstract. Networks are often studied as graphs, where the vertices stand for entities in the world a...
We use the framework of ``props" to study electrical circuits, signal-flow diagrams, and bond graphs...
We use the framework of ``props" to study electrical circuits, signal-flow diagrams, and bond graphs...
part : TC 1: Foundations of Computer ScienceInternational audienceSignal flow graphs are combinatori...
Signal flow graphs are combinatorial models for linear dynamical systems, playing a foundational rol...
Signal flow graphs are combinatorial models for linear dynamical systems, playing a foundational rol...
Scientists in diverse fields use diagrammatic formalisms to reason about various kinds of networks,...
This thesis aims to develop a compositional theory for the operational semantics of networks. The ne...
This thesis aims to develop a compositional theory for the operational semantics of networks. The ne...
AbstractWe develop an algebraic foundation for some of the graph-based structures underlying a varie...
Process theories combine a graphical language for compositional reasoning with an underlying categor...
In [1] an algebra of automata with interfaces, Span(Graph), was introduced with main operation being...
In [1] an algebra of automata with interfaces, Span(Graph), was introduced with main operation being...
Span(Graph) was introduced by Katis, Sabadini and Walters as a categorical algebra of automata with ...