Languages of higher-dimensional automata

• Published in: Mathematical structures in computer science Vol. 31; no. 5; pp. 575 - 613
• Main Authors: Fahrenberg, Uli, Johansen, Christian, Struth, Georg, Ziemiański, Krzysztof
• Format: Journal Article
• Language: English
• Published: Cambridge University Press (CUP) 01.05.2021
• Subjects: Computer Science; Formal Languages and Automata Theory; concurrency theory; pomset; Higher-dimensional automaton; directed topology
• ISSN: 0960-1295; 1469-8072; 1469-8072
• DOI: 10.1017/S0960129521000293

We introduce languages of higher-dimensional automata (HDAs) and develop some of their properties. To this end, we define a new category of precubical sets, uniquely naturally isomorphic to the standard one, and introduce a notion of event consistency. HDAs are then finite, labeled, event-consistent precubical sets with distinguished subsets of initial and accepting cells. Their languages are sets of interval orders closed under subsumption; as a major technical step, we expose a bijection between interval orders and a subclass of HDAs. We show that any finite subsumption-closed set of interval orders is the language of an HDA, that languages of HDAs are closed under binary unions and parallel composition, and that bisimilarity implies language equivalence.