Canonical Nondeterministic Automata - Coalgebraic Methods in Computer Science
Conference Papers Year : 2014

Canonical Nondeterministic Automata

Abstract

For each regular language L we describe a family of canonical nondeterministic acceptors (nfas). Their construction follows a uniform recipe: build the minimal dfa for L in a locally finite variety V , and apply an equivalence between the finite V -algebras and a category of finite structured sets and relations. By instantiating this to different varieties we recover three well-studied canonical nfas (the átomaton, the jiromaton and the minimal xor automaton) and obtain a new canonical nfa called the distromaton. We prove that each of these nfas is minimal relative to a suitable measure, and give conditions for state-minimality. Our approach is coalgebraic, exhibiting additional structure and universal properties.
Fichier principal
Vignette du fichier
328263_1_En_11_Chapter.pdf (340.47 Ko) Télécharger le fichier
Origin Files produced by the author(s)
Loading...

Dates and versions

hal-01408760 , version 1 (05-12-2016)

Licence

Identifiers

Cite

Robert R. Myers, Jiří Adámek, Stefan Milius, Henning Urbat. Canonical Nondeterministic Automata. 12th International Workshop on Coalgebraic Methods in Computer Science (CMCS), Apr 2014, Grenoble, France. pp.189-210, ⟨10.1007/978-3-662-44124-4_11⟩. ⟨hal-01408760⟩
91 View
321 Download

Altmetric

Share

More