Result Details

From Automata to Multiautomata via Theory of Hypercompositional Structures

KŘEHLÍK, Š.; NOVÁK, M.; VYROUBALOVÁ, J. From Automata to Multiautomata via Theory of Hypercompositional Structures. Mathematics, 2021, vol. 10, no. 1, p. 1-16. ISSN: 2227-7390.

Type

journal article

Language

English

Authors

Křehlík Štěpán, RNDr., Ph.D., UMAT (FEEC)
Novák Michal, doc. RNDr., Ph.D., UMAT (FEEC)
Vyroubalová Jana, Ing., UMAT (FEEC)

Abstract

In this paper, we study two important problems related to quasi-multiautomata: the complicated nature of verification of the GMAC condition for systems of quasi-multiautomata, and the fact that the nature of quasi-multiautomata has deviated from the original nature of automata as seen by the theory of formal languages. For the former problem, we include several new conditions that simplify the procedure. For the latter problem, we close this gap by presenting a construction of quasi-multiautomata, which corresponds to deterministic automata of the theory of formal languages and is based on the operation of concatenation.

Keywords

automata theory; hypergroups; quasi-automata; quasi-multiautomata; semiautomata

URL

https://www.mdpi.com/2227-7390/10/1/1

Published

2021

Pages

1–16

Journal

Mathematics, vol. 10, no. 1, ISSN 2227-7390

Publisher

MDPI

DOI

10.3390/math10010001

UT WoS

000741172300001

EID Scopus

2-s2.0-85121625472

BibTeX

@article{BUT175450,
  author="Štěpán {Křehlík} and Michal {Novák} and Jana {Vyroubalová}",
  title="From Automata to Multiautomata via Theory of Hypercompositional Structures",
  journal="Mathematics",
  year="2021",
  volume="10",
  number="1",
  pages="1--16",
  doi="10.3390/math10010001",
  url="https://www.mdpi.com/2227-7390/10/1/1"
}

Files

pdf mathematics-10-00001.pdf 464 kB

Departments

Department of Mathematics (UMAT)