English

Boolean-type Retractable State-finite Automata Without Outputs

Formal Languages and Automata Theory 2015-10-06 v2

Abstract

An automaton A\bf A is called a retractable automaton if, for every subautomaton B\bf B of A\bf A, there is at least one homomorphism of A\bf A onto B\bf B which leaves the elements of BB fixed (such homomorphism is called a retract homomorphism of A\bf A onto B\bf B). We say that a retractable automaton A{\bf A}=(A,X,δ\delta) is Boolean-type if there exists a family {λB B is a subautomaton of A }\{\lambda_B \mid \textrm{ B is a subautomaton of A } \} of retract homomorphisms λB\lambda _B of A\bf A such that, for arbitrary subautomata B1{\bf B}_1 and B2{\bf B}_2 of A\bf A, the condition B1B2B_1\subseteq B_2 implies KerλB2KerλB1Ker\lambda _{B_2}\subseteq Ker\lambda _{B_1}. In this paper we describe the Boolean-type retractable state-finite automata without outputs.

Keywords

Cite

@article{arxiv.1510.00208,
  title  = {Boolean-type Retractable State-finite Automata Without Outputs},
  author = {Mark Füzesdi},
  journal= {arXiv preprint arXiv:1510.00208},
  year   = {2015}
}

Comments

12 pages

R2 v1 2026-06-22T11:10:05.994Z