Automata on infinite biposets
Abstract
Bisemigroups are algebras equipped with two independent associative operations. Labeled finite sp-biposets may serve as a possible representation of the elements of the free bisemigroups. For finite sp-biposets, an accepting device, called parenthesizing automaton, was introduced in [6], and it was proved that its expressive power is equivalent to both algebraic recognizability and monadic second order definability. In this paper, we show, how this concept of parenthesizing automaton can be generalized for infinite biposets in a way that the equivalence of regularity (defined by acceptance with automata), recognizability (defined by homomorphisms and finite ω-bisemigroups) and MSO-definability remains true.Downloads
Download data is not yet available.
Published
2006-01-01
How to Cite
Németh, Z. L. (2006). Automata on infinite biposets. Acta Cybernetica, 17(4), 765-797. Retrieved from https://cyber.bibl.u-szeged.hu/index.php/actcybern/article/view/3696
Issue
Section
Regular articles