Automaticity of one-relator semigroups with length less than or equal to three

Abstract

The main results of this paper is to give a complete characterization of the automaticity of one-relator semigroups with length less than or equal to three. Let S=sgp A|u=v be a semigroup generated by a set A=\a1,a2,…,an\,\ n∈ N with defining relation u=v, where u,v∈ A* and A* is the free monoid generated by A. Such a semigroup is called a one-relator semigroup. Suppose that |v|≤|u|≤3, where |u| is the length of the word u. Suppose that a,b∈ A,\ a≠ b. Then we have the following: (1) S is prefix-automatic if u=v∈ \aba=ba,\ aab=ba,\ abb=bb\. Moreover, if u=v∈ \aba=ba,\ aab=ba,\ abb=bb\ then S is not automatic. (2) S is biautomatic if one of the following holds: (i) |u|=3,\ |v|=0, (ii) |u|=|v|=3, (iii) |u|=2 and u=v∈ \ab=a,\ ab=b\. Moreover, if u=v∈ \ab=a,\ ab=b\ then S is not biautomatic.