Representations and identities of Baxter monoids with involution

Abstract

Let (baxtn,~) be the Baxter monoid of finite rank n with Sch\"utzenberger's involution . In this paper, it is shown that (baxtn,~) admits a faithful representation by an involution monoid of upper triangular matrices over any semiring from a large class including the tropical semiring under the skew transposition. Then a transparent combinatorial characterization of the word identities satisfied by (baxtn,~) is given. Further, it is proved that (baxtn,~) is finitely based if and only if n≠ 3, and shown that the identity checking problem for (baxtn,~) can be done in polynomial time.