The finite basis problem for the monoid of 2 by 2 upper triangular tropical matrices

Abstract

For each positive n, let un = vn denote the identity obtained from the Adjan identity (xy) (yx) (xy) (xy) (yx) = (xy) (yx) (yx) (xy) (yx) by substituting (xy) → (x1 x2 … xn) and (yx) → (xn … x2 x1). We show that every monoid which satisfies un = vn for each positive n and generates the variety containing the bicyclic monoid is nonfinitely based. This implies that the monoid of 2 by 2 upper triangular tropical matrices over the tropical semiring is nonfinitely based.