Generating sets, presentations, and growth of tropical matrix monoids

Abstract

We construct minimal and irredundant generating sets for a family of submonoids of the monoid of n × n upper triangular matrices over a commutative semiring. We show that the monoid of n × n matrices over the tropical integers, Mn(Zmax), is finitely generated if and only if n ≤ 2, and finitely presented if and only if n = 1. Minimal and irredundant generating sets are explicitly constructed when n ≤ 3. We then construct a presentation for the monoid of n × n upper triangular matrices over the tropical integers, UTn(Zmax), demonstrating that it is finitely presented for all n ∈ N. Finally, we establish upper bounds on the polynomial degree of the growth function of finitely generated subsemigroups of the monoid of n × n matrices over a bipotent semiring and show that these bounds are sharp for the tropical semiring.