English

Matrix semigroups over semirings

Rings and Algebras 2019-07-30 v1

Abstract

The multiplicative semigroup Mn(F)M_n(F) of n×nn\times n matrices over a field FF is well understood, in particular, it is a regular semigroup. This paper considers semigroups of the form Mn(S)M_n(S), where SS is a semiring, and the subsemigroups UTn(S)UT_n(S) and Un(S)U_n(S) of Mn(S)M_n(S) consisting of upper triangular and unitriangular matrices. Our main interest is in the case where SS is an idempotent semifield, where we also consider the subsemigroups UTn(S)UT_n(S^*) and Un(S)U_n(S^*) consisting of those matrices of UTn(S)UT_n(S) and Un(S)U_n(S) having all elements on and above the leading diagonal non-zero. Our guiding examples of such SS are the 2-element Boolean semiring B\mathbb{B} and the tropical semiring T\mathbb{T}. In the first case, Mn(B)M_n(\mathbb{B}) is isomorphic to the semigroup of binary relations on an nn-element set, and in the second, Mn(T)M_n(\mathbb{T}) is the semigroup of n×nn\times n tropical matrices. Il'in has proved that for any semiring RR and n>2n>2, the semigroup Mn(R)M_n(R) is regular if and only if RR is a regular ring. We therefore base our investigations for Mn(S)M_n(S) and its subsemigroups on the analogous but weaker concept of being Fountain (formerly, weakly abundant). These notions are determined by the existence and behaviour of idempotent left and right identities for elements, lying in particular equivalence classes. We show that certain subsemigroups of Mn(S)M_n(S), including several generalisations of well-studied monoids of binary relations (Hall relations, reflexive relations, unitriangular Boolean matrices), are Fountain. We give a detailed study of a family of Fountain semigroups arising in this way that has particularly interesting and unusual properties.

Keywords

Cite

@article{arxiv.1907.12518,
  title  = {Matrix semigroups over semirings},
  author = {Victoria Gould and Marianne Johnson and Munazza Naz},
  journal= {arXiv preprint arXiv:1907.12518},
  year   = {2019}
}

Comments

50 pages

R2 v1 2026-06-23T10:33:58.184Z