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Article
Varieties of Monoids with Complex Lattices of Subvarieties
Bulletin of the London Mathematical Society
  • Sergey V. Gusev, Ural Federal University - Ekaterinburg, Russia
  • Edmond W. H. Lee, Nova Southeastern University
Document Type
Article
Publication Date
8-31-2020
Disciplines
Abstract

A variety is finitely universal if its lattice of subvarieties contains an isomorphic copy of every finite lattice. Examples of finitely universal varieties of semigroups have been available since the early 1970s, but it is unknown if there exists a finitely universal variety of monoids. The main objective of the present article is to exhibit the first examples of finitely universal varieties of monoids. The finite universality of these varieties is established by showing that the lattice of equivalence relations on every sufficiently large finite set is anti-isomorphic to some subinterval of the lattice of subvarieties.

DOI
10.1112/blms.12392
Citation Information
Sergey V. Gusev and Edmond W. H. Lee. "Varieties of Monoids with Complex Lattices of Subvarieties" Bulletin of the London Mathematical Society Vol. 52 Iss. 4 (2020) p. 762 - 755 ISSN: 0024-6093
Available at: http://works.bepress.com/edmond-lee/54/