A Class of Irreducible matrix representations of an Arbitrary Inverse Semigroup
Glasgow mathematical journal, Tome 5 (1961) no. 1, pp. 41-48

Voir la notice de l'article provenant de la source Cambridge University Press

By a ‘representation’ we shall mean throughout a representation by n × n matrices with entries from an arbitrary field. Elsewhere [9] the author has introduced the concept of a principal representation of a semigroup S (see § 3 below for the definition) and has shown that if S satisfies the minimal condition on principal ideals then every irreducible representation is of this type. Moreover, if S satisfies the minimal conditions on both principal left and right ideals, which together imply the minimal condition on principal two-sided ideals [6, Theorem 4], the irreducible representations of S can ultimately be expressed explicitly in terms of group representations.
Munn, W. D. A Class of Irreducible matrix representations of an Arbitrary Inverse Semigroup. Glasgow mathematical journal, Tome 5 (1961) no. 1, pp. 41-48. doi: 10.1017/S2040618500034286
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