FPM 1998, vol. 4, no. 2, pp. 763-767

FUNDAMENTALNAYA I PRIKLADNAYA MATEMATIKA

(FUNDAMENTAL AND APPLIED MATHEMATICS)

1998, VOLUME 4, NUMBER 2, PAGES 763-767

Finiteness conditions for subdirectly irreducible $S$ -acts and modules

I. B. Kozhukhov

Abstract

View as HTML View as gif image View as LaTeX source

It is proved that, for every semigroup $S$ of $n$ elements, the cardinalities of the subdirectly irreducible $S$ -acts are less or equal to $2$ ⁿ⁺¹. If the cardinalities of the subdirectly irreducible $S$ -acts are bounded by a natural number then $S$ is a periodic semigroup. It is obtained a combinatorial proof of the fact that there exist only finitely many of unitary subdirect irreducible modules over a finite ring.

All articles are published in Russian.

Main page	Editorial board
Instructions to authors	Contents of the journal

Location: http://mech.math.msu.su/~fpm/eng/98/982/98222h.htm
Last modified: June 17, 1998

Finiteness conditions for subdirectly irreducible S-acts and modules

Finiteness conditions for subdirectly irreducible $S$ -acts and modules