Balanced module

In the subfield of abstract algebra known as module theory, a right R module M is called a balanced module if every R-homomorphism from M into M is given by multiplication by a ring element. Explicitly, for any R-endomorphism f, there exists an r in R such that f(x)=xr for all x in M.

A ring is called right balanced if every right R module is balanced^[1].

The study of balanced modules and rings is an outgrowth of R. M. Thrall's study of QF-1 rings. An incomplete list of authors contributing to the theory of balanced modules includes (Camillo 1970), (Cunningham & Rutter 1972), (Dlab & Ringel 1972) and (Faith 1999).

Examples and properties

Examples

(Dlab & Ringel 1972) contains numerous constructions of nonbalanced modules.
It was established in (Nesbitt & Thrall 1946) that uniserial rings are balanced. Conversely, a balanced ring which is finitely generated as a module over its center is uniserial.^[2]

Properties

Being "balanced" is a categorical property for modules, that is, it is preserved by Morita equivalence. Explicitly, if F(-) is a Morita equivalence from the category of R modules to the category of S modules, and if M is balanced, then F(M) is balanced.
In view of the last point, the property of being a balanced ring is Morita invariant.
The question of which rings have all finitely generated right R modules balanced has already been answered. This condition turns out to be equivalent to the ring R being balanced^[3].

References

^ The definitions of balanced rings and modules appear in (Camillo 1970), (Cunningham & Rutter 1972), (Dlab & Ringel 1972), and (Faith 1999).
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Camillo, Victor P. (1970), "Balanced rings and a problem of Thrall", Trans. Amer. Math. Soc., 149: 143–153, ISSN 0002-9947, MR 0260794

Cunningham, R. S.; Rutter, E. A., Jr. (1972), "The double centralizer property is categorical", Rocky Mountain J. Math., 2 (4): 627–629, ISSN 0035-7596, MR 0310017{{citation}}: CS1 maint: multiple names: authors list (link)

Dlab, Vlastimil; Ringel, Claus Michael (1972), "Rings with the double centralizer property", J. Algebra, 22: 480–501, ISSN 0021-8693, MR 0306258

Faith, Carl (1999), Rings and things and a fine array of twentieth century associative algebra, Mathematical Surveys and Monographs, vol. 65, Providence, RI: American Mathematical Society, pp. xxxiv+422, ISBN 0-8218-0993-8, MR 1657671

[1] The definitions of balanced rings and modules appear in (Camillo 1970), (Cunningham & Rutter 1972), (Dlab & Ringel 1972), and (Faith 1999).

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