Homological classification of rings
A general name for results which deduce properties of a ring (usually, an associative ring or a ring with a unit element) from the properties of certain modules over it — in particular, from the properties of the category of all left (or right) modules over this ring (cf. Morita equivalence; Module).
The following are the most important examples of such results.
1) The classical semi-simplicity of a ring is equivalent both to the injectivity of all left modules over it and to their projectivity, and also to the injectivity of all left ideals of the ring [1].
2) A commutative local Noetherian ring is regular if and only if it has finite global homological dimension.
3) A ring is regular (in the sense of von Neumann) if and only if all modules over it are flat, i.e. if the ring has weak homological dimension zero [2].
4) The projectivity of all flat left modules is equivalent to the minimum condition for principal right ideals (cf. Perfect ring).
5) A ring is left Noetherian if and only if the class of injective left modules over it may be described by formulas of first-order predicate calculus in the language of the theory of modules [4].
See also Artinian ring; Quasi-Frobenius ring; Coherent ring; Semi-perfect ring; Self-injective ring.
References
[1] | H. Cartan, S. Eilenberg, "Homological algebra" , Princeton Univ. Press (1956) |
[2] | J. Lambek, "Lectures on rings and modules" , Blaisdell (1966) |
[3] | L.A. Skornyakov, "Homological classification of rings" Mat. Vesnik , 4 : 4 (1967) pp. 415–434 (In Russian) |
[4] | P. Eklof, G. Sabbagh, "Model-completions and modules" Ann. Math. Logic , 2 : 3 (1971) pp. 251–295 |
[5] | S. MacLane, "Homology" , Springer (1963) |
Homological classification of rings. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Homological_classification_of_rings&oldid=14148