In algebra, AuslanderâReiten theory studies the representation theory of Artinian rings using techniques such as AuslanderâReiten sequences (also called almost split sequences) and AuslanderâReiten quivers. AuslanderâReiten theory was introduced by Maurice Auslander and Idun Reiten ( 1975) and developed by them in several subsequent papers.
For survey articles on AuslanderâReiten theory see Auslander (1982), Gabriel (1980), Reiten (1982), and the book Auslander, Reiten & Smalø (1997). Many of the original papers on AuslanderâReiten theory are reprinted in Auslander ( 1999a, 1999b).
Suppose that R is an Artin algebra. A sequence
of finitely generated left modules over R is called an almost-split sequence (or AuslanderâReiten sequence) if it has the following properties:
For any finitely generated left module C that is indecomposable but not projective there is an almost-split sequence as above, which is unique up to isomorphism. Similarly for any finitely generated left module A that is indecomposable but not injective there is an almost-split sequence as above, which is unique up to isomorphism.
The module A in the almost split sequence is isomorphic to D Tr C, the dual of the transpose of C.
Suppose that R is the ring kx]/(xn) for a field k and an integer nâĽ1. The indecomposable modules are isomorphic to one of kx]/(xm) for 1⤠m ⤠n, and the only projective one has m=n. The almost split sequences are isomorphic to
for 1 ⤠m < n. The first morphism takes a to (xa, a) and the second takes (b,c) to b − xc.
The Auslander-Reiten quiver of an Artin algebra has a vertex for each indecomposable module and an arrow between vertices if there is an irreducible morphism between the corresponding modules. It has a map Ď = D Tr called the translation from the non-projective vertices to the non-injective vertices, where D is the dual and Tr the transpose.
In algebra, AuslanderâReiten theory studies the representation theory of Artinian rings using techniques such as AuslanderâReiten sequences (also called almost split sequences) and AuslanderâReiten quivers. AuslanderâReiten theory was introduced by Maurice Auslander and Idun Reiten ( 1975) and developed by them in several subsequent papers.
For survey articles on AuslanderâReiten theory see Auslander (1982), Gabriel (1980), Reiten (1982), and the book Auslander, Reiten & Smalø (1997). Many of the original papers on AuslanderâReiten theory are reprinted in Auslander ( 1999a, 1999b).
Suppose that R is an Artin algebra. A sequence
of finitely generated left modules over R is called an almost-split sequence (or AuslanderâReiten sequence) if it has the following properties:
For any finitely generated left module C that is indecomposable but not projective there is an almost-split sequence as above, which is unique up to isomorphism. Similarly for any finitely generated left module A that is indecomposable but not injective there is an almost-split sequence as above, which is unique up to isomorphism.
The module A in the almost split sequence is isomorphic to D Tr C, the dual of the transpose of C.
Suppose that R is the ring kx]/(xn) for a field k and an integer nâĽ1. The indecomposable modules are isomorphic to one of kx]/(xm) for 1⤠m ⤠n, and the only projective one has m=n. The almost split sequences are isomorphic to
for 1 ⤠m < n. The first morphism takes a to (xa, a) and the second takes (b,c) to b − xc.
The Auslander-Reiten quiver of an Artin algebra has a vertex for each indecomposable module and an arrow between vertices if there is an irreducible morphism between the corresponding modules. It has a map Ď = D Tr called the translation from the non-projective vertices to the non-injective vertices, where D is the dual and Tr the transpose.