Vychylující moduly nad Gorensteinovými okruhy
Tilting Modules over Gorenstein Rings
rigorous thesis (RECOGNIZED)
View/ Open
Permanent link
http://hdl.handle.net/20.500.11956/24712Identifiers
Study Information System: 79715
Collections
- Kvalifikační práce [11242]
Author
Advisor
Faculty / Institute
Faculty of Mathematics and Physics
Discipline
Mathematical structures
Department
Department of Algebra
Date of defense
19. 11. 2009
Publisher
Univerzita Karlova, Matematicko-fyzikální fakultaLanguage
Czech
Grade
Recognized
Let R be a commutative 1-Gorenstein ring. Our main result characterizes all tilting and cotilting R-modules: up to equivalence: they are parametrized by subsets of the set of all prime ideals of height one. More precisely, every tilting (cotilting) R-module is equivalent to some Bass tilting (cotilting) module. This characterization was known in the particular case of Dedekind domains: Chapter 4 contains a new and simpler proof of this fact. Our main result is proved in Chapter 5, while Chapter 6 deals with the cotilting case. In Chapter 4, there is also a proof of the less well-known fact that all finitely generated tilting modules over commutative rings are projective.