Infinite length modules
Henning Krause, Claus Michael Ringel, editors.
Basel : Birkhäuser, ©2000.
ix, 439 págs. : ilustraciones ; 24 cm.
Serie: Trends in mathematics
ISBN: 3764364130, 0817664130 (Boston), 9783034895620 (pbk.)
"This volume presents the invited lectures of a conference ... held at Bielefeld, September 7-11, 1998."
Incluye referencias bibliográficas.
Reseña: MathSciNet, 2001f:16002
Contenido
- Claus Michael Ringel, Infinite length modules. Some examples as introduction
- Paul C. Eklof, Modules with strange decomposition properties
- Alberto Facchini, Failure of the Krull-Schmidt theorem for Artinian modules and serial modules
- K. I. Pimenov and A. V. Yakovlev, Artinian modules over a matrix ring
- Rüdiger Göbel, Some combinatorial principles for solving algebraic problems
- T. H. Lenagan, Dimension theory of Noetherian rings
- Vladimir Bavula, Krull, Gelfand-Kirillov, filter, faithful and Schur dimensions
- Alex Martsinkovsky, Cohen-Macaulay modules and approximations
- Nicholas J. Kuhn, The generic representation theory of finite fields: a survey of basic structure
- Geoffrey M. L. Powell, On Artinian objects in the category of functors between $\bold F_2$-vector spaces
- Lionel Schwartz, Unstable modules over the Steenrod algebra, functors, and the cohomology of spaces
- D. J. Benson, Infinite dimensional modules for finite groups
- Jeremy Rickard, Bousfield localization for representation theorists
- Jon F. Carlson, The thick subcategory generated by the trivial module
- Aidan Schofield, Birational classification of moduli spaces
- Grzegorz Zwara, Tame algebras and degenerations of modules
- Raymundo Bautista, On some tame and discrete families of modules
- Birge Huisgen-Zimmermann, Purity, algebraic compactness, direct sum decompositions, and representation type
- Mike Prest, Topological and geometric aspects of the Ziegler spectrum
- Henning Krause, Finite versus infinite dimensional representations : a new definition of tameness
- Helmut Lenzing, Invariance of tameness under stable equivalence: Krause's theorem
- Jan Schröer, The Krull-Gabriel dimension of an algebra. Open problems and conjectures
- Sverre O. Smalø, Homological differences between finite and infinite dimensional representations of algebras.