Stable Modules and the D(2)-Problem / F. E. A. Johnson.
Material type:
TextSeries: London Mathematical Society Lecture Note Series ; no. 301Publisher: Cambridge : Cambridge University Press, 2003Description: 1 online resource (280 pages) : digital, PDF file(s)Content type: text Media type: computer Carrier type: online resourceISBN: 9780511550256 (ebook)Other title: Stable Modules & the D(2)-ProblemSubject(s): Low-dimensional topology | Homotopy theory | Group algebrasAdditional physical formats: Print version: : No titleDDC classification: 514/.2 LOC classification: QA612.14 | .J64 2003Online resources: Click here to access online Summary: This 2003 book is concerned with two fundamental problems in low-dimensional topology. Firstly, the D(2)-problem, which asks whether cohomology detects dimension, and secondly the realization problem, which asks whether every algebraic 2-complex is geometrically realizable. The author shows that for a large class of fundamental groups these problems are equivalent. Moreover, in the case of finite groups, Professor Johnson develops general methods and gives complete solutions in a number of cases. In particular, he presents a complete treatment of Yoneda extension theory from the viewpoint of derived objects and proves that for groups of period four, two-dimensional homotopy types are parametrized by isomorphism classes of projective modules. This book is carefully written with an eye on the wider context and as such is suitable for graduate students wanting to learn low-dimensional homotopy theory as well as established researchers in the field.
E-BOOKS
| Current library | Home library | Call number | Materials specified | URL | Status | Date due | Barcode |
|---|---|---|---|---|---|---|---|
| IMSc Library | IMSc Library | Link to resource | Available | EBK11927 |
Title from publisher's bibliographic system (viewed on 16 Oct 2015).
This 2003 book is concerned with two fundamental problems in low-dimensional topology. Firstly, the D(2)-problem, which asks whether cohomology detects dimension, and secondly the realization problem, which asks whether every algebraic 2-complex is geometrically realizable. The author shows that for a large class of fundamental groups these problems are equivalent. Moreover, in the case of finite groups, Professor Johnson develops general methods and gives complete solutions in a number of cases. In particular, he presents a complete treatment of Yoneda extension theory from the viewpoint of derived objects and proves that for groups of period four, two-dimensional homotopy types are parametrized by isomorphism classes of projective modules. This book is carefully written with an eye on the wider context and as such is suitable for graduate students wanting to learn low-dimensional homotopy theory as well as established researchers in the field.
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