Dovermann, Karl Heinz, 1948-
Equivariant surgery and classification of finite group actions on manifolds / [electronic resource] Karl Heinz Dovermann and Melvin Rothenberg. - Providence, R.I., USA : American Mathematical Society, c1988. - 1 online resource (viii, 117 p. : ill.) - Memoirs of the American Mathematical Society, v. 379 0065-9266 (print); 1947-6221 (online); .
"January 1988." "Volume 71, number 379 (first of 5 numbers)."
Bibliography: p. 112-117.
0. Statement of results 1. Discrete invariants of a $G$ manifold ($G$ posets) 2. Equivariant finiteness obstructions 3. Bundle data, ambient maps, cobordism, and the surgery sequence 4. Equivariant surgery and normal cobordism 5. Surgery below the middle dimension, simple $G$ homotopy theory, and simple $G$ surgery theory 6. Surgery in the middle dimension and the $\pi $-$\pi $ theorem 7. Addition of equivariant surgery obstructions 8. The exact surgery sequence 9. Computation of equivariant surgery obstruction groups 10. Rational surgery obstructions 11. Classification of group actions on disks 12. Closed $G$ manifolds which are not $G$ homotopy equivalent to a finite $G$ CW-complexes
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9781470407995 (online)
Topological transformation groups.
Surgery (Topology)
Cobordism theory.
QA3 QA613.7 / .A57 no. 379
510 s 514
Equivariant surgery and classification of finite group actions on manifolds / [electronic resource] Karl Heinz Dovermann and Melvin Rothenberg. - Providence, R.I., USA : American Mathematical Society, c1988. - 1 online resource (viii, 117 p. : ill.) - Memoirs of the American Mathematical Society, v. 379 0065-9266 (print); 1947-6221 (online); .
"January 1988." "Volume 71, number 379 (first of 5 numbers)."
Bibliography: p. 112-117.
0. Statement of results 1. Discrete invariants of a $G$ manifold ($G$ posets) 2. Equivariant finiteness obstructions 3. Bundle data, ambient maps, cobordism, and the surgery sequence 4. Equivariant surgery and normal cobordism 5. Surgery below the middle dimension, simple $G$ homotopy theory, and simple $G$ surgery theory 6. Surgery in the middle dimension and the $\pi $-$\pi $ theorem 7. Addition of equivariant surgery obstructions 8. The exact surgery sequence 9. Computation of equivariant surgery obstruction groups 10. Rational surgery obstructions 11. Classification of group actions on disks 12. Closed $G$ manifolds which are not $G$ homotopy equivalent to a finite $G$ CW-complexes
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9781470407995 (online)
Topological transformation groups.
Surgery (Topology)
Cobordism theory.
QA3 QA613.7 / .A57 no. 379
510 s 514