Algebraic and Geometric Topology
Algebraic and Geometric Topology Proceedings of a Conference held at Rutgers University, New Brunswick, USA July 6–13, 1983 / [electronic resource] :
edited by Andrew Ranicki, Norman Levitt, Frank Quinn.
- VI, 426 p. online resource.
- Lecture Notes in Mathematics, 1126 0075-8434 ; .
- Lecture Notes in Mathematics, 1126 .
Semifree finite groups actions on compact manifolds -- Torsion in L-groups -- Higher diagonal approximations and skeletons of K(?, l)'s -- Lectures on groups of homotopy spheres -- Some remarks on local formulae for p1 -- Evaluating the Swan finiteness obstruction for periodic groups -- The cappell-shaneson example -- A nonconnective delooping of algebraic K-theory -- Geometric algebra -- The algebraic theory of torsion I. Foundations -- Equivariant moore spaces -- Triviality of the involution on SK1 for periodic groups -- The involution in the algebraic K-theory of spaces -- Algebraic K-theory of spaces -- Oliver's formula and Minkowski's theorem -- Some nilpotent complexes.
9783540394136
10.1007/BFb0074435 doi
Algebraic topology.
Cell aggregation--Mathematics.
Algebraic Topology.
Manifolds and Cell Complexes (incl. Diff.Topology).
QA612-612.8
514.2
Semifree finite groups actions on compact manifolds -- Torsion in L-groups -- Higher diagonal approximations and skeletons of K(?, l)'s -- Lectures on groups of homotopy spheres -- Some remarks on local formulae for p1 -- Evaluating the Swan finiteness obstruction for periodic groups -- The cappell-shaneson example -- A nonconnective delooping of algebraic K-theory -- Geometric algebra -- The algebraic theory of torsion I. Foundations -- Equivariant moore spaces -- Triviality of the involution on SK1 for periodic groups -- The involution in the algebraic K-theory of spaces -- Algebraic K-theory of spaces -- Oliver's formula and Minkowski's theorem -- Some nilpotent complexes.
9783540394136
10.1007/BFb0074435 doi
Algebraic topology.
Cell aggregation--Mathematics.
Algebraic Topology.
Manifolds and Cell Complexes (incl. Diff.Topology).
QA612-612.8
514.2