|
Algebraic & Geometric Topology 7
(2007) 2239–2270
|
| 1 |
R C Alperin,
Notes:
PSL2(Z) =
Z2∗Z3, Amer.
Math. Monthly 100 (1993) 385–386 MR1542320 |
| 2 |
M F Atiyah,
Characters
and cohomology of finite groups, Inst. Hautes
Études Sci. Publ. Math. (1961) 23–64 MR0148722 |
| 3 |
M F Atiyah,
G B Segal, Equivariant K–theory and
completion, J. Differential Geometry 3 (1969) 1–18
MR0259946 |
| 4 |
G Carlsson,
Derived
representation theory and the algebraic K–theory of
fields (2003) |
| 5 |
P Gabriel, M
Zisman, Calculus of fractions and homotopy theory,
Ergebnisse der Mathematik und ihrer Grenzgebiete 35, Springer
(1967) MR0210125 |
| 6 |
A Hatcher, Algebraic
topology, Cambridge University Press (2002) MR1867354 |
| 7 |
H Hironaka,
Triangulations of algebraic sets, from: "Algebraic
geometry (Proc. Sympos. Pure Math., Vol. 29, Humboldt State
Univ., Arcata, CA, 1974)" (editor R Hartshorne), Amer. Math.
Soc. (1975) 165–185 MR0374131 |
| 8 |
T Lawson, Derived
Representation Theory of Nilpotent Groups, PhD thesis,
Stanford University (2004) |
| 9 |
T Lawson, The Bott cofiber sequence
in deformation K–theory (2006) |
| 10 |
J P May,
The
spectra associated to permutative categories, Topology
17 (1978) 225–228 MR508886 |
| 11 |
D McDuff, G
Segal, Homology fibrations and
the “group-completion” theorem, Invent.
Math. 31 (1975/76) 279–284 MR0402733 |
| 12 |
D A Ramras,
Yang–Mills theory over surfaces and the
Atiyah–Segal theorem arXiv:math/0710.0681 |
| 13 |
D A Ramras,
Stable
Representation Theory of Infinite Discrete Groups, PhD
thesis, Stanford University (2007) |
| 14 |
G Segal, Classifying
spaces and spectral sequences, Inst. Hautes Études
Sci. Publ. Math. (1968) 105–112 MR0232393 |
| 15 |
G Segal, Categories and
cohomology theories, Topology 13 (1974) 293–312
MR0353298 |
| 16 |
H Whitney, Elementary structure of
real algebraic varieties, Ann. of Math. (2) 66 (1957)
545–556 MR0095844 |
