| 1 |
J F Adams,
Lectures on generalised cohomology, from: "Category
Theory, Homology Theory and their Applications, III (Battelle
Institute Conference, Seattle, Wash., 1968, Vol. Three)",
Springer (1969) 1–138 MR0251716 |
| 2 |
J F Adams,
S B Priddy, Uniqueness of BSO, Math. Proc.
Cambridge Philos. Soc. 80 (1976) 475–509 MR0431152 |
| 3 |
S Betley, On the homotopy groups of
A(X), Proc. Amer. Math. Soc. 98 (1986) 495–498
MR857948 |
| 4 |
S Bloch, K
Kato, p–adic
étale cohomology, Inst. Hautes Études Sci.
Publ. Math. (1986) 107–152 MR849653 |
| 5 |
M Bökstedt,
W C Hsiang, I Madsen, The cyclotomic trace and
algebraic K–theory of spaces, Invent. Math. 111
(1993) 465–539 MR1202133 |
| 6 |
M Bökstedt, I
Madsen, Topological cyclic homology of the integers,
Astérisque (1994) 7–8, 57–143 MR1317117
K–theory (Strasbourg, 1992) |
| 7 |
M Bökstedt, I
Madsen, Algebraic K–theory of local number fields:
the unramified case, from: "Prospects in topology
(Princeton, NJ, 1994)", Ann. of Math. Stud. 138, Princeton
Univ. Press (1995) 28–57 MR1368652 |
| 8 |
A K Bousfield,
The
localization of spectra with respect to homology,
Topology 18 (1979) 257–281 MR551009 |
| 9 |
B I Dundas,
Relative
K–theory and topological cyclic homology, Acta
Math. 179 (1997) 223–242 MR1607556 |
| 10 |
W G Dwyer,
Twisted
homological stability for general linear groups, Ann.
of Math. (2) 111 (1980) 239–251 MR569072 |
| 11 |
W G Dwyer,
E M Friedlander, Algebraic and etale
K–theory, Trans. Amer. Math. Soc. 292 (1985)
247–280 MR805962 |
| 12 |
W G Dwyer,
E M Friedlander, Topological
models for arithmetic, Topology 33 (1994) 1–24
MR1259512 |
| 13 |
W G Dwyer,
S A Mitchell, On the
K–theory spectrum of a ring of algebraic
integers, K–Theory 14 (1998) 201–263
MR1633505 |
| 14 |
F T Farrell,
W C Hsiang, On the rational homotopy groups of
the diffeomorphism groups of discs, spheres and aspherical
manifolds, from: "Algebraic and geometric topology (Proc.
Sympos. Pure Math., Stanford Univ., Stanford, Calif., 1976),
Part 1", Proc. Sympos. Pure Math., XXXII, Amer. Math. Soc.
(1978) 325–337 MR520509 |
| 15 |
L Hesselholt, I
Madsen, On the
K–theory of finite algebras over Witt vectors of perfect
fields, Topology 36 (1997) 29–101 MR1410465 |
| 16 |
R T Hoobler,
When is Br(X)=Br′ (X)?, from: "Brauer groups in
ring theory and algebraic geometry (Wilrijk, 1981)", Lecture
Notes in Math. 917, Springer (1982) 231–244 MR657433 |
| 17 |
K Igusa, The stability theorem
for smooth pseudoisotopies, K–Theory 2 (1988)
MR972368 |
| 18 |
J R Klein, J
Rognes, The fiber of
the linearization map A(∗)→K(Z),
Topology 36 (1997) 829–848 MR1432423 |
| 19 |
K H Knapp,
Im(J)–theory for torsion-free spaces: the complex
projective space as an example, Revised version of
Habilitationsschrift, Bonn, (1979) in preparation |
| 20 |
S Lichtenbaum,
On the values of
zeta and L–functions I, Ann. of Math. (2) 96
(1972) 338–360 MR0360527 |
| 21 |
I Madsen, R J
Milgram, The classifying spaces for surgery and
cobordism of manifolds, Annals of Mathematics Studies 92,
Princeton University Press (1979) MR548575 |
| 22 |
I Madsen, C
Schlichtkrull, The circle transfer and
K–theory, from: "Geometry and topology: Aarhus
(1998)", Contemp. Math. 258, Amer. Math. Soc. (2000)
307–328 MR1778114 |
| 23 |
I Madsen, V
Snaith, J Tornehave, Infinite loop maps in
geometric topology, Math. Proc. Cambridge Philos. Soc. 81
(1977) 399–430 MR0494076 |
| 24 |
I Madsen, U
Tillmann, The stable mapping class
group and Q(CP∞+),
Invent. Math. 145 (2001) 509–544 MR1856399 |
| 25 |
J P May,
E∞ ring spaces and E∞ ring
spectra, Lecture Notes in Mathematics 577, Springer (1977)
MR0494077
With contributions by Frank Quinn, Nigel Ray, and Jørgen
Tornehave |
| 26 |
J S Milne,
Étale cohomology, Princeton Mathematical Series 33,
Princeton University Press (1980) MR559531 |
| 27 |
J S Milne,
Arithmetic duality theorems, Perspectives in Mathematics
1, Academic Press (1986) MR881804 |
| 28 |
G Mislin, Localization
with respect to K–theory, J. Pure Appl. Algebra
10 (1977/78) 201–213 MR0467732 |
| 29 |
S A Mitchell,
On p–adic topological K–theory, from:
"Algebraic K–theory and algebraic topology (Lake Louise,
AB, 1991)", NATO Adv. Sci. Inst. Ser. C Math. Phys. Sci. 407,
Kluwer Acad. Publ. (1993) 197–204 MR1367298 |
| 30 |
R E Mosher,
Some stable
homotopy of complex projective space, Topology 7 (1968)
179–193 MR0227985 |
| 31 |
J Mukai, The
S1–transfer map and homotopy groups of
suspended complex projective spaces, Math. J. Okayama Univ.
24 (1982) 179–200 MR680191 |
| 32 |
D Quillen, Higher
algebraic K–theory I, from: "Algebraic
K–theory, I: Higher K–theories (Proc. Conf.,
Battelle Memorial Inst., Seattle, Wash., 1972)", Springer
(1973) 85–147 MR0338129 |
| 33 |
D Quillen, Finite
generation of the groups Ki of rings of algebraic
integers, from: "Algebraic K–theory, I: Higher
K–theories (Proc. Conf., Battelle Memorial Inst.,
Seattle, Wash., 1972)", Lecture Notes in Math. 341, Springer
(1973) 179–198 MR0349812 |
| 34 |
D Quillen, Higher
algebraic K–theory, from: "Proceedings of the
International Congress of Mathematicians (Vancouver, B. C.,
1974), Vol. 1", Canad. Math. Congress, Montreal, Que. (1975)
171–176 MR0422392 |
| 35 |
D Quillen, Letter
from Quillen to Milnor on
Im(πi0→πis→KiZ),
from: "Algebraic K–theory (Proc. Conf., Northwestern
Univ., Evanston, Ill., 1976)", Lecture Notes in Math. 551,
Springer (1976) 182–188 MR0482758 |
| 36 |
D C Ravenel,
Complex cobordism and stable homotopy groups of spheres,
Pure and Applied Mathematics 121, Academic Press (1986)
MR860042 |
| 37 |
J Rognes, Two-primary
algebraic K–theory of pointed spaces, Topology 41
(2002) 873–926 MR1923990 |
| 38 |
J Rognes, C
Weibel, Two-primary
algebraic K–theory of rings of integers in number
fields, J. Amer. Math. Soc. 13 (2000) 1–54
MR1697095
Appendix A by Manfred Kolster |
| 39 |
N E Steenrod,
Cohomology operations, Annals of Mathematics Studies 50,
Princeton University Press (1962) MR0145525
Lectures by N E Steenrod written and revised by D B
A Epstein |
| 40 |
A Suslin, V
Voevodsky, Bloch–Kato conjecture and motivic
cohomology with finite coefficients, from: "The arithmetic
and geometry of algebraic cycles (Banff, AB, 1998)", NATO Sci.
Ser. C Math. Phys. Sci. 548, Kluwer Acad. Publ. (2000)
117–189 MR1744945 |
| 41 |
J Tate, Duality
theorems in Galois cohomology over number fields, from:
"Proc Internat. Congr. Mathematicians (Stockholm, 1962)", Inst.
Mittag-Leffler (1963) 288–295 MR0175892 |
| 42 |
H Toda, A
topological proof of theorems of Bott and
Borel–Hirzebruch for homotopy groups of unitary
groups, Mem. Coll. Sci. Univ. Kyoto. Ser. A. Math. 32
(1959) 103–119 MR0108790 |
| 43 |
V Voevodsky, The
Milnor Conjecture, preprint (1996) |
| 44 |
V Voevodsky, On
2–torsion in motivic cohomology, preprint (2001) |
| 45 |
F Waldhausen,
Algebraic K–theory of topological spaces I, from:
"Algebraic and geometric topology (Proc. Sympos. Pure Math.,
Stanford Univ., Stanford, Calif., 1976), Part 1", Proc. Sympos.
Pure Math., XXXII, Amer. Math. Soc. (1978) 35–60 MR520492 |
| 46 |
F Waldhausen,
Algebraic K–theory of topological spaces II, from:
"Algebraic topology, Aarhus 1978 (Proc. Sympos., Univ. Aarhus,
Aarhus, 1978)", Lecture Notes in Math. 763, Springer (1979)
356–394 MR561230 |
| 47 |
F Waldhausen,
Algebraic K–theory of spaces, a manifold approach,
from: "Current trends in algebraic topology, Part 1 (London,
Ont., 1981)", CMS Conf. Proc. 2, Amer. Math. Soc. (1982)
141–184 MR686115 |
| 48 |
F Waldhausen,
Algebraic K–theory of spaces, from: "Algebraic and
geometric topology (New Brunswick, N.J., 1983)", Lecture Notes
in Math. 1126, Springer (1985) 318–419 MR802796 |
| 49 |
F Waldhausen,
Algebraic K–theory of spaces, concordance, and stable
homotopy theory, from: "Algebraic topology and algebraic
K–theory (Princeton, N.J., 1983)", Ann. of Math. Stud.
113, Princeton Univ. Press (1987) 392–417 MR921486 |
| 50 |
F Waldhausen, The
stable parametrized h–cobordism theorem, in
preparation |
