|
Algebraic & Geometric Topology 5
(2005) 135–182
|
| 1 |
C Boilley,
Extensions de modules et dualité de Lefschetz, in
preparation |
| 2 |
A K Bousfield,
V K A M Gugenheim, On PL de Rham
theory and rational homotopy type, Mem. Amer. Math. Soc. 8
(1976) MR0425956 |
| 3 |
G E Bredon,
Topology and geometry, Graduate Texts in Mathematics
139, Springer (1997) MR1700700
Corrected third printing of the 1993 original |
| 4 |
P Deligne, Théorie
de Hodge II, Inst. Hautes Études Sci. Publ. Math.
(1971) 5–57 MR0498551 |
| 5 |
W G Dwyer, J
Spaliński, Homotopy theories and model
categories, from: "Handbook of algebraic topology",
North-Holland (1995) 73–126 MR1361887 |
| 6 |
Y Félix, S
Halperin, J C Thomas, Gorenstein
spaces, Adv. in Math. 71 (1988) 92–112 MR960364 |
| 7 |
Y Félix, S
Halperin, J C Thomas, Differential graded
algebras in topology, from: "Handbook of algebraic
topology", North-Holland (1995) 829–865 MR1361901 |
| 8 |
Y Félix, S
Halperin, J C Thomas, Rational homotopy
theory, Graduate Texts in Mathematics 205, Springer (2001)
MR1802847 |
| 9 |
C M Gordon, J
Luecke, Knots are determined by
their complements, J. Amer. Math. Soc. 2 (1989)
371–415 MR965210 |
| 10 |
M Hovey, Model
categories, Mathematical Surveys and Monographs 63,
American Mathematical Society (1999) MR1650134 |
| 11 |
S Halperin,
Lectures on minimal models, Mém. Soc. Math. France
(N.S.) (1983) MR736299 |
| 12 |
S Halperin,
J M Lemaire, Notions of category in differential
algebra, from: "Algebraic topology—rational homotopy
(Louvain-la–Neuve, 1986)", Lecture Notes in Math. 1318,
Springer (1988) 138–154 MR952577 |
| 13 |
J F P
Hudson, Concordance, isotopy, and
diffeotopy, Ann. of Math. (2) 91 (1970) 425–448
MR0259920 |
| 14 |
T Kahl, P
Lambrechts, L Vandembroucq, Bords
homotopiques et modèles de Quillen, Homology,
Homotopy Appl. 8 (2006) 1–28 MR2219233 |
| 15 |
J R Klein,
Poincaré duality spaces, from: "Surveys on surgery
theory, Vol. 1", Ann. of Math. Stud. 145, Princeton Univ. Press
(2000) 135–165 MR1747534 |
| 16 |
J R Klein,
Poincaré
duality embeddings and fibrewise homotopy theory. II,
Q. J. Math. 53 (2002) 319–335 MR1930266 |
| 17 |
J R Klein,
Embedding,
compression and fiberwise homotopy theory, Algebr.
Geom. Topol. 2 (2002) 311–336 MR1917055 |
| 18 |
P Lambrechts,
Cochain
model for thickenings and its application to rational
LS-category, Manuscripta Math. 103 (2000) 143–160
MR1796311 |
| 19 |
P Lambrechts, D
Stanley, Examples of
rational homotopy types of blow-ups, Proc. Amer. Math.
Soc. 133 (2005) 3713–3719 MR2163611 |
| 20 |
P Lambrechts, D
Stanley, The
rational homotopy type of configuration spaces of two
points, Ann. Inst. Fourier (Grenoble) 54 (2004)
1029–1052 MR2111020 |
| 21 |
P Lambrechts, D
Stanley, The rational homotopy type of a blow-up in the
stable case, Geom. Topol. 12 (2008) 1921–1993
MR2431012 |
| 22 |
P Lambrechts, D
Stanley, L Vandembroucq, Embeddings up
to homotopy of two-cones in Euclidean space, Trans.
Amer. Math. Soc. 354 (2002) 3973–4013 MR1926862 |
| 23 |
N Levitt, On the
structure of Poincaré duality spaces, Topology 7
(1968) 369–388 MR0248839 |
| 24 |
W B R
Lickorish, An introduction to knot theory, Graduate
Texts in Mathematics 175, Springer (1997) MR1472978 |
| 25 |
J W Morgan,
The
algebraic topology of smooth algebraic varieties, Inst.
Hautes Études Sci. Publ. Math. (1978) 137–204
MR516917 |
| 26 |
C P Rourke,
B J Sanderson, Introduction to piecewise-linear
topology, Springer Study Edition, Springer (1982) MR665919
Reprint |
| 27 |
D Sullivan,
Infinitesimal computations in topology, Inst. Hautes
Études Sci. Publ. Math. (1977) 269–331 MR0646078 |
| 28 |
C T C Wall,
Finiteness
conditions for CW–complexes, Ann. of Math. (2) 81
(1965) 56–69 MR0171284 |
| 29 |
C T C Wall,
Classification
problems in differential topology IV: Thickenings,
Topology 5 (1966) 73–94 MR0192509 |
