Geodesic
The topology of Stein fillable manifolds in high dimensions, II
Bowden, Jonathan1 ; Crowley, Diarmuid2 ; Stipsicz, András I3
1 Ludwig-Maximillians Universität, Mathemathisches Institut, Theresienstr. 39, D-80333 Munich, Germany
2 Institute of Mathematics, University of Aberdeen, Aberdeen AB24 3UE, UK
3 Rényi Institute of Mathematics, Hungarian Academy of Sciences, Réaltanoda utca 13-15, Budapest, H-1053, Hungary
Geometry & topology, Tome 19 (2015) no. 5, pp. 2995-3030.

Voir la notice de l'article provenant de la source Mathematical Sciences Publishers

We continue our study of contact structures on manifolds of dimension at least five using surgery-theoretic methods. Particular applications include the existence of “maximal” almost contact manifolds with respect to the Stein cobordism relation as well as the existence of weakly fillable contact structures on the product M × S2. We also study the connection between Stein fillability and connected sums: we give examples of almost contact manifolds for which the connected sum is Stein fillable, while the components are not.

Concerning obstructions to Stein fillability, we show for all k > 1 that there are almost contact structures on the (8k1)–sphere which are not Stein fillable. This implies the same result for all highly connected (8k1)–manifolds which admit almost contact structures. The proofs rely on a new number-theoretic result about Bernoulli numbers.

DOI : 10.2140/gt.2015.19.2995
Classification : 32E10, 57R17, 57R65
Keywords: Stein fillability, surgery, contact structures, bordism theory

Bowden, Jonathan 1 ; Crowley, Diarmuid 2 ; Stipsicz, András I 3

1 Ludwig-Maximillians Universität, Mathemathisches Institut, Theresienstr. 39, D-80333 Munich, Germany
2 Institute of Mathematics, University of Aberdeen, Aberdeen AB24 3UE, UK
3 Rényi Institute of Mathematics, Hungarian Academy of Sciences, Réaltanoda utca 13-15, Budapest, H-1053, Hungary 
@article{GT_2015_19_5_a13,
     author = {Bowden, Jonathan and Crowley, Diarmuid and Stipsicz, Andr\'as I},
     title = {The topology of {Stein} fillable manifolds in high dimensions, {II}},
     journal = {Geometry & topology},
     pages = {2995--3030},
     publisher = {mathdoc},
     volume = {19},
     number = {5},
     year = {2015},
     doi = {10.2140/gt.2015.19.2995},
     url = {http://geodesic.mathdoc.fr/articles/10.2140/gt.2015.19.2995/}
}
TY  - JOUR
AU  - Bowden, Jonathan
AU  - Crowley, Diarmuid
AU  - Stipsicz, András I
TI  - The topology of Stein fillable manifolds in high dimensions, II
JO  - Geometry & topology
PY  - 2015
SP  - 2995
EP  - 3030
VL  - 19
IS  - 5
PB  - mathdoc
UR  - http://geodesic.mathdoc.fr/articles/10.2140/gt.2015.19.2995/
DO  - 10.2140/gt.2015.19.2995
ID  - GT_2015_19_5_a13
ER  - 
%0 Journal Article
%A Bowden, Jonathan
%A Crowley, Diarmuid
%A Stipsicz, András I
%T The topology of Stein fillable manifolds in high dimensions, II
%J Geometry & topology
%D 2015
%P 2995-3030
%V 19
%N 5
%I mathdoc
%U http://geodesic.mathdoc.fr/articles/10.2140/gt.2015.19.2995/
%R 10.2140/gt.2015.19.2995
%F GT_2015_19_5_a13
Bowden, Jonathan; Crowley, Diarmuid; Stipsicz, András I. The topology of Stein fillable manifolds in high dimensions, II. Geometry & topology, Tome 19 (2015) no. 5, pp. 2995-3030. doi : 10.2140/gt.2015.19.2995. http://geodesic.mathdoc.fr/articles/10.2140/gt.2015.19.2995/

[1] H J Baues, Obstruction theory on homotopy classification of maps, 628, Springer (1977)

[2] M S Borman, Y Eliashberg, E Murphy, Existence and classification of overtwisted contact structures in all dimensions,

[3] R Bott, The stable homotopy of the classical groups, Ann. of Math. 70 (1959) 313 | DOI

[4] F Bourgeois, Odd-dimensional tori are contact manifolds, Int. Math. Res. Not. 2002 (2002) 1571 | DOI

[5] J Bowden, D Crowley, A I Stipsicz, The topology of Stein fillable manifolds in high dimensions, III

[6] J Bowden, D Crowley, A I Stipsicz, Contact structures on M ×S2, Math. Ann. 358 (2014) 351 | DOI

[7] J Bowden, D Crowley, A I Stipsicz, The topology of Stein fillable manifolds in high dimensions, I, Proc. Lond. Math. Soc. 109 (2014) 1363 | DOI

[8] L Carlitz, Kummer’s congruence for the Bernoulli numbers, Portugal. Math. 19 (1960) 203

[9] K Cieliebak, Y Eliashberg, From Stein to Weinstein and back : Symplectic geometry of affine complex manifolds, 59, Amer. Math. Soc. (2012)

[10] Y Eliashberg, Filling by holomorphic discs and its applications, from: "Geometry of low-dimensional manifolds, 2" (editors S K Donaldson, C B Thomas), London Math. Soc. Lecture Note Ser. 151, Cambridge Univ. Press (1990) 45

[11] Y Eliashberg, Topological characterization of Stein manifolds of dimension > 2, Internat. J. Math. 1 (1990) 29 | DOI

[12] J B Etnyre, K Honda, On symplectic cobordisms, Math. Ann. 323 (2002) 31 | DOI

[13] H Geiges, Contact structures on (n− 1)–connected (2n + 1)–manifolds, Pacific J. Math. 161 (1993) 129 | DOI

[14] H Geiges, Applications of contact surgery, Topol. 36 (1997) 1193 | DOI

[15] H Geiges, An introduction to contact topology, 109, Cambridge Univ. Press (2008) | DOI

[16] H Geiges, K Zehmisch, How to recognize a 4–ball when you see one, Münster J. Math. 6 (2013) 525

[17] P Ghiggini, K Niederkrüger, C Wendl, Subcritical contact surgeries and the topology of symplectic fillings,

[18] F Hirzebruch, Topological methods in algebraic geometry, 131, Springer (1966)

[19] D Husemoller, Fibre bundles, 20, Springer (1994) | DOI

[20] K Ireland, M Rosen, A classical introduction to modern number theory, 84, Springer (1990) | DOI

[21] M A Kervaire, Some nonstable homotopy groups of Lie groups, Illinois J. Math. 4 (1960) 161

[22] M A Kervaire, J W Milnor, Groups of homotopy spheres, I, Ann. of Math. 77 (1963) 504 | DOI

[23] W S Massey, Obstructions to the existence of almost complex structures, Bull. Amer. Math. Soc. 67 (1961) 559 | DOI

[24] P Massot, K Niederkrüger, C Wendl, Weak and strong fillability of higher dimensional contact manifolds, Invent. Math. 192 (2013) 287 | DOI

[25] J Milnor, Lectures on the h–cobordism theorem, Princeton Univ. Press (1965)

[26] J Milnor, E Spanier, Two remarks on fiber homotopy type, Pacific J. Math. 10 (1960) 585 | DOI

[27] J W Milnor, J D Stasheff, Characteristic classes, 76, Princeton Univ. Press (1974)

[28] S Smale, Generalized Poincaré’s conjecture in dimensions greater than four, Ann. of Math. 74 (1961) 391 | DOI

[29] S Smale, On the structure of 5–manifolds, Ann. of Math. 75 (1962) 38 | DOI

[30] R E Stong, Notes on cobordism theory, Princeton Univ. Press (1968)

[31] C T C Wall, Classification of (n − 1)–connected 2n–manifolds, Ann. of Math. 75 (1962) 163 | DOI

[32] A Weinstein, Contact surgery and symplectic handlebodies, Hokkaido Math. J. 20 (1991) 241 | DOI

[33] H Whitney, The self-intersections of a smooth n–manifold in 2n–space, Ann. of Math. 45 (1944) 220 | DOI

[34] H Yang, Almost complex structures on (n − 1)–connected 2n–manifolds, Topology Appl. 159 (2012) 1361 | DOI

Cité par Sources :