- Source: Complex cobordism
In mathematics, complex cobordism is a generalized cohomology theory related to cobordism of manifolds. Its spectrum is denoted by MU. It is an exceptionally powerful cohomology theory, but can be quite hard to compute, so often instead of using it directly one uses some slightly weaker theories derived from it, such as Brown–Peterson cohomology or Morava K-theory, that are easier to compute.
The generalized homology and cohomology complex cobordism theories were introduced by Michael Atiyah (1961) using the Thom spectrum.
Spectrum of complex cobordism
The complex bordism
M
U
∗
(
X
)
{\displaystyle MU^{*}(X)}
of a space
X
{\displaystyle X}
is roughly the group of bordism classes of manifolds over
X
{\displaystyle X}
with a complex linear structure on the stable normal bundle. Complex bordism is a generalized homology theory, corresponding to a spectrum MU that can be described explicitly in terms of Thom spaces as follows.
The space
M
U
(
n
)
{\displaystyle MU(n)}
is the Thom space of the universal
n
{\displaystyle n}
-plane bundle over the classifying space
B
U
(
n
)
{\displaystyle BU(n)}
of the unitary group
U
(
n
)
{\displaystyle U(n)}
. The natural inclusion from
U
(
n
)
{\displaystyle U(n)}
into
U
(
n
+
1
)
{\displaystyle U(n+1)}
induces a map from the double suspension
Σ
2
M
U
(
n
)
{\displaystyle \Sigma ^{2}MU(n)}
to
M
U
(
n
+
1
)
{\displaystyle MU(n+1)}
. Together these maps give the spectrum
M
U
{\displaystyle MU}
; namely, it is the homotopy colimit of
M
U
(
n
)
{\displaystyle MU(n)}
.
Examples:
M
U
(
0
)
{\displaystyle MU(0)}
is the sphere spectrum.
M
U
(
1
)
{\displaystyle MU(1)}
is the desuspension
Σ
∞
−
2
C
P
∞
{\displaystyle \Sigma ^{\infty -2}\mathbb {CP} ^{\infty }}
of
C
P
∞
{\displaystyle \mathbb {CP} ^{\infty }}
.
The nilpotence theorem states that, for any ring spectrum
R
{\displaystyle R}
, the kernel of
π
∗
R
→
MU
∗
(
R
)
{\displaystyle \pi _{*}R\to \operatorname {MU} _{*}(R)}
consists of nilpotent elements. The theorem implies in particular that, if
S
{\displaystyle \mathbb {S} }
is the sphere spectrum, then for any
n
>
0
{\displaystyle n>0}
, every element of
π
n
S
{\displaystyle \pi _{n}\mathbb {S} }
is nilpotent (a theorem of Goro Nishida). (Proof: if
x
{\displaystyle x}
is in
π
n
S
{\displaystyle \pi _{n}S}
, then
x
{\displaystyle x}
is a torsion but its image in
MU
∗
(
S
)
≃
L
{\displaystyle \operatorname {MU} _{*}(\mathbb {S} )\simeq L}
, the Lazard ring, cannot be torsion since
L
{\displaystyle L}
is a polynomial ring. Thus,
x
{\displaystyle x}
must be in the kernel.)
Formal group laws
John Milnor (1960) and Sergei Novikov (1960, 1962) showed that the coefficient ring
π
∗
(
MU
)
{\displaystyle \pi _{*}(\operatorname {MU} )}
(equal to the complex cobordism of a point, or equivalently the ring of cobordism classes of stably complex manifolds) is a polynomial ring
Z
[
x
1
,
x
2
,
…
]
{\displaystyle \mathbb {Z} [x_{1},x_{2},\ldots ]}
on infinitely many generators
x
i
∈
π
2
i
(
MU
)
{\displaystyle x_{i}\in \pi _{2i}(\operatorname {MU} )}
of positive even degrees.
Write
C
P
∞
{\displaystyle \mathbb {CP} ^{\infty }}
for infinite dimensional complex projective space, which is the classifying space for complex line bundles, so that tensor product of line bundles induces a map
μ
:
C
P
∞
×
C
P
∞
→
C
P
∞
.
{\displaystyle \mu :\mathbb {CP} ^{\infty }\times \mathbb {CP} ^{\infty }\to \mathbb {CP} ^{\infty }.}
A complex orientation on an associative commutative ring spectrum E is an element x in
E
2
(
C
P
∞
)
{\displaystyle E^{2}(\mathbb {CP} ^{\infty })}
whose restriction to
E
2
(
C
P
1
)
{\displaystyle E^{2}(\mathbb {CP} ^{1})}
is 1, if the latter ring is identified with the coefficient ring of E. A spectrum E with such an element x is called a complex oriented ring spectrum.
If E is a complex oriented ring spectrum, then
E
∗
(
C
P
∞
)
=
E
∗
(
point
)
[
[
x
]
]
{\displaystyle E^{*}(\mathbb {CP} ^{\infty })=E^{*}({\text{point}})[[x]]}
E
∗
(
C
P
∞
)
×
E
∗
(
C
P
∞
)
=
E
∗
(
point
)
[
[
x
⊗
1
,
1
⊗
x
]
]
{\displaystyle E^{*}(\mathbb {CP} ^{\infty })\times E^{*}(\mathbb {CP} ^{\infty })=E^{*}({\text{point}})[[x\otimes 1,1\otimes x]]}
and
μ
∗
(
x
)
∈
E
∗
(
point
)
[
[
x
⊗
1
,
1
⊗
x
]
]
{\displaystyle \mu ^{*}(x)\in E^{*}({\text{point}})[[x\otimes 1,1\otimes x]]}
is a formal group law over the ring
E
∗
(
point
)
=
π
∗
(
E
)
{\displaystyle E^{*}({\text{point}})=\pi ^{*}(E)}
.
Complex cobordism has a natural complex orientation. Daniel Quillen (1969) showed that there is a natural isomorphism from its coefficient ring to Lazard's universal ring, making the formal group law of complex cobordism into the universal formal group law. In other words, for any formal group law F over any commutative ring R, there is a unique ring homomorphism from MU*(point) to R such that F is the pullback of the formal group law of complex cobordism.
Brown–Peterson cohomology
Complex cobordism over the rationals can be reduced to ordinary cohomology over the rationals, so the main interest is in the torsion of complex cobordism. It is often easier to study the torsion one prime at a time by localizing MU at a prime p; roughly speaking this means one kills off torsion prime to p. The localization MUp of MU at a prime p splits as a sum of suspensions of a simpler cohomology theory called Brown–Peterson cohomology, first described by Brown & Peterson (1966). In practice one often does calculations with Brown–Peterson cohomology rather than with complex cobordism. Knowledge of the Brown–Peterson cohomologies of a space for all primes p is roughly equivalent to knowledge of its complex cobordism.
Conner–Floyd classes
The ring
MU
∗
(
B
U
)
{\displaystyle \operatorname {MU} ^{*}(BU)}
is isomorphic to the formal power series ring
MU
∗
(
point
)
[
[
c
f
1
,
c
f
2
,
…
]
]
{\displaystyle \operatorname {MU} ^{*}({\text{point}})[[cf_{1},cf_{2},\ldots ]]}
where the elements cf are called Conner–Floyd classes. They are the analogues of Chern classes for complex cobordism. They were introduced by Conner & Floyd (1966).
Similarly
MU
∗
(
B
U
)
{\displaystyle \operatorname {MU} _{*}(BU)}
is isomorphic to the polynomial ring
MU
∗
(
point
)
[
[
β
1
,
β
2
,
…
]
]
{\displaystyle \operatorname {MU} _{*}({\text{point}})[[\beta _{1},\beta _{2},\ldots ]]}
Cohomology operations
The Hopf algebra MU*(MU) is isomorphic to the polynomial algebra R[b1, b2, ...], where R is the reduced bordism ring of a 0-sphere.
The coproduct is given by
ψ
(
b
k
)
=
∑
i
+
j
=
k
(
b
)
2
i
j
+
1
⊗
b
j
{\displaystyle \psi (b_{k})=\sum _{i+j=k}(b)_{2i}^{j+1}\otimes b_{j}}
where the notation ()2i means take the piece of degree 2i. This can be interpreted as follows. The map
x
→
x
+
b
1
x
2
+
b
2
x
3
+
⋯
{\displaystyle x\to x+b_{1}x^{2}+b_{2}x^{3}+\cdots }
is a continuous automorphism of the ring of formal power series in x, and the coproduct of MU*(MU) gives the composition of two such automorphisms.
See also
Adams–Novikov spectral sequence
List of cohomology theories
Algebraic cobordism
Notes
References
Adams, J. Frank (1974), Stable homotopy and generalised homology, University of Chicago Press, ISBN 978-0-226-00524-9
Atiyah, Michael Francis (1961), "Bordism and cobordism", Proc. Cambridge Philos. Soc., 57 (2): 200–208, Bibcode:1961PCPS...57..200A, doi:10.1017/S0305004100035064, MR 0126856, S2CID 122937421
Brown, Edgar H. Jr.; Peterson, Franklin P. (1966), "A spectrum whose
Z
p
{\displaystyle \mathbb {Z} _{p}}
cohomology is the algebra of reduced pth powers", Topology, 5 (2): 149–154, doi:10.1016/0040-9383(66)90015-2, MR 0192494.
Conner, Pierre E.; Floyd, Edwin E. (1966), The Relation of Cobordism to K-Theories, Lecture Notes in Mathematics, vol. 28, Berlin-New York: Springer-Verlag, doi:10.1007/BFb0071091, ISBN 978-3-540-03610-4, MR 0216511
Milnor, John (1960), "On the cobordism ring
Ω
∗
{\displaystyle \Omega _{*}}
and a complex analogue, Part I", American Journal of Mathematics, 82 (3): 505–521, doi:10.2307/2372970, JSTOR 2372970
Morava, Jack (2007). "Complex cobordism and algebraic topology". arXiv:0707.3216 [math.HO].
Novikov, Sergei P. (1960), "Some problems in the topology of manifolds connected with the theory of Thom spaces", Soviet Math. Dokl., 1: 717–720. Translation of "О некоторых задачах топологии многообразий, связанных с теорией пространств Тома", Doklady Akademii Nauk SSSR, 132 (5): 1031–1034, MR 0121815, Zbl 0094.35902.
Novikov, Sergei P. (1962), "Homotopy properties of Thom complexes. (Russian)", Mat. Sb., New Series, 57: 407–442, MR 0157381
Quillen, Daniel (1969), "On the formal group laws of unoriented and complex cobordism theory", Bulletin of the American Mathematical Society, 75 (6): 1293–1298, doi:10.1090/S0002-9904-1969-12401-8, MR 0253350.
Ravenel, Douglas C. (1980), "Complex cobordism and its applications to homotopy theory", Proceedings of the International Congress of Mathematicians (Helsinki, 1978), vol. 1, Helsinki: Acad. Sci. Fennica, pp. 491–496, ISBN 978-951-41-0352-0, MR 0562646
Ravenel, Douglas C. (1988), "Complex cobordism theory for number theorists", Elliptic Curves and Modular Forms in Algebraic Topology, Lecture Notes in Mathematics, vol. 1326, Berlin / Heidelberg: Springer, pp. 123–133, doi:10.1007/BFb0078042, ISBN 978-3-540-19490-3, ISSN 1617-9692
Ravenel, Douglas C. (2003), Complex cobordism and stable homotopy groups of spheres (2nd ed.), AMS Chelsea, ISBN 978-0-8218-2967-7, MR 0860042
Rudyak, Yuli B. (2001) [1994], "Cobordism", Encyclopedia of Mathematics, EMS Press
Stong, Robert E. (1968), Notes on cobordism theory, Princeton University Press
Thom, René (1954), "Quelques propriétés globales des variétés différentiables", Commentarii Mathematici Helvetici, 28: 17–86, doi:10.1007/BF02566923, MR 0061823, S2CID 120243638
External links
Complex bordism at the manifold atlas
cobordism cohomology theory at the nLab
Kata Kunci Pencarian:
- Complex cobordism
- Cobordism
- H-cobordism
- List of cohomology theories
- Cobordism ring
- Cohomology
- Brown–Peterson cohomology
- Algebraic cobordism
- Homotopy groups of spheres
- Atiyah–Hirzebruch spectral sequence