# Chern–Weil homomorphism

(Redirected from Chern–Weil theory)

In mathematics, the Chern–Weil homomorphism is a basic construction in Chern–Weil theory that computes topological invariants of vector bundles and principal bundles on a smooth manifold M in terms of connections and curvature representing classes in the de Rham cohomology rings of M. That is, the theory forms a bridge between the areas of algebraic topology and differential geometry. It was developed in the late 1940s by Shiing-Shen Chern and André Weil, in the wake of proofs of the generalized Gauss–Bonnet theorem. This theory was an important step in the theory of characteristic classes.

Let G be a real or complex Lie group with Lie algebra ${\displaystyle {\mathfrak {g}}}$; and let ${\displaystyle \mathbb {C} [{\mathfrak {g}}]}$ denote the algebra of ${\displaystyle \mathbb {C} }$-valued polynomials on ${\displaystyle {\mathfrak {g}}}$ (exactly the same argument works if we used ${\displaystyle \mathbb {R} }$ instead of ${\displaystyle \mathbb {C} }$.) Let ${\displaystyle \mathbb {C} [{\mathfrak {g}}]^{G}}$ be the subalgebra of fixed points in ${\displaystyle \mathbb {C} [{\mathfrak {g}}]}$ under the adjoint action of G; that is, it consists of all polynomials f such that for any g in G and x in ${\displaystyle {\mathfrak {g}}}$, ${\displaystyle f(\operatorname {Ad} _{g}x)=f(x).}$

Given principal G-bundle P on M, there is an associated homomorphism of ${\displaystyle \mathbb {C} }$-algebras

${\displaystyle \mathbb {C} [{\mathfrak {g}}]^{G}\to H^{*}(M;\mathbb {C} )}$

called the Chern–Weil homomorphism, where on the right cohomology is de Rham cohomology. This homomorphism is obtained by taking invariant polynomials in the curvature of any connection on the given bundle. If G is either compact or semi-simple, then the cohomology ring of the classifying space for G-bundles BG is isomorphic to the algebra ${\displaystyle \mathbb {C} [{\mathfrak {g}}]^{G}}$ of invariant polynomials:

${\displaystyle H^{*}(BG;\mathbb {C} )\cong \mathbb {C} [{\mathfrak {g}}]^{G}.}$

(The cohomology ring of BG can still be given in the de Rham sense:

${\displaystyle H^{k}(BG;\mathbb {C} )=\varinjlim \operatorname {ker} (d:\Omega ^{k}(B_{j}G)\to \Omega ^{k+1}(B_{j}G))/\operatorname {im} d.}$

when ${\displaystyle BG=\varinjlim B_{j}G}$ and ${\displaystyle B_{j}G}$ are manifolds.)

## Definition of the homomorphism

Choose any connection form ω in P, and let Ω be the associated curvature 2-form; i.e., Ω = Dω, the exterior covariant derivative of ω. If ${\displaystyle f\in \mathbb {C} [{\mathfrak {g}}]^{G}}$ is a homogeneous polynomial function of degree k; i.e., ${\displaystyle f(ax)=a^{k}f(x)}$ for any complex number a and x in ${\displaystyle {\mathfrak {g}}}$, then, viewing f as a symmetric multilinear functional on ${\displaystyle \prod _{1}^{k}{\mathfrak {g}}}$ (see the ring of polynomial functions), let

${\displaystyle f(\Omega )}$

be the (scalar-valued) 2k-form on P given by

${\displaystyle f(\Omega )(v_{1},\dots ,v_{2k})={\frac {1}{(2k)!}}\sum _{\sigma \in {\mathfrak {S}}_{2k}}\epsilon _{\sigma }f(\Omega (v_{\sigma (1)},v_{\sigma (2)}),\dots ,\Omega (v_{\sigma (2k-1)},v_{\sigma (2k)}))}$

where vi are tangent vectors to P, ${\displaystyle \epsilon _{\sigma }}$ is the sign of the permutation ${\displaystyle \sigma }$ in the symmetric group on 2k numbers ${\displaystyle {\mathfrak {S}}_{2k}}$ (see Lie algebra-valued forms#Operations as well as Pfaffian).

If, moreover, f is invariant; i.e., ${\displaystyle f(\operatorname {Ad} _{g}x)=f(x)}$, then one can show that ${\displaystyle f(\Omega )}$ is a closed form, it descends to a unique form on M and that the de Rham cohomology class of the form is independent of ω. First, that ${\displaystyle f(\Omega )}$ is a closed form follows from the next two lemmas:[1]

Lemma 1: The form ${\displaystyle f(\Omega )}$ on P descends to a (unique) form ${\displaystyle {\overline {f}}(\Omega )}$ on M; i.e., there is a form on M that pulls-back to ${\displaystyle f(\Omega )}$.
Lemma 2: If a form φ on P descends to a form on M, then dφ = Dφ.

Indeed, Bianchi's second identity says ${\displaystyle D\Omega =0}$ and, since D is a graded derivation, ${\displaystyle Df(\Omega )=0.}$ Finally, Lemma 1 says ${\displaystyle f(\Omega )}$ satisfies the hypothesis of Lemma 2.

To see Lemma 2, let ${\displaystyle \pi :P\to M}$ be the projection and h be the projection of ${\displaystyle T_{u}P}$ onto the horizontal subspace. Then Lemma 2 is a consequence of the fact that ${\displaystyle d\pi (hv)=d\pi (v)}$ (the kernel of ${\displaystyle d\pi }$ is precisely the vertical subspace.) As for Lemma 1, first note

${\displaystyle f(\Omega )(dR_{g}(v_{1}),\dots ,dR_{g}(v_{2k}))=f(\Omega )(v_{1},\dots ,v_{2k}),\,R_{g}(u)=ug;}$

which is because ${\displaystyle R_{g}^{*}\Omega =\operatorname {Ad} _{g^{-1}}\Omega }$ and f is invariant. Thus, one can define ${\displaystyle {\overline {f}}(\Omega )}$ by the formula:

${\displaystyle {\overline {f}}(\Omega )({\overline {v_{1}}},\dots ,{\overline {v_{2k}}})=f(\Omega )(v_{1},\dots ,v_{2k})}$

where ${\displaystyle v_{i}}$ are any lifts of ${\displaystyle {\overline {v_{i}}}}$: ${\displaystyle d\pi (v_{i})={\overline {v}}_{i}}$.

Next, we show that the de Rham cohomology class of ${\displaystyle {\overline {f}}(\Omega )}$ on M is independent of a choice of connection.[2] Let ${\displaystyle \omega _{0},\omega _{1}}$ be arbitrary connection forms on P and let ${\displaystyle p:P\times \mathbb {R} \to P}$ be the projection. Put

${\displaystyle \omega '=t\,p^{*}\omega _{1}+(1-t)\,p^{*}\omega _{0}}$

where t is a smooth function on ${\displaystyle P\times \mathbb {R} }$ given by ${\displaystyle (x,s)\mapsto s}$. Let ${\displaystyle \Omega ',\Omega _{0},\Omega _{1}}$ be the curvature forms of ${\displaystyle \omega ',\omega _{0},\omega _{1}}$. Let ${\displaystyle i_{s}:M\to M\times \mathbb {R} ,\,x\mapsto (x,s)}$ be the inclusions. Then ${\displaystyle i_{0}}$ is homotopic to ${\displaystyle i_{1}}$. Thus, ${\displaystyle i_{0}^{*}{\overline {f}}(\Omega ')}$ and ${\displaystyle i_{1}^{*}{\overline {f}}(\Omega ')}$ belong to the same de Rham cohomology class by the homotopy invariance of de Rham cohomology. Finally, by naturality and by uniqueness of descending,

${\displaystyle i_{0}^{*}{\overline {f}}(\Omega ')={\overline {f}}(\Omega _{0})}$

and the same for ${\displaystyle \Omega _{1}}$. Hence, ${\displaystyle {\overline {f}}(\Omega _{0}),{\overline {f}}(\Omega _{1})}$ belong to the same cohomology class.

The construction thus gives the linear map: (cf. Lemma 1)

${\displaystyle \mathbb {C} [{\mathfrak {g}}]_{k}^{G}\rightarrow H^{2k}(M;\mathbb {C} ),\,f\mapsto \left[{\overline {f}}(\Omega )\right].}$

In fact, one can check that the map thus obtained:

${\displaystyle \mathbb {C} [{\mathfrak {g}}]^{G}\rightarrow H^{*}(M;\mathbb {C} )}$

is an algebra homomorphism.

## Example: Chern classes and Chern character

Let ${\displaystyle G=GL_{n}(\mathbb {C} )}$ and ${\displaystyle {\mathfrak {g}}={\mathfrak {gl}}_{n}(\mathbb {C} )}$ its Lie algebra. For each x in ${\displaystyle {\mathfrak {g}}}$, we can consider its characteristic polynomial in t:

${\displaystyle \det \left(I-t{x \over 2\pi i}\right)=\sum _{k=0}^{n}f_{k}(x)t^{k},}$[3]

where i is the square root of -1. Then ${\displaystyle f_{k}}$ are invariant polynomials on ${\displaystyle {\mathfrak {g}}}$, since the left-hand side of the equation is. The k-th Chern class of a smooth complex-vector bundle E of rank n on a manifold M:

${\displaystyle c_{k}(E)\in H^{2k}(M,\mathbb {Z} )}$

is given as the image of fk under the Chern–Weil homomorphism defined by E (or more precisely the frame bundle of E). If t = 1, then ${\displaystyle \det \left(I-{x \over 2\pi i}\right)=1+f_{1}(x)+\cdots +f_{n}(x)}$ is an invariant polynomial. The total Chern class of E is the image of this polynomial; that is,

${\displaystyle c(E)=1+c_{1}(E)+\cdots +c_{n}(E).}$

Directly from the definition, one can show cj, c given above satisfy the axioms of Chern classes. For example, for the Whitney sum formula, we consider

${\displaystyle c_{t}(E)=[\det \left(I-t{\Omega /2\pi i}\right)]}$

where we wrote Ω for the curvature 2-form on M of the vector bundle E (so it is the descendent of the curvature form on the frame bundle of E). The Chern–Weil homomorphism is the same if one uses this Ω. Now, suppose E is a direct sum of vector bundles Ei's and Ωi the curvature form of Ei so that, in the matrix term, Ω is the block diagonal matrix with ΩI's on the diagonal. Then, since ${\displaystyle \det(I-t\Omega /2\pi i)=\det(I-t\Omega _{1}/2\pi i)\wedge \dots \wedge \det(I-t\Omega _{m}/2\pi i)}$, we have:

${\displaystyle c_{t}(E)=c_{t}(E_{1})\cdots c_{t}(E_{m})}$

where on the right the multiplication is that of a cohomology ring: cup product. For the normalization property, one computes the first Chern class of the complex projective line; see Chern class#Example: the complex tangent bundle of the Riemann sphere.

Since ${\displaystyle \Omega _{E\otimes E'}=\Omega _{E}\otimes I_{E'}+I_{E}\otimes \Omega _{E'}}$,[4] we also have:

${\displaystyle c_{1}(E\otimes E')=c_{1}(E)\operatorname {rk} (E')+\operatorname {rk} (E)c_{1}(E').}$

Finally, the Chern character of E is given by

${\displaystyle \operatorname {ch} (E)=[\operatorname {tr} (e^{-\Omega /2\pi i})]\in H^{*}(M,\mathbb {Q} )}$

where Ω is the curvature form of some connection on E (since Ω is nilpotent, it is a polynomial in Ω.) Then ch is a ring homomorphism:

${\displaystyle \operatorname {ch} (E\oplus F)=\operatorname {ch} (E)+\operatorname {ch} (F),\,\operatorname {ch} (E\otimes F)=\operatorname {ch} (E)\operatorname {ch} (F).}$

Now suppose, in some ring R containing the cohomology ring H(M, C), there is the factorization of the polynomial in t:

${\displaystyle c_{t}(E)=\prod _{j=0}^{n}(1+\lambda _{j}t)}$

where λj are in R (they are sometimes called Chern roots.) Then ${\displaystyle \operatorname {ch} (E)=e^{\lambda _{j}}}$.

## Example: Pontrjagin classes

If E is a smooth real vector bundle on a manifold M, then the k-th Pontrjagin class of E is given as:

${\displaystyle p_{k}(E)=(-1)^{k}c_{2k}(E\otimes \mathbb {C} )\in H^{4k}(M;\mathbb {Z} )}$

where we wrote ${\displaystyle E\otimes \mathbb {C} }$ for the complexification of E. Equivalently, it is the image under the Chern–Weil homomorphism of the invariant polynomial ${\displaystyle g_{2k}}$ on ${\displaystyle {\mathfrak {gl}}_{n}(\mathbb {R} )}$ given by:

${\displaystyle \operatorname {det} \left(I-t{x \over 2\pi }\right)=\sum _{k=0}^{n}g_{k}(x)t^{k}.}$

## The homomorphism for holomorphic vector bundles

Let E be a holomorphic (complex-)vector bundle on a complex manifold M. The curvature form Ω of E, with respect to some hermitian metric, is not just a 2-form, but is in fact a (1, 1)-form (see holomorphic vector bundle#Hermitian metrics on a holomorphic vector bundle). Hence, the Chern–Weil homomorphism assumes the form: with ${\displaystyle G=GL_{n}(\mathbb {C} )}$,

${\displaystyle \mathbb {C} [{\mathfrak {g}}]_{k}\to H^{k,k}(M;\mathbb {C} ),f\mapsto [f(\Omega )].}$

## Notes

1. ^ Kobayashi-Nomizu 1969, Ch. XII.
2. ^ The argument for the independent of a choice of connection here is taken from: Akhil Mathew, Notes on Kodaira vanishing "Archived copy" (PDF). Archived from the original (PDF) on 2014-12-17. Retrieved 2014-12-11.. Kobayashi-Nomizu, the main reference, gives a more concrete argument.
3. ^ Editorial note: This definition is consistent with the reference except we have t, which is t −1 there. Our choice seems more standard and is consistent with our "Chern class" article.
4. ^ Proof: By definition, ${\displaystyle \nabla ^{E\otimes E'}(s\otimes s')=\nabla ^{E}s\otimes s'+s\otimes \nabla ^{E'}s'}$. Now compute the square of ${\displaystyle \nabla ^{E\otimes E'}}$ using Leibniz's rule.

## References

• Bott, R. (1973), "On the Chern–Weil homomorphism and the continuous cohomology of Lie groups", Advances in Mathematics, 11: 289–303, doi:10.1016/0001-8708(73)90012-1.
• Chern, S.-S. (1951), Topics in Differential Geometry, Institute for Advanced Study, mimeographed lecture notes.
• Shiing-Shen Chern, Complex Manifolds Without Potential Theory (Springer-Verlag Press, 1995) ISBN 0-387-90422-0, ISBN 3-540-90422-0.
The appendix of this book: "Geometry of Characteristic Classes" is a very neat and profound introduction to the development of the ideas of characteristic classes.
• Chern, S.-S.; Simons, J (1974), "Characteristic forms and geometric invariants", Annals of Mathematics. Second Series, 99 (1): 48–69, JSTOR 1971013.
• Kobayashi, S.; Nomizu, K. (1963), Foundations of Differential Geometry, Vol. 2 (new ed.), Wiley-Interscience (published 2004).
• Narasimhan, M.; Ramanan, S. (1961), "Existence of universal connections", Amer. J. Math., 83: 563–572, doi:10.2307/2372896, JSTOR 2372896.
• Morita, Shigeyuki (2000), "Geometry of Differential Forms", Translations of Mathematical Monographs, 201.