nLab
Chern class

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Context

Cohomology

cohomology

Special and general types

Special notions

Variants

Extra structure

Operations

Theorems

Contents

Idea

The Chern classes are the integral characteristic classes

c i:BUB 2ic_i : B U \to B^{2 i} \mathbb{Z}

of the classifying space BU of the unitary group.

Accordingly these are characteristic classes of U-principal bundles and hence of complex vector bundles.

The first Chern class is the unique characteristic class of circle group-principal bundles.

The analogous classes for the orthogonal group are the Pontryagin classes.

Definition

Definition

For n1 the Chern universal characteristic classes c iH 2i(BU(n),) of the classifying space BU(n) of the unitary group are characterized as follows:

  1. c 0=1 and c i=0 if i>n;

  2. for n=1, c 1 is the canonical generator of H 2(BU(1),);

  3. under pullback along the inclusion i:BU(n)BU(n+1) we have i *c i (n+1)=c i (n);

  4. under the inclusion BU(k)×BU(l)BU(k+l) we have i *c i= j=0 ic ic ji.

Properties

General

Proposition

The cohomology ring of BU(n) is the polynomial algebra on the Chern classes:

H (BU(n),)(c 1,,c n).H^\bullet(B U(n), \mathbb{Z}) \simeq \mathbb{Z}(c_1, \cdots, c_n) \,.

First Chern class

In Yang-Mills theory field configurations with non-vanishing second Chern-class (and minimal energy) are called instantons. The second Chern class is the instanton number .

References

Standard textbook references include

or chapter IX of volume II of

A brief introduction is in chapter 23, section 7

Revised on May 30, 2012 15:49:54 by Urs Schreiber (94.136.12.233)
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