nLab Green-Schwarz mechanism

Redirected from "Green–Schwarz mechanism".

Contents

Context

String theory

Physics

Differential cohomology

Idea
The higher magnetic charge anomaly

The higher abelian Yang-Mills action functional…
… with electric charge …
… and with magnetic charge.
The anomaly line bundle
The Green-Schwarz mechanism

Examples

Heterotic supergravity
Axions and the strong CP problem in heterotic supergravity

Related concepts
References

General
Higher gauge theory of the Green-Schwarz mechanism

Idea

A Green-Schwarz mechanism (named after Michael Green and John Schwarz) is a modification of an action functional of a quantum field theory involving higher gauge fields that makes a quantum anomaly of the original action functional disappear.

The higher magnetic charge anomaly

The higher abelian Yang-Mills action functional…

Consider on some spacetime $X$ a gauge field $[\nabla] \in H_{diff}^{n+1}(X)$ modeled in ordinary differential cohomology in degree $n+1$ : a circle n-bundle with connection. For instance

in degree $n=1$ this is an electromagnetic field;
in degree $n=2$ this is a Kalb-Ramond field;
in degree $n = 3$ a supergravity C-field.

Canonically associated to the gauge field is its field strength: the curvature differential form

F_\nabla \in \Omega^{n+1}_{cl}(X) \,.

The abelian Yang-Mills action functional for our gauge field (the action functional of higher order electromagnetism) is the function

\exp\big( \mathrm{i} S_{YM}(-) \big) \;\colon\; H_{diff}^{n+1}(X) \to \mathbb{C}

that sends the field $\nabla$

\exp\big( \mathrm{i} S_{YM}(-)\big) \;\colon\; [\nabla] \mapsto \exp\big( - \mathrm{i} \textstyle{\int}_X F_\nabla \wedge \star F_\nabla \big)

to the exponential of the integral over the spacetime $X$ of the differential form obtained as the wedge product of the curvature form with its image under the Hodge star operator correspondonding to the pseudo-Riemannian metric on $X$ .

The fact that this map defined in terms of cocycles is a well defined function on cohomology means that the action functional is gauge invariant. At this point this is just the trivial statement that under a gauge transformation

\nabla \stackrel{g}{\to} \nabla'

the curvature is invariant (due to the higher gauge group being abelian): $F_\nabla = F_{\nabla'}$ .

… with electric charge …

The above action functional describes the dynamics of the gauge field all by itself, with no interactions with other fields or with fundamental particles/fundamental branes.

A distribution of $n$ -electric charge on $X$ is modeled itself by a cocycle $\hat j_E$ in ordinary differential cohomology in degree $dim X - n$

[\hat j_E] \;\in\; H_{diff}^{dim X - n}(X) \,,

so that the curvature $j_E$ of $\hat j_E$ is the electric current form. The action functional that encodes the Lorentz force of the gauge field exerted on this electric charge distribution is locally on coordinate charts $U \subset X$ given by the integral $\int_X A_U \wedge j_E$ , where $A_U$ is the local connection $n$ -form of the gauge field $\nabla$ .

Globally, this contribution is given by the push-forward

2 \pi \mathrm{i} \textstyle{\int}_X (-) \;\colon\; H_{flat}^{dim X + 1}(X) \to H_{flat}^1(*) \;=\; U(1) \,.

of the cup product $\hat j_E \cdot \nabla$ in ordinary differential cohomology.

In total then, the action functional of higher abelian Yang-Mills theory in the presence of electric charge is the function

\exp\big( \mathrm{i} S_{YM}(-) + \mathrm{i} S_{el}(-) \big) \;\;\colon\;\; H^{n+1}_{diff}(X) \times H^{dim X - n}_{diff}(X) \longrightarrow \mathbb{C}

given by

\big( [\nabla], [\hat j_E] \big) \;\mapsto\; \exp\big( \mathrm{i} \textstyle{\int}_X F_\nabla \wedge \star F_\nabla \big) \, \exp\big( 2 \pi \mathrm{i} \int_X \hat j_E \cdot \nabla \big) \,.

[cf. Freed 2002 (2.17)]

… and with magnetic charge.

We now consider one more additional term in the action functional, one that describes moreover the interaction of our gauge field with a distribution of $n$ -magnetic charge on $X$ , in addition to the interaction with the distribution of electric charge described above.

The magnetic charge distribution itself is also modeled as a cocycle $\hat j_B$ in ordinary differential cohomology. As opposed to the electric charge it is however not part of the dynamics but of the kinematics of the system: it does not manifestly show up in the integral expression for the action functional, but does modify the nature of the configuration space that this action functional is defined on.

Namely the kinematic higher Maxwell equations is a condition of the form

\mathrm{d} F_\nabla \;=\; j_B \,,

where $j_B$ is the magnetic charge distribution. If $F_\nabla$ is the curvature of a circle n-bundle with connection, then necessarily $d F_\nabla = 0$ . Therefore the system of higher electromagnetism in the presence of magnetic charge cannot be modeled any more by cocycles in ordinary differential cohomology.

One finds instead that one has to model $\nabla$ not as a circle n-bundle with connection, but as an $n$ -twisted bundle with connection, where the twist is $\hat j_B$ .

We shall write $C^{n+1}_{diff}(X)_{\hat j_B}$ for the ∞-groupoid of twisted cocycles for this fixed twist. The crucial point is now the following:

the above expression

\exp\big( \mathrm{i} S_{el}(\nabla, \hat j_E) \big) \;\colon\; \exp\big( 2 \pi \mathrm{i} \textstyle{\int}_X \hat j_E \cdot \nabla \big)

for the electric coupling can still be given sense, even with $\nabla \in C^{n+1}_{diff}(X)_{\hat j_B}$ , but it no longer has the interpretation of a circle group-valued function. Rather, it has now the interpretation of a section of a line bundle

on configuration space. The characteristic class of this line bundle – its Chern class – is hence the magnetic anomaly in higher gauge theory.

[cf. Freed 2002 (2.29)]

In the next section we formalize properly the notion of this line bundle on configuration space.

The anomaly line bundle

In order to formalize this we have to refine the formalization of the structure of the configuration space. So far we had regarded the set $H^{dim X - n}_{diff}(X) \times H_{diff}^{n+1}(X)$ of gauge equivalence classes of field configurations. This is the set of connected components of the full cocycle ∞-groupoid

C^{dim X - n}_{diff}(X) \times C_{diff}^{n+1}(X) \in \infty Grpd

whose

objects are field configurations on $X$ ;
morphisms are gauge transformations;
2-morphisms are gauge transformations of gauge transformation,
and so on.

Moreover, this cocycle ∞-groupoid is not just a discrete ∞-groupoid but it naturally has smooth structure making it a smooth ∞-groupoid: an ∞-stack over the category SmoothMfd. We shall write

Conf \;\coloneqq\; \Big[ X ,\, \big( \mathbf{B}^{n}U(1) \times \mathbf{B}^{dim X - n-1}U(1) \big)_{conn} \Big] \;\in\; SmoothGrpd_{\infty}

for this smooth $\infty$ -groupoid of configurations of the physical system – defined as the internal hom in terms of the closed monoidal structure on the (∞,1)-topos Smooth∞Grpd of $X \in SmoothMfd \hookrightarrow Smooth\infty Grpd$ into the target object of the higher gauge theory, (this object is discussed in detail here; it is presented under the Dold-Kan correspondence by the Deligne complex of sheaves on CartSp).

This smooth structure is characterized by saying that for any $U \in$ SmoothMfd the $U$ -parameterized smooth families of field configurations, gauge transformations, etc. form the ∞-groupoid

Conf(U) \simeq C^{dim X - n}_{diff}(U \times X) \times C_{diff}^{n+1}(U \times X )

of gauge fields on the product of spacetime $X$ with the parameter space $U$ . (See for instance Lie integration and connection on an ∞-bundle for details on how differential forms on $U \times X$ encode $U$ -families of forms on $X$ ).

This way the configuration space of higher electromagnetism in the presence of electric and magnetic charge is naturally incarnated as an object in the cohesive (∞,1)-topos of smooth ∞-groupoids, and accordingly all the differential geometric structures in cohesive $(\infty,1)$ -topos are available. In particular we may speak of line bundles with connection on $Conf$ , given for instance by morphisms

Anom_{\hat j_B} \;\colon\; Conf \to \mathbf{B} U(1)_{conn} \,.

in Smooth∞Grpd.

We say that:

the underlying class in ordinary cohomology

$[Anom_{\hat j_B}] \in H^2(Conf, \mathbb{Z})$

is the anomaly of the system of higher electromagnetism coupled to electric and magnetic charge;
its curvature 2-form

$Curv_{Anom_{\hat j_B}} \;\colon\; Conf \to \Omega^2_{flat}$

is the differential anomaly.

One finds that this curvature 2-form is given by the fiber integration of the wedge product of the electric current $(n+1)$ -form with the magnetic charge $dim X - n$ -form over $X$ :

Curv_{Anom_{\hat j_B}} \,=\, \textstyle{\int}_X \, j_E \wedge j_B \,.

This means that for every parameter space $U \in$ SmoothMfd and every morphism $\phi : U \to Conf$ – which corresponds by the nature of the ∞-stack $Conf$ to a field configuration $(\nabla, \hat j_E) \in C^{n+1}_{diff}(U \times X) \times C^{dim X - n}_{diff}(U \times X)$ – the pullback of this differential form to $U$ yields the ordinary differential form $\int_X j_E \wedge j_B$ which is the image of $(\nabla, \hat j_E)$ under the fiber integration map

\textstyle{\int}_X(-) \;\colon\; \Omega^\bullet(U \times X) \to \Omega^\bullet(U) \,.

The Green-Schwarz mechanism

We can now state the Green-Schwarz mechanism itself.

Let $\hat Conf \in$ Smooth∞Grpd be the configuration space of a physical system that contains among its fields higher abelian gauge theory with electric charge with configuration space $Conf$

\hat Conf \,=\, Conf_{rest} \times Conf

and equipped with an action functional

\exp\big( \mathrm{i} S_{rest}(-) + \mathrm{i} S_{el}(-) \big) \;\colon\; \hat Conf \to Anom_{rest}

that is a section of an anomaly line bundle $Anom_{rest}$

\array{ && Anom_{rest} \\ & {}^{\mathllap{\exp(S_{tot})}}\nearrow & \downarrow \\ Conf_{rest} &=& Conf_{rest} }

such that the curvature 2-form of $Anom_{tot}$ happens to be of the form

Curv{Anom_{ref}} \,=\, \textstyle{\int}_X I_{n+2} \wedge j_{el} \,,

for some $I_{n+2} \in \Omega^{n+2}_{cl}(X)$ (understood, as explained above, as forms in $\Omega^{n+2}_{cl}(X\times U)$ ) and $j_{el} \in \Omega^{dim X - n}(X)$ .

Then the Green-Schwarz mechanism is the map that changes this physical system by adding magnetic charge to it, given by a cocycle $\hat j_B$ with

[\hat j_B] \,=\, - [Anom_{rest}]

j_B \,=\, - I_{n+2} \,.

This means, by the above, that the new action functional is now a section

\exp\big( \mathrm{i} S_{rest}(-) + \mathrm{i} S_{el}(-) \big) \,\colon\, Conf_{rest} \times Conf \to Anom_{rest} \otimes Anom_{\hat j_B}

of the tensor product of the two anomaly line bundles. The first Chern class of the tensor product is the sum of the two 1st Chern-classes, hence by definition of $j_B$ they cancel, so that $Anom_{rest} \otimes Anom_{\hat j_B}$ is trivializatable as a line bundle with connection.

A choice of such trivialization identifies the section then with an ordinary function

\exp\big( \mathrm{i} S_{rest}(-) + \mathrm{i} S_{el}(-)\big) \;\colon\; Conf_{rest} \times Conf \to U(1) \,.

This is the anomaly-free action functional after the Green-Schwarz mechanism has been applied.

Examples

Heterotic supergravity

The original work of Green-Schwarz concerned anomaly cancellation in the effective supergravity theory on a $dim X = 10$ -dimensional target spacetime in heterotic string theory.

The configurations of this theory are given by

a Spin-principal bundle with connection $\hat \omega$ – the spin connection (the graviton);
a unitary group-principal bundle with connection $\hat A$ (the Yang-Mills field);
a circle 2-bundle with connection $\hat B$ – the Kalb-Ramond field.
sections of the associated spinor bundles: the fermions $\psi$ (gravitino, gaugino, dilatino).

The path integral over the fermionic part of the action

\exp(i S_{ferm}(-)) : (\omega, A, B, \psi) \mapsto \exp(i \int_X \bar \psi D_{\omega,A} \psi)

is an anomalous action functional on the configuration space of the remaining bosonic fields $(\hat A, \hat \omega)$ , a section of a Pfaffian line bundle, whose curvature form turns out to be

curv_{Pfaff} = \int_X I_4 \wedge I_8

with

I_4 = \frac{1}{2} p_1(F_\omega) - ch_2(F_A)

the difference between the (image in de Rham cohomology of the) first fractional Pontryagin class of the $Spin$ -principal bundle and second Chern class of the unitary group-principal bundle

and

I_8 = \frac{1}{48} p_2(F_\omega) - ch_4(F_A) + ...

where the ellipses indicate decomposable curvature characteristic forms.

Therefore in this case the Green-Schwarz mechanism consists of

adding to the system fivebrane magnetic charge $j_B \in \Omega^{2+2}$ given by $I_4$ .

This means that the Kalb-Ramond field $\hat B$ becomes a twisted field whose field strength $H$ is no longer closed, but satisfies the kinematical Maxwell equation

$d H = I_4 \,.$
adding to the system string electric charge $j_E \in \Omega^{10 - 2}(X)$ .

This means that to the action functional is added the factor

\exp(i \int_X \hat B \cdot \hat I_8 )

which is locally on $U \hookrightarrow X$ given in the exponent by the integral

\int_U B_U \wedge I_8 \,.

The nature of the field configuration obtained this way – spin connection with twist of th Kalb-Ramond field by the Pontryagin class – may be understood conciesely as constituting a twisted differential string structure on $X$ . See there for more details.

Axions and the strong CP problem in heterotic supergravity

The Green-Schwarz anomaly cancellation mechanism naturally makes the twisted B-field in heterotic string theory behave like the axion with the correct potential to serve as the theta angle and serve as the solution to the strong CP problem (Svrcek-Witten 06):

An obvious question about the axion hypothesis is how natural it really is. Why introduce a global PQ “symmetry” if it is not actually a symmetry? What is the sense in constraining a theory so that the classical Lagrangian possesses a certain symmetry if the symmetry is actually anomalous? It could be argued that the best evidence that PQ “symmetries” are natural comes from string theory, which produces them without any contrivance. … the string compactifications always generate PQ symmetries, often spontaneously broken at the string scale and producing axions, but sometimes unbroken.(Svrcek-Witten 06, pages 3-4)

In heterotic string theory KK-compactified to 4d, the 4d B-field, dualized, serves as the axion field, called the “model independent axion” (Svrcek-Witten 06, starting p. 15).

This works as follows: By the Green-Schwarz anomaly cancellation mechanism, then B-field in heterotic string theory is a twisted 2-form field, whose field strength $H$ locally has in addition to the exact differential $d B$ also a fundamental 3-form contribution, so that

H = d B + C

(locally). Moreover, the differential $d H$ is constrained to be the Pontryagin 4-form of the gauge potential $\nabla$ (minus that of the Riemann curvature, but let’s suppress this notationally for the present purpose):

d H = tr \left(F_\nabla \wedge F_\nabla\right) \,.

Now suppose KK-compactification to 4d has been taken care of, then this constraint may be implemented in the equations of motion by adding it to the action functional, multiplied with a Lagrange multiplier :

S = \underset{ \text{kinetic action} \atop \text{for B-field} }{ \underbrace{\int_X H \wedge \star H} } + \underset{ \text{Green-Schwarz constraint} }{ \underbrace{ \int_X a \left( d H - tr(F_\nabla \wedge F_\nabla) \right) } } \,.

Now by the usual argument, one says that instead of varying by $a$ and thus implementing the Green-Schwarz anomaly cancellation constraint, it is equivalent to fist vary with respect to the other fields, and then insert the resulting equations in terms of $a$ into the action functional.

Now since we are dealing with a twisted B-field, with free 3-form component $C$ , we actually vary with respect to $C$ . This yields the Euler-Lagrange equation of motion

d a = \star H \,,

hence the usual relation or electro-magnetic duality, expressing what used to be the Lagrange multiplier now as the magentic dual field to the twisted B-field.

Plugging this algebraic equation of motion back into the above action functional for $H$ gives

\tilde S = \underset{\text{kinetic action} \atop \text{for axion field}}{\underbrace{\int_X d a \wedge \star d a}} + \underset{\text{axionic} \atop \text{interaction}}{\underbrace{\int_X a \, tr(F_\nabla \wedge F_\nabla)}} \,.

Related concepts

Freed-Witten anomaly

References

General

The original articles:

Michael Green, John Schwarz, Anomaly Cancellation in Supersymmetric $D=10$ Gauge Theory and Superstring Theory, Phys. Lett. B 149 (1984) 117-122 (spire:15583, doi:10.1016/0370-2693(84)91565-X)
Philip Candelas, Gary Horowitz, Andrew Strominger, Edward Witten, p. 49 of: Vacuum configurations for superstrings, Nuclear Physics B Volume 258, 1985, Pages 46-74 (doi:10.1016/0550-3213(85)90602-9)

Higher gauge theory of the Green-Schwarz mechanism

Discussion of higher gauge theory modeling the Green-Schwarz mechanisms for anomaly cancellation in heterotic string theory, on M5-branes, and in related systems in terms of some kind of nonabelian differential cohomology (ordered by arXiv time-stamp):

Hisham Sati, Urs Schreiber, Jim Stasheff, pp. 13 in: $L_\infty$ -algebra connections and applications to String- and Chern-Simons $n$ -transport, in Quantum Field Theory, Birkhäuser (2009) 303-424 [arXiv:0801.3480, doi:10.1007/978-3-7643-8736-5_17]
Hisham Sati, Urs Schreiber, Jim Stasheff, Twisted Differential String and Fivebrane Structures, Comm. Math. Phys. 315 (2012) 169-213 (arXiv:0910.4001, doi:10.1007/s00220-012-1510-3)

(via adjusted Weil algebras, see there for more)
Domenico Fiorenza, Hisham Sati, Urs Schreiber, §3.7, §3.8 in: Multiple M5-branes, String 2-connections, and 7d nonabelian Chern-Simons theory, Adv. Theor. Math. Phys. 18 (2014) 229-321 [arXiv:1201.5277, euclid:atmp/1414414836]
Domenico Fiorenza, Hisham Sati, Urs Schreiber, The $E_8$ moduli 3-stack of the C-field in M-theory, Comm. Math. Phys. 333 1 (2015) 117-151 [arXiv:1202.2455, doi:10.1007/s00220-014-2228-1]
Clay Cordova, Thomas Dumitrescu, Kenneth Intriligator, Exploring 2-Group Global Symmetries, J. High Energ. Phys. 2019 184 (2019) (arXiv:1802.04790, doi:10.1007/JHEP02(2019)184)
Francesco Benini, Clay Cordova, Po-Shen Hsin, On 2-Group Global Symmetries and Their Anomalies, J. High Energ. Phys. 2019 118 (2019) (arXiv:1803.09336, doi:10.1007/JHEP03(2019)118)
Domenico Fiorenza, Hisham Sati, Urs Schreiber, Twistorial Cohomotopy implies Green-Schwarz anomaly cancellation, Reviews in Mathematical Physics 34 05 (2022) 2250013 [doi:10.1142/S0129055X22500131, arXiv:2008.08544]
Clay Cordova, Thomas T. Dumitrescu, Kenneth Intriligator, 2-Group Global Symmetries and Anomalies in Six-Dimensional Quantum Field Theories, J. High Energ. Phys. 2021, 252 (2021) (arXiv:2009.00138, doi:10.1007/JHEP04(2021)252)
Michele Del Zotto, Kantaro Ohmori, 2-Group Symmetries of 6D Little String Theories and T-Duality, Annales Henri Poincaré 22 (2021) 2451–2474 [arXiv:2009.03489, doi:10.1007/s00023-021-01018-3]
Hisham Sati, Urs Schreiber, The character map in equivariant twistorial Cohomotopy implies the Green-Schwarz mechanism with heterotic M5-branes [arXiv:2011.06533]
Hisham Sati, Urs Schreiber, §2.9 in: M/F-Theory as Mf-Theory, Reviews in Mathematical Physics 35 10 (2023) [doi:10.1142/S0129055X23500289, arXiv:2103.01877]
Yasunori Lee, Kantaro Ohmori, Yuji Tachikawa, Matching higher symmetries across Intriligator-Seiberg duality, J. High Energ. Phys. 2021 114 (2021) [arXiv:2108.05369, doi:10.1007/JHEP10(2021)114]
Monica Jinwoo Kang, Sungkyung Kang, Central extensions of higher groups: Green-Schwarz mechanism and 2-connections [arXiv:2311.14666]

Last revised on August 22, 2024 at 10:58:14. See the history of this page for a list of all contributions to it.

nLab Green-Schwarz mechanism

Context

String theory

Ingredients

Critical string models

Extended objects

Topological strings

Backgrounds

Phenomenology