nLab S-duality

In the original and restricted sense, S-duality refers to the conjectured Montonen-Olive duality auto-equivalence of (super) Yang-Mills theory in 4 dimensions under which the coupling constant is inverted, and more generally under which the combined coupling constant and theta angle tranform under an action of the modular group. At least for super Yang-Mills theory this conjecture can be argued for in detail.

There is also a duality in string theory called S-duality. Specifically in type IIB superstring theory/F-theory this is given by an action of the modular group on the axio-dilaton, hence is, via the proportionality of the dilaton to the string coupling constant, again a weak-strong coupling duality.

Indeed, at least for super Yang-Mills theory Montonen-Olive S-duality may be understood as a special case of the string duality (Witten 95a, Witten 95b): one may understand N=2 D=4 super Yang-Mills theory as the KK-compactification of the M5-brane 6d (2,0)-superconformal QFT on the F-theory torus (Johnson 97) to get the D3-brane worldvolume theory, and the remnant modular group action on the compactified torus is supposed to be the 4d Montonen-Olive S-duality (Witten 07).

In (super) Yang-Mills theory

General idea

In its original form, S-duality refers to Montonen-Olive duality , which is about the following phenomenon:

The Lagrangian of Yang-Mills theory has two summands,

S_{YM} : \nabla \mapsto \int_X \frac{1}{e^2} \langle F_\nabla \wedge \star F_\nabla\rangle + \int_{X} i \theta \langle F_\nabla \wedge F_\nabla \rangle \,,

each pairing the curvature 2-form with itself in an invariant polynomial, but the first involving the Hodge star operator dual, and the second not. One can combine the coefficients $\frac{1}{e^2}$ and $i \theta$ into a single complex coupling constant

\tau = \frac{\theta}{2 \pi} + \frac{4 \pi i}{e^2} \,.

Montonen-Olive duality asserts that the quantum field theories induced from one such parameter value and another one obtained from it by an action of SL(2,Z) on the upper half plane are equivalent.

This is actually not quite true for ordinary Yang-Mills theory, but seems to be true for N=2 D=4 super Yang-Mills theory.

From compactification of the 6d (2,0)-SCFT and AGT correspondence

In (Witten 95a, Witten 95b, Witten 07) it was suggested that the above S-duality of N=2 D=4 super Yang-Mills theory may be understood geometrically by regarding the super Yang-Mills theory as the Kaluza-Klein compactification of the 6d (2,0)-superconformal QFT – that instead of a gauge field given by a principal bundle with connection involves a principal 2-bundle with 2-connection – on a complex torus. The $SL(2,\mathbb{Z})$ -invariance of the resulting 4-dimensional theory is then the modular group remnant of the conformal invariance of the 6-dimensional theory under conformal transformations of that torus.

Moreover, Witten has suggested that this S-duality secretly drives a host of other subtle phenomena, notably that the geometric Langlands duality (see there for more) is just an aspect of a special case of this.

The AGT correspondence refines this further and regards the 6d (2,0)-superconformal QFT as something like a “2d SCFT with values in 4d super-Yang-Mills theories”. This way the whole mapping class group of general 2d Riemann surfaces acts as a generalized S-duality on 4d super-Yang-Mills theory

In string theory

In string theory, S-duality is supposed to apply to whole string theories and make type II string theory be S-dual to itself and make heterotic string theory be S-dual to type I string theory.

Type IIB S-duality

General idea

Type IIB string theory is obtained by KK-compactification of M-theory on a torus bundle followed by T-dualizing one of the torus cycles. This perspective – referred to as F-theory – exhibits the axio-dilaton of type IIB string theory as the fiber of an elliptic fibration (essentially the torus bundle that M-theory was compactified on (Johnson 97)).

The modular group acts on this elliptic fibration, and this is S-duality for type IIB-strings. In particular the transformation $\tau \mapsto - \frac{1}{\tau}$ inverts the type II coupling constant. See at F-theory for more.

The type IIB F1-string and the D1-brane appear this way by double dimensional reduction from the M2-brane wrapping (either) one of the two cycles of the compactifying torus. S-duality mixes these strings by the evident modular group action on the $(p,q)\in \mathbb{Z}^2$ labels of the (p,q)-strings. Here at least part of the S-duality action on $(p,q)$ -strings may be seen as a system of autoequivalences of the super L-infinity algebras which defines the extended super spacetime constituted by the type II superstring (Bandos 00, FSS 13, section 4.3).

Similarly the D5-brane and the NS5-brane are the double dimensional reduction of the M5-brane wrapping one of the two cycles of the compactifying torus, and hence the S-duality modular group also acts on $(p,q)$ -5-branes, exchanging them.

Finally, the D3-brane is instead the double dimensional reduction of the M5-brane, wrapping both compactifying dimensions. Accordingly the worldvolume theory of the D3, which is super Yang-Mills theory in $d = 4$ has an S-self-duality. That is supposed to be the Montonen-Olive duality discussed above, which is thereby unified with type IIB S-duality.

Cohomological nature of type II fields under S-duality

While F-theory does capture much of this non-perturbative S-duality, there currently remains a puzzle as to the correct differential cohomology nature of all the fields under S-duality: by the above S-duality mixes the Kalb-Ramond field $\hat B_{NS}$ with the degree-3 component $\hat B_{RR}$ of the RR-field. But the best available description of the fine-structure of these fields is (see also at orientifold) that $\hat B_{NS}$ is a cocycle in (twisted) ordinary differential cohomology while $\hat B_{RR}$ is (only) one component of a cocycle in (twisted) KU (or really: KR-theory).

This issue was first highlighted in (DMW 00, section 11). In (DFM 03, section 9) it was observed that taking into account the cubical structure in M-theory on the 11-dimensional Chern-Simons term of the supergravity C-field the conceptual mismatch is alleviated, but not quite resolved. See also (BEJVS 05)

On the other hand, as discussed at cubical structure in M-theory, this structure plausibly relates to a generalized cohomology theory beyond ordinary cohomology and beyond K-theory, namely to elliptic cohomology/tmf. Hints like this led in (KrizSati 05) to the conjecture that the right cohomology theory to capture the S-duality of type IIB/F-theory is modular equivariant elliptic cohomology.

Heterotic/type I duality

Something substantial should go here, for the moment the following is copied from a discussion forum comment by some Olof here:

For the Het/I relation, the first observation is that the massless spectra of the two models agree. Moreover, if we make the identification

G^I_{\mu\nu} = e^{-\Phi_h} G^h_{\mu\nu} , \qquad \Phi^I = - \Phi^h , \qquad \tilde{F}^I_3 = \tilde{H}^h_3 , \qquad A^I_1 = A^h_1

the low energy effective supergravity actions of the two models match. Since the string coupling constants $g_s^I$ and $g_s^h$ are given as the expectation values of the exponentials of the dilatons $\exp(\Phi^I)$ and $\exp(\Phi^h)$ , respectively, the above equations relates the type-I theory at strong coupling to the heterotic theory at weak coupling:

g^I_s = \frac{1}{g^h_s} .

From the relative scaling of the metric in (1) we also see that the string length in the two theories are related by

l^I_s = l^h_s \sqrt{g^h_s}.

As a non-perturbative check we can consider the tension of the type-I D1 brane. The brane is a BPS object, so for all values of the coupling $g_s^I$ the tension is given by the same formula

T^I_{D1} = \frac{1}{g_s^I} \frac{1}{2\pi\left(l^I_s\right)^2} = \frac{g^h_s}{2\pi\left(l^h_s\sqrt{g^h_s}\right)^2} = \frac{1}{2\pi\left(l^h_s\right)^2}

where I’ve used relations (2) and (3). But this is equal to the tension of the fundamental heterotic string

T^h_{F1} = \frac{1}{2\pi\left(l^h_s\right)^2}.

This indicates that it is sensible to identify the strong coupling limit of the type-I D1 brane with the heterotic string.

For type IIA

A priori type IIA superstring theory does not have S-duality, but by compactifying M-theory on a torus one can sort of read off what the non-perturbative additions to type IIA should be that make it have S-duality after all, see

Gottfried Curio, Boris Kors, Dieter Lüst, Fluxes and Branes in Type II Vacua and M-theory Geometry with G(2) and Spin(7) Holonomy, Nucl.Phys.B636:197-224,2002 (arXiv:hep-th/0111165)

Overview

S-duality in string theory

</div>

U-duality | $\updownarrow$ T-duality on $T^2$ |

gauge theory induced via AdS-CFT correspondence

M-theory perspective via AdS7-CFT6	F-theory perspective
11d supergravity/M-theory
$\;\;\;\;\downarrow$ Kaluza-Klein compactification on $S^4$	compactificationon elliptic fibration followed by T-duality
7-dimensional supergravity
$\;\;\;\;\downarrow$ topological sector
7-dimensional Chern-Simons theory
$\;\;\;\;\downarrow$ AdS7-CFT6 holographic duality
6d (2,0)-superconformal QFT on the M5-brane with conformal invariance	M5-brane worldvolume theory
$\;\;\;\; \downarrow$ KK-compactification on Riemann surface	double dimensional reduction on M-theory/F-theory elliptic fibration
N=2 D=4 super Yang-Mills theory with Montonen-Olive S-duality invariance; AGT correspondence	D3-brane worldvolume theory with type IIB S-duality
$\;\;\;\;\; \downarrow$ topological twist
topologically twisted N=2 D=4 super Yang-Mills theory
$\;\;\;\; \downarrow$ KK-compactification on Riemann surface
A-model on $Bun_G$ , Donaldson theory

$\,$

gauge theory induced via AdS5-CFT4
type II string theory
$\;\;\;\;\downarrow$ Kaluza-Klein compactification on $S^5$
$\;\;\;\; \downarrow$ topological sector
5-dimensional Chern-Simons theory
$\;\;\;\;\downarrow$ AdS5-CFT4 holographic duality
N=4 D=4 super Yang-Mills theory
$\;\;\;\;\; \downarrow$ topological twist
topologically twisted N=4 D=4 super Yang-Mills theory
$\;\;\;\; \downarrow$ KK-compactification on Riemann surface
A-model on $Bun_G$ and B-model on $Loc_G$ , geometric Langlands correspondence

Related concepts

duality in physics, duality in string theory

References

Mike Duff, chapter 6 of The World in Eleven Dimensions: Supgergravity, Supermembranes and M-theory, IoP (1999)

In (super-)Yang-Mills theory

It was originally noticed in

Peter Goddard, Jean Nuyts, David Olive, Gauge Theories And Magnetic Charge, Nucl. Phys. B 125 (1977) 1-28 [doi:10.1016/0550-3213(77)90221-8, spire:111435]

that where electric charge in Yang-Mills theory takes values in the weight lattice of the gauge group, then magnetic charge takes values in the lattice of what is now called the Langlands dual group.

This led to the electric/magnetic duality conjecture formulation in

Claus Montonen, David Olive, Magnetic Monopoles As Gauge Particles? Phys. Lett. B72 (1977) 117-120.

According to (Kapustin-Witten 06, pages 3-4) the observaton that the Montonen-Olive dual charge group coincides with the Langlands dual group is due to

Michael Atiyah, private communication to Edward Witten, 1977

Discussion of the duality for abelian gauge theory (electromagnetism) is is

Edward Witten, On S-duality in abelian gauge theory Selecta Mathematica, (2):383-410, 1995 (arXiv:hep-th/9505186)
Jose Barbon, Generalized abelian S-duality and coset constructions, Nuclear Physics B, 452(1):313-330, 1995 (arXiv:hep-th/9506137)
Gerald Kelnhofer, Functional integration and gauge ambiguities in generalized abelian gauge theories J. Geom. Physics, 59:1017-1035, 200

See also the references at electro-magnetic duality.

The insight that the Montonen-Olive duality works more naturally in super Yang-Mills theory is due to

David Olive, Edward Witten, Supersymmetry Algebras That Include Topological Charges, Phys. Lett. B78 (1978) 97-101.

and that it works particularly for N=4 D=4 super Yang-Mills theory is due to

H. Osborn, Topological Charges For $N = 4$ Supersymmetric Gauge Theories And Monopoles Of Spin 1, Phys. Lett. B83 (1979) 321-326.

with further computations in

Cumrun Vafa, Edward Witten, A Strong Coupling Test of S-Duality, Nucl. Phys. B 431 (1994) 3-77 [arXiv:hep-th/9408074]

The observation that the $\mathbb{Z}_2$ electric/magnetic duality extends to an $SL(2,\mathbb{Z})$ -action in this case is due to

John Cardy, E. Rabinovici, Phase Structure Of Zp Models In The Presence Of A Theta Parameter, Nucl. Phys. B205 (1982) 1-16;
John Cardy, Duality And The Theta Parameter In Abelian Lattice Models, Nucl. Phys. B205 (1982) 17-26.
A. Shapere and Frank Wilczek, Selfdual Models With Theta Terms, Nucl. Phys. B320 (1989) 669-695.

The understanding of this $SL(2,\mathbb{Z})$ -symmetry as a remnant conformal transformation on a 6-dimensional principal 2-bundle-theory – the 6d (2,0)-superconformal QFT – compactified on a torus is described in

Edward Witten, pages 4-5 of Some Comments On String Dynamics, Proceedings of String95 (arXiv:hepth/9507121)
Edward Witten, On S-Duality in Abelian Gauge Theory (arXiv:hep-th/9505186)
Edward Witten, Conformal field theory in four and six dimensions (arXiv:0712.0157)

On an algorithm for constructing S-dual quiver gauge theories:

Chiung Hwang, Sara Pasquetti, Matteo Sacchi, Rethinking mirror symmetry as a local duality on fields, Phys. Rev. D 106 (2022) 105014 [arXiv:2110.11362, doi:10.1103/PhysRevD.106.105014]
Riccardo Comi, Chiung Hwang, Fabio Marino, Sara Pasquetti, Matteo Sacchi, The $SL(2, \mathbb{Z})$ dualization algorithm at work [arXiv:2212.10571]

In type II superstring theory

The suggestion of an $SL(2,\mathbb{Z})$ -duality action in type II superstring theory goes back to

John Schwarz, Ashoke Sen, Duality Symmetries Of $4D$ Heterotic Strings, Phys. Lett. 312B (1993) 105-114,
Ashoke Sen, Dyon - Monopole Bound States, Self-Dual Harmonic Forms on the Multi-Monopole Moduli Space, and $SL(2,\mathbb{Z})$ Invariance in String Theory (arXiv:hep-th/9402032)

Duality Symmetric Actions, Nucl. Phys. B411 (1994) 35-63 (arXiv:hep-th/9304154)

Chris Hull, Paul Townsend, Unity of Superstring Dualities, Nucl. Phys. B438:109-137,1995 (arXiv:hep-th/9410167)
John Schwarz, An $SL(2,\mathbb{Z})$ Multiplet of Type IIB Superstrings, Phys.Lett. B360 (1995) 13-18; Erratum-ibid. B364 (1995) 252 (arXiv:hep-th/9508143)

The geometric understanding of S-duality in type II superstring theory via M-theory/F-theory goes maybe back to

Clifford Johnson, From M-theory to F-theory, with Branes, Nucl.Phys. B507 (1997) 227-244 (arXiv:hep-th/9706155)

A textbook account is in

Peter West, section 17.3 of Introduction to Strings and Branes, Cambridge University Press 2012

A 2-loop test is in

Eric D'Hoker, Michael Gutperle, Duong Phong, Two-loop superstrings and S-duality, Nucl.Phys. B 722 (2005) 81-118 (arXiv:hep-th/0503180)

S-duality acting on the worldsheet theory if (p,q)-strings is discussed for instance in

Igor Bandos, Superembedding Approach and S-Duality. A unified description of superstring and super-D1-brane, Nucl. Phys. B 599 197-227 (2001) (arXiv:hep-th/0008249)

Closely related to this, S-duality in type II string theory as an operation on the extended super spacetime super L-infinity algebra is

Domenico Fiorenza, Hisham Sati, Urs Schreiber, section 4.3 of Super Lie n-algebra extensions, higher WZW models and super p-branes with tensor multiplet fields (arXiv:1308.5264)

The cohomological problem of the type II S-duality action on the 3-form flux was originally highlighted in

D. Diaconescu, Gregory Moore, Edward Witten, $E_8$ Gauge Theory, and a Derivation of K-Theory from M-Theory, Adv.Theor.Math.Phys.6:1031-1134 2003 (arXiv:hep-th/0005090)

The conjecture that with combined targetspace/worldsheet modular transformations the type IIB S-duality is reflected in modular equivariant elliptic cohomology is due to

Igor Kriz, Hisham Sati, Type II string theory and modularity, JHEP 0508 (2005) 038 (arXiv:hep-th/0501060)

Relation to geometric Langlands duality

The relation of S-duality to geometric Langlands duality was understood in

Anton Kapustin, Edward Witten, Electric-Magnetic Duality And The Geometric Langlands Program , Communications in number theory and physics, Volume 1, Number 1, 1–236 (2007) (arXiv:hep-th/0604151)

Exposition of this is in

Edward Frenkel, What Do Fermat’s Last Theorem and Electro-magnetic Duality Have in Common? KITP talk 2011 (web)

Last revised on March 13, 2024 at 15:21:00. See the history of this page for a list of all contributions to it.

nLab S-duality

Context

Duality in string theory

String theory

Ingredients

Critical string models

Extended objects

Topological strings

Backgrounds

Phenomenology

Langlands correspondence

Contents

Idea

In (super) Yang-Mills theory

General idea

From compactification of the 6d (2,0)-SCFT and AGT correspondence

In string theory

Type IIB S-duality

General idea

Cohomological nature of type II fields under S-duality

Heterotic/type I duality

For type IIA

Overview

Related concepts

References

In (super-)Yang-Mills theory

In type II superstring theory

Relation to geometric Langlands duality