In theoretical physics, supergravity (supergravity theory; SUGRA for short) is a field theory that combines the principles of supersymmetry and general relativity. Together, these imply that, in supergravity, the supersymmetry is a local symmetry (in contrast to nongravitational supersymmetric theories, such as the Minimal Supersymmetric Standard Model). Since the generators of supersymmetry (SUSY) are convoluted with the Poincaré group to form a superPoincaré algebra, it can be seen that supergravity follows naturally from supersymmetry.^{[1]} All traditional literature on supergravity is generally written in terms of Cartan connections.^{[2]}
Contents

Gravitons 1

History 2

Gauge supersymmetry 2.1

SUGRA 2.2

mSUGRA 2.3

11d: the maximal SUGRA 2.4

The end of the SUGRA era 2.5

The second superstring revolution 2.6

Relation to superstrings 3

4D N = 1 SUGRA 4

N = 8 supergravity in 4 dimensions 5

Higherdimensional SUGRA 6

See also 7

Notes 8

References 9

Historical 9.1

General 9.2
Gravitons
Like any field theory of gravity, a supergravity theory contains a spin2 field whose quantum is the graviton. Supersymmetry requires the graviton field to have a superpartner. This field has spin 3/2 and its quantum is the gravitino. The number of gravitino fields is equal to the number of supersymmetries.
History
Gauge supersymmetry
The first theory^{[1]} of local supersymmetry was proposed in 1975 by Dick Arnowitt and Pran Nath and was called gauge supersymmetry.
SUGRA
SUGRA, or supergravity, was discovered in 1976 by Dan Freedman, Sergio Ferrara and Peter van Nieuwenhuizen,^{[1]} but was quickly generalized to many different theories in various numbers of dimensions and additional (N) supersymmetry charges. Supergravity theories with N>1 are usually referred to as extended supergravity (SUEGRA). Some supergravity theories were shown to be equivalent to certain higherdimensional supergravity theories via dimensional reduction (e.g. N = 1 11dimensional supergravity is dimensionally reduced on S^{7} to N = 8, d = 4 SUGRA). The resulting theories were sometimes referred to as Kaluza–Klein theories as Kaluza and Klein constructed in 1919 a 5dimensional gravitational theory, that when dimensionally reduced on circle, its 4dimensional nonmassive modes describe electromagnetism coupled to gravity.
mSUGRA
mSUGRA means minimal SUper GRAvity. The construction of a realistic model of particle interactions within the N = 1 supergravity framework where supersymmetry (SUSY) is broken by a super Higgs mechanism was carried out by Ali Chamseddine, Richard Arnowitt and Pran Nath in 1982. In these classes of models collectively now known as minimal supergravity Grand Unification Theories (mSUGRA GUT), gravity mediates the breaking of SUSY through the existence of a hidden sector. mSUGRA naturally generates the Soft SUSY breaking terms which are a consequence of the Super Higgs effect. Radiative breaking of electroweak symmetry through Renormalization Group Equations (RGEs) follows as an immediate consequence. mSUGRA is one of the most widely investigated models of particle physics due to its predictive power—requiring only four input parameters and a sign to determine the low energy phenomenology from the scale of Grand Unification.
11d: the maximal SUGRA
One of these supergravities, the 11dimensional theory, generated considerable excitement as the first potential candidate for the theory of everything. This excitement was built on four pillars, two of which have now been largely discredited:

Werner Nahm showed^{[3]} that 11 dimensions was the largest number of dimensions consistent with a single graviton, and that a theory with more dimensions would also have particles with spins greater than 2. These problems are avoided in 12 dimensions if two of these dimensions are timelike, as has been often emphasized by Itzhak Bars.

In 1978, Eugène Cremmer, Bernard Julia and Joël Scherk (CJS) found^{[5]} the classical action for an 11dimensional supergravity theory. This remains today the only known classical 11dimensional theory with local supersymmetry and no fields of spin higher than two. Other 11dimensional theories are known that are quantummechanically inequivalent to the CJS theory, but classically equivalent (that is, they reduce to the CJS theory when one imposes the classical equations of motion). For example, in the mid 1980s Bernard de Wit and Hermann Nicolai found an alternate theory in D=11 Supergravity with Local SU(8) Invariance. This theory, while not manifestly Lorentzinvariant, is in many ways superior to the CJS theory in that, for example, it dimensionallyreduces to the 4dimensional theory without recourse to the classical equations of motion.
Thus, the first two results appeared to establish 11 dimensions uniquely, the third result appeared to specify the theory, and the last result explained why the observed universe appears to be fourdimensional.
Many of the details of the theory were fleshed out by Peter van Nieuwenhuizen, Sergio Ferrara and Daniel Z. Freedman.
The end of the SUGRA era
The initial excitement over 11dimensional supergravity soon waned, as various failings were discovered, and attempts to repair the model failed as well. Problems included:

The compact manifolds which were known at the time and which contained the standard model were not compatible with supersymmetry, and could not hold quarks or leptons. One suggestion was to replace the compact dimensions with the 7sphere, with the symmetry group SO(8), or the squashed 7sphere, with symmetry group SO(5) times SU(2).

Until recently, the physical neutrinos seen in experiments were believed to be massless, and appeared to be lefthanded, a phenomenon referred to as the chirality of the Standard Model. It was very difficult to construct a chiral fermion from a compactification — the compactified manifold needed to have singularities, but physics near singularities did not begin to be understood until the advent of orbifold conformal field theories in the late 1980s.

Supergravity models generically result in an unrealistically large cosmological constant in four dimensions, and that constant is difficult to remove, and so require finetuning. This is still a problem today.

Quantization of the theory led to quantum field theory gauge anomalies rendering the theory inconsistent. In the intervening years physicists have learned how to cancel these anomalies.
Some of these difficulties could be avoided by moving to a 10dimensional theory involving superstrings. However, by moving to 10 dimensions one loses the sense of uniqueness of the 11dimensional theory.
The core breakthrough for the 10dimensional theory, known as the first superstring revolution, was a demonstration by Michael B. Green, John H. Schwarz and David Gross that there are only three supergravity models in 10 dimensions which have gauge symmetries and in which all of the gauge and gravitational anomalies cancel. These were theories built on the groups SO(32) and E_8 \times E_8, the direct product of two copies of E_{8}. Today we know that, using Dbranes for example, gauge symmetries can be introduced in other 10dimensional theories as well.^{[7]}
The second superstring revolution
Initial excitement about the 10dimensional theories, and the string theories that provide their quantum completion, died by the end of the 1980s. There were too many Calabi–Yaus to compactify on, many more than Yau had estimated, as he admitted in December 2005 at the 23rd International Solvay Conference in Physics. None quite gave the standard model, but it seemed as though one could get close with enough effort in many distinct ways. Plus no one understood the theory beyond the regime of applicability of string perturbation theory.
There was a comparatively quiet period at the beginning of the 1990s; however, several important tools were developed. For example, it became apparent that the various superstring theories were related by "string dualities", some of which relate weak stringcoupling (i.e. perturbative) physics in one model with strong stringcoupling (i.e. nonperturbative) in another.
Then it all changed, in what is known as the second superstring revolution. Joseph Polchinski realized that obscure string theory objects, called Dbranes, which he had discovered six years earlier, are stringy versions of the pbranes that were known in supergravity theories. The treatment of these pbranes was not restricted by string perturbation theory; in fact, thanks to supersymmetry, pbranes in supergravity were understood well beyond the limits in which string theory was understood.
Armed with this new nonperturbative tool, Edward Witten and many others were able to show that all of the perturbative string theories were descriptions of different states in a single theory which Witten named Mtheory. Furthermore he argued that Mtheory's long wavelength limit (i.e. when the quantum wavelength associated to objects in the theory are much larger than the size of the 11th dimension) should be described by the 11dimensional supergravity that had fallen out of favor with the first superstring revolution 10 years earlier, accompanied by the 2 and 5branes.
Historically, then, supergravity has come "full circle". It is a commonly used framework in understanding features of string theories, Mtheory and their compactifications to lower spacetime dimensions.
Relation to superstrings
Particular 10dimensional supergravity theories are considered "low energy limits" of the 10dimensional superstring theories; more precisely, these arise as the massless, treelevel approximation of string theories. True effective field theories of string theories, rather than truncations, are rarely available. Due to string dualities, the conjectured 11dimensional Mtheory is required to have 11dimensional supergravity as a "low energy limit". However, this doesn't necessarily mean that string theory/Mtheory is the only possible UV completion of supergravity; supergravity research is useful independent of those relations.
4D N = 1 SUGRA
Before we move on to SUGRA proper, let's recapitulate some important details about general relativity. We have a 4D differentiable manifold M with a Spin(3,1) principal bundle over it. This principal bundle represents the local Lorentz symmetry. In addition, we have a vector bundle T over the manifold with the fiber having four real dimensions and transforming as a vector under Spin(3,1). We have an invertible linear map from the tangent bundle TM to T. This map is the vierbein. The local Lorentz symmetry has a gauge connection associated with it, the spin connection.
The following discussion will be in superspace notation, as opposed to the component notation, which isn't manifestly covariant under SUSY. There are actually many different versions of SUGRA out there which are inequivalent in the sense that their actions and constraints upon the torsion tensor are different, but ultimately equivalent in that we can always perform a field redefinition of the supervierbeins and spin connection to get from one version to another.
In 4D N=1 SUGRA, we have a 44 real differentiable supermanifold M, i.e. we have 4 real bosonic dimensions and 4 real fermionic dimensions. As in the nonsupersymmetric case, we have a Spin(3,1) principal bundle over M. We have an R^{44} vector bundle T over M. The fiber of T transforms under the local Lorentz group as follows; the four real bosonic dimensions transform as a vector and the four real fermionic dimensions transform as a Majorana spinor. This Majorana spinor can be reexpressed as a complex lefthanded Weyl spinor and its complex conjugate righthanded Weyl spinor (they're not independent of each other). We also have a spin connection as before.
We will use the following conventions; the spatial (both bosonic and fermionic) indices will be indicated by M, N, ... . The bosonic spatial indices will be indicated by μ, ν, ..., the lefthanded Weyl spatial indices by α, β,..., and the righthanded Weyl spatial indices by \dot{\alpha}, \dot{\beta}, ... . The indices for the fiber of T will follow a similar notation, except that they will be hatted like this: \hat{M},\hat{\alpha}. See van der Waerden notation for more details. M = (\mu,\alpha,\dot{\alpha}). The supervierbein is denoted by e^{\hat{M}}_N, and the spin connection by \omega_{\hat{M}\hat{N}P}. The inverse supervierbein is denoted by E^N_{\hat{M}}.
The supervierbein and spin connection are real in the sense that they satisfy the reality conditions

e^{\hat{M}}_N (x,\overline{\theta},\theta)^* = e^{\hat{M}^*}_{N^*}(x,\theta,\overline{\theta}) where \mu^*=\mu, \alpha^*=\dot{\alpha}, and \dot{\alpha}^*=\alpha and \omega(x,\overline{\theta},\theta)^*=\omega(x,\theta,\overline{\theta}).
The covariant derivative is defined as

D_\hat{M}f=E^N_{\hat{M}}\left( \partial_N f + \omega_N[f] \right).
The covariant exterior derivative as defined over supermanifolds needs to be super graded. This means that every time we interchange two fermionic indices, we pick up a +1 sign factor, instead of 1.
The presence or absence of R symmetries is optional, but if Rsymmetry exists, the integrand over the full superspace has to have an Rcharge of 0 and the integrand over chiral superspace has to have an Rcharge of 2.
A chiral superfield X is a superfield which satisfies \overline{D}_{\hat{\dot{\alpha}}}X=0. In order for this constraint to be consistent, we require the integrability conditions that \left\{ \overline{D}_{\hat{\dot{\alpha}}}, \overline{D}_{\hat{\dot{\beta}}} \right\} = c_{\hat{\dot{\alpha}}\hat{\dot{\beta}}}^{\hat{\dot{\gamma}}} \overline{D}_{\hat{\dot{\gamma}}} for some coefficients c.
Unlike nonSUSY GR, the torsion has to be nonzero, at least with respect to the fermionic directions. Already, even in flat superspace, D_{\hat{\alpha}}e_{\hat{\dot{\alpha}}}+\overline{D}_{\hat{\dot{\alpha}}}e_{\hat{\alpha}} \neq 0. In one version of SUGRA (but certainly not the only one), we have the following constraints upon the torsion tensor:

T^{\hat{\underline{\gamma}}}_{\hat{\underline{\alpha}}\hat{\underline{\beta}}} = 0

T^{\hat{\mu}}_{\hat{\alpha}\hat{\beta}} = 0

T^{\hat{\mu}}_{\hat{\dot{\alpha}}\hat{\dot{\beta}}} = 0

T^{\hat{\mu}}_{\hat{\alpha}\hat{\dot{\beta}}} = 2i\sigma^{\hat{\mu}}_{\hat{\alpha}\hat{\dot{\beta}}}

T^{\hat{\nu}}_{\hat{\mu}\hat{\underline{\alpha}}} = 0

T^{\hat{\rho}}_{\hat{\mu}\hat{\nu}} = 0
Here, \underline{\alpha} is a shorthand notation to mean the index runs over either the left or right Weyl spinors.
The superdeterminant of the supervierbein, \left e \right, gives us the volume factor for M. Equivalently, we have the volume 44superforme^{\hat{\mu}=0}\wedge \cdots \wedge e^{\hat{\mu}=3} \wedge e^{\hat{\alpha}=1} \wedge e^{\hat{\alpha}=2} \wedge e^{\hat{\dot{\alpha}}=1} \wedge e^{\hat{\dot{\alpha}}=2}.
If we complexify the superdiffeomorphisms, there is a gauge where E^{\mu}_{\hat{\dot{\alpha}}}=0, E^{\beta}_{\hat{\dot{\alpha}}}=0 and E^{\dot{\beta}}_{\hat{\dot{\alpha}}}=\delta^{\dot{\beta}}_{\dot{\alpha}}. The resulting chiral superspace has the coordinates x and Θ.
R is a scalar valued chiral superfield derivable from the supervielbeins and spin connection. If f is any superfield, \left( \bar{D}^2  8R \right) f is always a chiral superfield.
The action for a SUGRA theory with chiral superfields X, is given by

S = \int d^4x d^2\Theta 2\mathcal{E}\left[ \frac{3}{8} \left( \bar{D}^2  8R \right) e^{K(\bar{X},X)/3} + W(X) \right] + c.c.
where K is the Kähler potential and W is the superpotential, and \mathcal{E} is the chiral volume factor.
Unlike the case for flat superspace, adding a constant to either the Kähler or superpotential is now physical. A constant shift to the Kähler potential changes the effective Planck constant, while a constant shift to the superpotential changes the effective cosmological constant. As the effective Planck constant now depends upon the value of the chiral superfield X, we need to rescale the supervierbeins (a field redefinition) to get a constant Planck constant. This is called the Einstein frame.
N = 8 supergravity in 4 dimensions
N=8 Supergravity is the most symmetric quantum field theory which involves gravity and a finite number of fields. It can be found from a dimensional reduction of 11D supergravity by making the size of 7 of the dimensions go to zero. It has 8 supersymmetries which is the most any gravitational theory can have since there are 8 halfsteps between spin 2 and spin 2. (A graviton has the highest spin in this theory which is a spin 2 particle). More supersymmetries would mean the particles would have superpartners with spins higher than 2. The only theories with spins higher than 2 which are consistent involve an infinite number of particles (such as String Theory). Stephen Hawking in his A Brief History of Time speculated that this theory could be the Theory of Everything. However in later years this was abandoned in favour of String Theory. There has been renewed interest in the 21st century with the possibility that this theory may be finite.
Higherdimensional SUGRA
Higherdimensional SUGRA is the higherdimensional, supersymmetric generalization of general relativity. Supergravity can be formulated in any number of dimensions up to eleven. Higherdimensional SUGRA focuses upon supergravity in greater than four dimensions.
The number of supercharges in a spinor depends on the dimension and the signature of spacetime. The supercharges occur in spinors. Thus the limit on the number of supercharges cannot be satisfied in a spacetime of arbitrary dimension. Some theoretical examples in which this is satisfied are:

12dimensional twotime theory

11dimensional maximal SUGRA

10dimensional SUGRA theories

Type IIA SUGRA: N = (1, 1)

IIA SUGRA from 11d SUGRA

Type IIB SUGRA: N = (2, 0)

Type I gauged SUGRA: N = (1, 0)

9d SUGRA theories

Maximal 9d SUGRA from 10d

Tduality

N = 1 Gauged SUGRA
The supergravity theories that have attracted the most interest contain no spins higher than two. This means, in particular, that they do not contain any fields that transform as symmetric tensors of rank higher than two under Lorentz transformations. The consistency of interacting higher spin field theories is, however, presently a field of very active interest.
See also
Notes

^ ^{a} ^{b} ^{c} P. van Nieuwenhuizen, Phys. Rep. 68, 189 (1981)

^ "supergravity in nLab". ncatlab.org. Retrieved 20151005.

^ Werner Nahm, "Supersymmetries and their representations". Nuclear Physics B 135 no 1 (1978) pp 149166, doi:10.1016/05503213(78)902183

^ Ed Witten, "Search for a realistic KaluzaKlein theory". Nuclear Physics B 186 no 3 (1981) pp 412428, doi:10.1016/05503213(81)900213

^ E. Cremmer, B. Julia and J. Scherk, "Supergravity theory in eleven dimensions", Physics Letters B76 (1978) pp 409412,

^ Peter G.O. Freund; Mark A. Rubin (1980). "Dynamics of dimensional reduction". Physics Letters B 97 (2): 233–235.

^ Blumenhagen, R.; Cvetic, M.; Langacker, P.; Shiu, G. (2005). "Toward Realistic Intersecting DBrane Models".
References
Historical

P. Nath and R. Arnowitt, "Generalized SuperGauge Symmetry as a New Framework for Unified Gauge Theories", Physics Letters B '56 (1975) 177.

D.Z. Freedman, P. van Nieuwenhuizen and S. Ferrara, "Progress Toward A Theory Of Supergravity", Physical Review D13 (1976) pp 3214–3218.

E. Cremmer, B. Julia and J. Scherk, "Supergravity theory in eleven dimensions", Physics Letters B76 (1978) pp 409–412. scanned version

P. Freund and M. Rubin, "Dynamics of dimensional reduction", Physics Letters B97 (1980) pp 233–235.

Ali H. Chamseddine, R. Arnowitt, Pran Nath, "Locally Supersymmetric Grand Unification", " Phys. Rev.Lett.49:970,1982"

Michael B. Green, John H. Schwarz, "Anomaly Cancellation in Supersymmetric D=10 Gauge Theory and Superstring Theory", Physics Letters B149 (1984) pp117–122.
General

Bernard de Wit(2002) Supergravity

A Supersymmetry Primer (1998); updated in (2006).

Adel Bilal, Introduction to supersymmetry (2001) ArXiv hepth/0101055, (a comprehensive introduction to supersymmetry).

Friedemann Brandt, Lectures on supergravity (2002) ArXiv hepth/0204035, (an introduction to 4dimensional N = 1 supergravity).

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