In gravitational theory, the Bondi–Metzner–Sachs (BMS) group, or the Bondi–Van der Burg–Metzner–Sachs group, is an asymptotic symmetry group of asymptotically flat, Lorentzian spacetimes at null (i.e., light-like) infinity. It was originally formulated in 1962 by Hermann Bondi, M. G. Van der Burg, A. W. Metzner[1] and Rainer K. Sachs[2] in order to investigate the flow of energy at infinity due to propagating gravitational waves. Instead of the expected ordinary four spacetime translations of special relativity associated with the well-known conservation of momentum and energy, they found, much to their puzzling surprise, a novel infinite superset of direction-dependent time translations, which were named supertranslations. Half a century later, this work of Bondi, Van der Burg, Metzner, and Sachs is considered pioneering and seminal. In his autobiography, Bondi considered the 1962 work as his "best scientific work".[3] The group of supertranslations is key to understanding the connections to quantum fields and gravitational wave memories.
To give some context for the general reader, the naive expectation for asymptotically flat spacetime symmetries, i.e., symmetries of spacetime seen by observers located far away from all sources of the gravitational field, would be to extend and reproduce the symmetries of flat spacetime of special relativity, viz., the Poincaré group, also called the inhomogeneous Lorentz group, which is a ten-dimensional group of three Lorentz boosts, three rotations, and four spacetime translations.[4] In short, expectation was that in the limit of weak fields and long distances, general relativity would reduce to special relativity.
Expectations aside, the first step in the work of Bondi, Van der Burg, Metzner, and Sachs was to decide on some physically sensible boundary conditions to place on the gravitational field at light-like infinity to characterize what it means to say a metric is asymptotically flat, with no a priori assumptions made about the nature of the asymptotic symmetry group — not even the assumption that such a group exists. Then after artfully designing what they considered to be the most sensible boundary conditions, they investigated the nature of the resulting asymptotic symmetry transformations that leave invariant the form of the boundary conditions appropriate for asymptotically flat gravitational fields. What they found was that the asymptotic symmetry transformations actually do form a group and the structure of this group does not depend on the particular gravitational field that happens to be present. This means that, as expected, one can separate the kinematics of spacetime from the dynamics of the gravitational field at least at spatial infinity. The puzzling surprise in 1962 was their discovery of a rich infinite-dimensional group (the so-called BMS group) as the asymptotic symmetry group, instead of the expected ten-dimensional Poincaré group. The asymptotic symmetries include not only the six Lorentz boost/rotations but also an additional infinity of symmetries that are not Lorentz. These additional non-Lorentz asymptotic symmetries, which constitute an infinite superset of the four spacetime translations, are named supertranslations. This implies that General Relativity (GR) does not reduce to special relativity in the case of weak fields at long distances.
The coordinates used in the 1962 formulation were those introduced by Bondi[5] and generalized by Sachs,[6] which focused on null (i.e., light-like) geodesics, called null rays, along which the gravitational waves traveled. The null rays form a null hypersurface, defined by the retarded time
u=constant
v=constant
r
(\theta,\varphi)
(u,r,\theta,\varphi)
r
u=constant
v=constant
r
I+
I-
The main surprise found in 1962 was that at the future null infinity, "
u
u
u+\alpha(\theta,\varphi)
(\theta,\varphi)
\alpha(\theta,\varphi)
(\theta,\varphi)
\alpha(\theta,\varphi)
(\theta,\varphi)
(\theta,\varphi)
(\theta,\varphi)
u
Abstractly, the BMS group is an infinite-dimensional extension, or a superset, of the Poincaré group, in which four of the ten conserved quantities or charges of the Poincaré group (namely, the total energy and momentum associated with spacetime translations) are extended to include an infinite number of conserved supermomentum charges associated with spacetime supertranslations, while the six conserved Lorentz charges remain unchanged. The BMS group also has a similar structure as the Poincaré group: just as the Poincaré group is a semidirect product between the Lorentz group and the four-dimensional Abelian group of spacetime translations, the BMS group is a semidirect product of the Lorentz group with an infinite-dimensional Abelian group of spacetime supertranslations. The translation group is a normal subgroup of the supertranslation group. This structure turns the BMS group into an infinite-dimensional Lie group.[11]
After half a century lull, interest in the study of this asymptotic symmetry group of General Relativity (GR) surged, in part due to the advent of gravitational-wave astronomy (the hope of which prompted the pioneering 1962 studies). Interestingly, the extension of ordinary four spacetime translations to infinite-dimensional supertranslations, viewed in 1962 with consternation, is interpreted, half a century later, to be a key feature of the original BMS symmetry.
For example, by imposing supertranslation invariance (using a smaller BMS group acting only on the future or past null infinity) on S-matrix elements involving gravitons, the resulting Ward identities turn out to be equivalent to Weinberg's 1965 soft graviton theorem. In fact, such a relation between asymptotic symmetries and soft Quantum field theory theorems is not specific to gravitation alone, but is rather a general property of gauge theories including electromagnetism.[12]
Furthermore, a gravitational memory effect, named displacement memory effect, can be associated with a BMS supertranslation. When a gravitating radiation pulse transit past arrays of detectors stationed near future null infinity in the vacuum, the relative positions and clock times of the detectors before and after the radiation transit differ by a BMS supertranslation. The relative spatial displacement found for a pair of nearby detectors reproduces the well-known and potentially measurable gravitational memory effect. Hence the displacement memory effect both physically manifests and directly measures the action of a BMS supertranslation.[13]
BMS supertranslations, the leading soft graviton theorem, and displacement memory effect form the three vertices of an IR triangle describing the leading infrared structure of asymptotically flat spacetimes at null infinity.
In addition, BMS supertranslations have been utilized to motivate the microscopic origin of black hole entropy,[14] and that black hole formed by different initial star configurations would have different supertranslation hair.
Whether the GR asymptotic symmetry group should be larger or smaller than the original BMS group is a subject of research, since various and differing extensions have been proposed in the literature.[15] Most notable is the so-called extended BMS group where the six-dimensional Lorentz group is also extended into an infinite-dimensional group of so-called superrotations.[16] Just like displacement memory effect is associated with a BMS supertranslation, a new gravitational memory effect, named spin memory effect, can be associated with a superrotation of the extended BMS group.[17] But unlike displacement memory, which can represent a shift to a supertranslated time frame, spin memory does not correspond to a spacetime merely superrotated from an early frame.
To sort out which GR asymptotic symmetry might represent the Universe, recent simulations suggest that determining which gravitational-wave (GW) memory terms, displacement and spin, would give the best fit to the GW data to be collected in next generation detectors might constrain the three model symmetry scenarios: (a) Poincaré group (no memory); original BMS group (only displacement memory); and (c) extended BMS group (both displacement and spin memories).[18]