Goldstone modes and photonization for higher form symmetries
We discuss generalized global symmetries and their breaking. We extend Goldstone's theorem to higher form symmetries by showing that a perimeter law for an extended $p$-dimensional defect operator charged under a continuous $p$-form generalized global symmetry necessarily results in a gaples...
| Main Author: | |
|---|---|
| Format: | Article |
| Language: | English |
| Published: |
SciPost
2019-01-01
|
| Series: | SciPost Physics |
| Online Access: | https://scipost.org/SciPostPhys.6.1.006 |
| id |
doaj-e9e8b0e84f3746e0b6e0e8d8113265a6 |
|---|---|
| record_format |
Article |
| spelling |
doaj-e9e8b0e84f3746e0b6e0e8d8113265a62020-11-25T00:03:25ZengSciPostSciPost Physics2542-46532019-01-016100610.21468/SciPostPhys.6.1.006Goldstone modes and photonization for higher form symmetriesDiego M. Hofman, Nabil IqbalWe discuss generalized global symmetries and their breaking. We extend Goldstone's theorem to higher form symmetries by showing that a perimeter law for an extended $p$-dimensional defect operator charged under a continuous $p$-form generalized global symmetry necessarily results in a gapless mode in the spectrum. We also show that a $p$-form symmetry in a conformal theory in $2(p+1)$ dimensions has a free realization. In four dimensions this means any 1-form symmetry in a $CFT_4$ can be realized by free Maxwell electrodynamics, i.e. the current can be photonized. The photonized theory has infinitely many conserved 0-form charges that are constructed by integrating the symmetry currents against suitable 1-forms. We study these charges by developing a twistor-based formalism that is a 4d analogue of the usual holomorphic complex analysis familiar in $CFT_2$. The charges are shown to obey an algebra with central extension, which is an analogue of the 2d Abelian Kac-Moody algebra for higher form symmetries.https://scipost.org/SciPostPhys.6.1.006 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Diego M. Hofman, Nabil Iqbal |
| spellingShingle |
Diego M. Hofman, Nabil Iqbal Goldstone modes and photonization for higher form symmetries SciPost Physics |
| author_facet |
Diego M. Hofman, Nabil Iqbal |
| author_sort |
Diego M. Hofman, Nabil Iqbal |
| title |
Goldstone modes and photonization for higher form symmetries |
| title_short |
Goldstone modes and photonization for higher form symmetries |
| title_full |
Goldstone modes and photonization for higher form symmetries |
| title_fullStr |
Goldstone modes and photonization for higher form symmetries |
| title_full_unstemmed |
Goldstone modes and photonization for higher form symmetries |
| title_sort |
goldstone modes and photonization for higher form symmetries |
| publisher |
SciPost |
| series |
SciPost Physics |
| issn |
2542-4653 |
| publishDate |
2019-01-01 |
| description |
We discuss generalized global symmetries and their breaking. We extend
Goldstone's theorem to higher form symmetries by showing that a perimeter law
for an extended $p$-dimensional defect operator charged under a continuous
$p$-form generalized global symmetry necessarily results in a gapless mode in
the spectrum. We also show that a $p$-form symmetry in a conformal theory in
$2(p+1)$ dimensions has a free realization. In four dimensions this means any
1-form symmetry in a $CFT_4$ can be realized by free Maxwell electrodynamics,
i.e. the current can be photonized. The photonized theory has infinitely many
conserved 0-form charges that are constructed by integrating the symmetry
currents against suitable 1-forms. We study these charges by developing a
twistor-based formalism that is a 4d analogue of the usual holomorphic complex
analysis familiar in $CFT_2$. The charges are shown to obey an algebra with
central extension, which is an analogue of the 2d Abelian Kac-Moody algebra for
higher form symmetries. |
| url |
https://scipost.org/SciPostPhys.6.1.006 |
| work_keys_str_mv |
AT diegomhofmannabiliqbal goldstonemodesandphotonizationforhigherformsymmetries |
| _version_ |
1725434093007536128 |