Pang Yi, Sezgin Ergin
Mathematical Institute, University of Oxford, Woodstock Road, Oxford OX2 6GG, UK.
George and Cynthia Woods Mitchell Institute for Fundamental Physics and Astronomy, Texas A&M University, College Station, TX 77843, USA.
Proc Math Phys Eng Sci. 2020 Aug;476(2240):20200115. doi: 10.1098/rspa.2020.0115. Epub 2020 Aug 5.
-symmetry gauged 6 (1, 0) supergravities free from all local anomalies, with gauge groups × where is the R-symmetry group and is semisimple with rank greater than one, and which have no hypermultiplet singlets, are extremely rare. There are three such models known in which the gauge symmetry group is × × (1) , where the first two factors are , × and × (9). These are models with single tensor multiplet, and hyperfermions in the (1, 912), (14, 56) and (52, 18) dimensional representations of × , respectively. So far, it is not known if these models follow from string theory. We highlight key properties of these theories, and examine constraints which arise from the consistency of the quantization of anomaly coefficients formulated in their strongest form by Monnier and Moore. Assuming that the gauged models accommodate dyonic string excitations, we find that these constraints are satisfied only by the model with the × (9) × (1) symmetry. We also discuss aspects of dyonic strings and potential caveats they may pose in applying the stated consistency conditions to the -symmetry gauged models.
具有规范群(×)(其中(是R - 对称群,(是秩大于一的半单群)且无所有局域反常、没有超多重态单态的(6)维((1, 0))超引力极其罕见。已知有三个这样的模型,其规范对称群为(××(1)),其中前两个因子分别是(、(×)和(×(9))。这些是具有单个张量多重态的模型,超费米子分别处于(×)的((1, 912))、((14, 56))和((52, 18))维表示中。到目前为止,尚不清楚这些模型是否源自弦理论。我们突出这些理论的关键性质,并研究由莫尼尔和摩尔以最强形式表述的反常系数量子化一致性所产生的约束。假设规范模型容纳偶极弦激发,我们发现只有具有(×(9)×(1))对称性的模型满足这些约束。我们还讨论了偶极弦的一些方面以及在将所述一致性条件应用于(-)对称规范模型时它们可能带来的潜在问题。
