@article{Nador:2023inw,
  title = {Generalized {{Amit-Roginsky}} Model from Perturbations of {{3D}} Quantum Gravity},
  author = {Nador, Victor and Oriti, Daniele and Pang, Xiankai and Tanasa, Adrian and Wang, Yi-Li},
  year = {2024},
  month = mar,
  journal = {Phys. Rev. D},
  volume = {109},
  number = {6},
  eprint = {2307.14211},
  primaryclass = {hep-th},
  pages = {066008},
  publisher = {American Physical Society},
  doi = {10.1103/PhysRevD.109.066008},
  url = {https://link.aps.org/doi/10.1103/PhysRevD.109.066008},
  urldate = {2024-03-12},
  abstract = {A generalised Amit-Roginsky vector model in flat space is obtained as the effective dynamics of pertubations around a classical solution of the Boulatov group field theory for 3d euclidean quantum gravity, extended to include additional matter degrees of freedom. By further restricting the type of perturbations, the original Amit-Roginsky model can be obtained. This result suggests a general link (and possibly a unified framework) between two types of tensorial quantum field theories: quantum geometric group field theories and tensorial models for random geometry, on one hand, and melonic-dominated vector and tensorial models in flat space, such as the Amit-Roginsky model (and the SYK model), on the other hand.},
  archiveprefix = {arXiv},
}