English

Checkerboard CFT

High Energy Physics - Theory 2025-01-07 v3

Abstract

The Checkerboard conformal field theory is an interesting representative of a large class of non-unitary, logarithmic Fishnet CFTs (FCFT) in arbitrary dimension which have been intensively studied in the last years. Its planar Feynman graphs have the structure of a regular square lattice with checkerboard colouring. Such graphs are integrable since each coloured cell of the lattice is equal to an R-matrix in the principal series representations of the conformal group. We compute perturbatively and numerically the anomalous dimension of the shortest single-trace operator in two reductions of the Checkerboard CFT: the first one corresponds to the Fishnet limit of the twisted ABJM theory in 3D, whereas the spectrum in the second, 2D reduction contains the energy of the BFKL Pomeron. We derive an analytic expression for the Checkerboard analogues of Basso--Dixon 4-point functions, as well as for the class of Diamond-type 4-point graphs with disc topology. The properties of the latter are studied in terms of OPE for operators with open indices. We prove that the spectrum of the theory receives corrections only at even orders in the loop expansion and we conjecture such a modification of Checkerboard CFT where quantum corrections occur only with a given periodicity in the loop order.

Keywords

Cite

@article{arxiv.2311.01437,
  title  = {Checkerboard CFT},
  author = {Mikhail Alfimov and Gwenaël Ferrando and Vladimir Kazakov and Enrico Olivucci},
  journal= {arXiv preprint arXiv:2311.01437},
  year   = {2025}
}

Comments

63 pages, 24 figures, v2: typos fixed, references added, prepared or submission to JHEP; v3: typos fixed, references added, published JHEP version

R2 v1 2026-06-28T13:09:55.062Z