(en) In a remarkable variety of contexts appears the modular data associated to finite groups. And yet, compared to the well-understood affine algebra modular data, the general properties of this finite group modular data has been poorly explored. In this paper we undergo such a study. We identify some senses in which the finite group data is similar to, and different from, the affine data. We also consider the data arising from a cohomological twist, and write down, explicitly in terms of quantities associated directly with the finite group, the modular S and T matrices for a general twist, for what appears to be the first time in print. Comment: 38 pp, latex; 5 references added, "questions" section touched-up
Coste, A., Gannon, T., & Ruelle, P. (2000). Finite group modular data. Nuclear Physics, Section B, B581, 679-717. https://doi.org/10.1016/S0550-3213(00)00285-6 (Original work published 2000)