English

Integrality, Duality and Finiteness in Combinatoric Topological Strings

High Energy Physics - Theory 2022-02-02 v2 Combinatorics Group Theory

Abstract

A remarkable result at the intersection of number theory and group theory states that the order of a finite group GG (denoted G|G|) is divisible by the dimension dRd_R of any irreducible complex representation of GG. We show that the integer ratios G2/dR2{ |G|^2 / d_R^2 } are combinatorially constructible using finite algorithms which take as input the amplitudes of combinatoric topological strings (GG-CTST) of finite groups based on 2D Dijkgraaf-Witten topological field theories (GG-TQFT2). The ratios are also shown to be eigenvalues of handle creation operators in GG-TQFT2/GG-CTST. These strings have recently been discussed as toy models of wormholes and baby universes by Marolf and Maxfield, and Gardiner and Megas. Boundary amplitudes of the GG-TQFT2/GG-CTST provide algorithms for combinatoric constructions of normalized characters. Stringy S-duality for closed GG-CTST gives a dual expansion generated by disconnected entangled surfaces. There are universal relations between GG-TQFT2 amplitudes due to the finiteness of the number KK of conjugacy classes. These relations can be labelled by Young diagrams and are captured by null states in an inner product constructed by coupling the GG-TQFT2 to a universal TQFT2 based on symmetric group algebras. We discuss the scenario of a 3D holographic dual for this coupled theory and the implications of the scenario for the factorization puzzle of 2D/3D holography raised by wormholes in 3D.

Keywords

Cite

@article{arxiv.2106.05598,
  title  = {Integrality, Duality and Finiteness in Combinatoric Topological Strings},
  author = {Robert de Mello Koch and Yang-Hui He and Garreth Kemp and Sanjaye Ramgoolam},
  journal= {arXiv preprint arXiv:2106.05598},
  year   = {2022}
}

Comments

50 pages, 4 Figures; v2 - refs added, typos corrected

R2 v1 2026-06-24T03:02:51.526Z