English

Projective objects and the modified trace in factorisable finite tensor categories

Quantum Algebra 2020-04-01 v2 High Energy Physics - Theory Category Theory

Abstract

For C a factorisable and pivotal finite tensor category over an algebraically closed field of characteristic zero we show: 1) C always contains a simple projective object; 2) if C is in addition ribbon, the internal characters of projective modules span a submodule for the projective SL(2,Z)-action; 3) the action of the Grothendieck ring of C on the span of internal characters of projective objects can be diagonalised; 4) the linearised Grothendieck ring of C is semisimple iff C is semisimple. Results 1-3 remain true in positive characteristic under an extra assumption. Result 1 implies that the tensor ideal of projective objects in C carries a unique-up-to-scalars modified trace function. We express the modified trace of open Hopf links coloured by projectives in terms of S-matrix elements. Furthermore, we give a Verlinde-like formula for the decomposition of tensor products of projective objects which uses only the modular S-transformation restricted to internal characters of projective objects. We compute the modified trace in the example of symplectic fermion categories, and we illustrate how the Verlinde-like formula for projective objects can be applied there.

Keywords

Cite

@article{arxiv.1703.00150,
  title  = {Projective objects and the modified trace in factorisable finite tensor categories},
  author = {Azat M. Gainutdinov and Ingo Runkel},
  journal= {arXiv preprint arXiv:1703.00150},
  year   = {2020}
}

Comments

61 pages, v2: minor changes + references updated

R2 v1 2026-06-22T18:31:49.018Z