Abstract
Abstract
We construct a map between a class of codes over F4 and a family of non-rational Narain CFTs. This construction is complementary to a recently introduced relation between quantum stabilizer codes and a class of rational Narain theories. From the modular bootstrap point of view we formulate a polynomial ansatz for the partition function which reduces modular invariance to a handful of algebraic easy-to-solve constraints. For certain small values of central charge our construction yields optimal theories, i.e. those with the largest value of the spectral gap.
Publisher
Springer Science and Business Media LLC
Subject
Nuclear and High Energy Physics
Reference24 articles.
1. N. Afkhami-Jeddi, H. Cohn, T. Hartman and A. Tajdini, Free partition functions and an averaged holographic duality, JHEP 01 (2021) 130 [arXiv:2006.04839].
2. A. Maloney and E. Witten, Averaging over Narain moduli space, JHEP 10 (2020) 187 [arXiv:2006.04855].
3. A. Pérez and R. Troncoso, Gravitational dual of averaged free CFT’s over the Narain lattice, JHEP 11 (2020) 015 [arXiv:2006.08216] [INSPIRE].
4. S. Datta, S. Duary, P. Kraus, P. Maity and A. Maloney, Adding flavor to the Narain Ensemble, arXiv:2102.12509 [INSPIRE].
5. N. Benjamin, C.A. Keller, H. Ooguri and I.G. Zadeh, Narain to Narnia, arXiv:2103.15826 [INSPIRE].
Cited by
18 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献