Algebraic constructions of code lattices in Narain conformal field theories

Abstract

We give new results on the structure and representations of the three lattices k, kC, k relevant to code CFTs realizing Narain conformal field theories. In this construction, k denotes the dual of the even lattice k and kC is an even self-dual intermediate lattice with a (d,d) signature. We study the inclusion relations k⊂ kC⊂ k characterized by the discriminant group k / k isomorphic to Zk and provide explicit constructions of these R(rd,rd) lattices first for rank r=d=1 and then for higher dimensional Lie algebras with r=d>1. Additional structural features and generalisations are also discussed.