📝 SummarXiv

Abstract

We revisit Narain conformal field theories from an algebraic perspective based on finite dimensional Lie algebras $\mathbf{g}$ and representations $\mathcal{R}_{\mathbf{g}}$, and show how the root and weight lattices can encode the momenta and subsequently the partition functions of Narain theories. In this framework, we construct a realisation of the Zamolodchikov metric of the moduli space $\mathcal{M}_{\mathbf{g}}$ in terms of Lie algebraic data namely the Cartan matrix K$_{\mathbf{g}}$ and its inverse K$_{\mathbf{g}}^{-1}$. Properties regarding the ensemble averaging of these CFTs and their holographic dual are also derived. Additionally, we discuss possible generalisations to NCFTs having dis-symmetric central charges $(\mathrm{c}_{L},\mathrm{c}_{R})=(\mathrm{s},% \mathrm{r})$ with $s>r$ and highlight further features of the partition function Z$_{\mathbf{g}}^{(r,r)}$.