Hyperbolization of affine Lie algebras

In 1983, Feingold and Frenkel posed a question about possible relations between affine Lie algebras, hyperbolic Kac-Moody algebras and Siegel modular forms. In this paper we give an automorphic answer to this question and its generalization. We classify hyperbolic Borcherds-Kac-Moody superalgebras whose super-denominators define reflective automorphic products of singular weight on lattices of type $2U \oplus L$. As a consequence, we prove that there are exactly $81$ affine Lie algebras $g$ which have nice extensions to hyperbolic BKM superalgebras for which the leading Fourier-Jacobi coefficients of super-denominators coincide with the denominators of $g$. We find that 69 of them appear in Schellekens' list of semi-simple $V_1$ structures of holomorphic CFT of central charge $24$, while $8$ of them correspond to the $N=1$ structures of holomorphic SCFT of central charge $12$ composed of $24$ chiral fermions. The last $4$ cases are related to exceptional modular invariants from nontrivial automorphisms of fusion algebras. This clarifies the relationship of affine Lie algebras, vertex algebras and hyperbolic BKM superalgebras at the level of modular forms. ; Comment: 80 pages, 10 tables, comments are very welcome!