Dimension Formulae and Generalised Deep Holes of the Leech Lattice Vertex Operator Algebra

Abstract

We prove a dimension formula for the weight-1 subspace of a vertex operator algebra Vorb(g) obtained by orbifolding a strongly rational, holomorphic vertex operator algebra V of central charge 24 with a finite-order automorphism g. Based on an upper bound derived from this formula we introduce the notion of a generalised deep hole in Aut(V). Then we show that the orbifold construction defines a bijection between the generalised deep holes of the Leech lattice vertex operator algebra V with non-trivial fixed-point Lie subalgebra and the strongly rational, holomorphic vertex operator algebras of central charge 24 with non-vanishing weight-1 space. This provides the first uniform construction of these vertex operator algebras and naturally generalises the correspondence between the deep holes of the Leech lattice and the 23 Niemeier lattices with non-vanishing root system found by Conway, Parker and Sloane.