Orbifold construction and Lorentzian construction of Leech lattice vertex operator algebra

We generalize Conway-Sloane's constructions of the Leech lattice from Niemeier lattices using Lorentzian lattice to holomorphic vertex operator algebras (VOA) of central charge 24. It provides a tool for analyzing the structures and relations among holomorphic VOAs related by orbifold construction. In particular, we are able to get some useful information about certain lattice subVOAs associated with the Cartan subalgebra of the weight one Lie algebra. We also obtain a relatively elementary proof that any strongly regular holomorphic VOA of central charge $24$ with a non-trivial weight one subspace can be constructed directly by a single orbifold construction from the Leech lattice VOA without using a dimension formula.
Comment: Minor changes; A mistake in Sec. 6.1.5 is fixed; to appear in J. Algebra