Monster Lie algebra

The Cartan subalgebra is the 2-dimensional subspace of degree (0, 0), so the monster Lie algebra has rank 2. The monster Lie algebra has just one real simple root, given by the vector (1, −1), and the Weyl group has order 2, and acts by mapping (*m*, *n*) to (*n*, *m*). The imaginary simple roots are the vectors (1, *n*) for *n* = 1, 2, 3, ..., and they have multiplicities *c**n*. The denominator formula for the monster Lie algebra is the product formula for the *j*-invariant: ::j(p) - j(q) = \left({1 \over p} - {1 \over q}\right) \prod_{n,m=1}^{\infty}(1-p^n q^m)^{c_{nm}}. The denominator formula (sometimes called the Koike-Norton-Zagier infinite product identity) was discovered in the 1980s. Several mathematicians, including Masao Koike, Simon P. Norton, and Don Zagier, independently made the discovery. ## Construction There are two ways to construct the monster Lie algebra. As it is a generalized Kac–Moody algebra whose simple roots are known, it can be defined by explicit generators and relations; however, this presentation does not give an action of the monster group on it. It can also be constructed from the monster vertex algebra by using the Goddard–Thorn theorem of string theory. This construction is much harder, but also proves that the monster group acts naturally on it. ## References - - - ; - - (Introductory study text with a brief account of Borcherds algebra in Ch. 21) ## References 1. Borcherds, Richard E.. (October 2002). ["What Is ... the Monster?"](https://www.ams.org/notices/200209/what-is.pdf). *Notices of the American Mathematical Society*. ::callout[type=info title="Wikipedia Source"] This article was imported from [Wikipedia](https://en.wikipedia.org/wiki/Monster_Lie_algebra) and is available under the [Creative Commons Attribution-ShareAlike 4.0 License](https://creativecommons.org/licenses/by-sa/4.0/). Content has been adapted to SurfDoc format. Original contributors can be found on the [article history page](https://en.wikipedia.org/wiki/Monster_Lie_algebra?action=history). ::