FLM code types I and II
Properties

Binary linear code

FLM code types I and II

In Vertex operator algebras and the Monster, a binary linear code $C \leq P (Ω 𝑛)$ is said to be type I iff

$𝑛 \in 2 ℤ$ ;
$| 𝐶 | \in 2 ℤ$ for all $𝐶 \in C$ , i.e. $C$ is an even code; and
$Ω 𝑛 \in C$

and type II iff

$𝑛 \in 4 ℤ$ ;
$| 𝐶 | \in 4 ℤ$ for all $𝐶 \in C$ , i.e. $C$ is an doubly even code; and
$Ω 𝑛 \in C$

It follows that such codes are subcodes of the even binary code.

Properties

Let $𝑛 \in 4 ℤ$ . Then $C$ is self-orthogonal code of type II iff $C / 𝕂 2 Ω$ is a (maximal) ^totallyIsotropic subspace of $E (Ω) / 𝕂 2 Ω$ of dimension $𝑛 / 2 - 1$ ; equivalently $C$ is a (maximal) totally isotropic subspace of $E (Ω)$ of dimension $𝑛 / 2$ .

tidy | en | SemBr

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