Integer quadratic forms and extensions of subsets of linearly independent roots

Abstract

We consider subsets of linearly independent roots in a certain root system . Let S' be such a subset, and let S' be associated with any Carter diagram '. The main question of the paper: what root γ ∈ can be added to S' so that S' γ is also a subset of linearly independent roots? This extra root γ is called the linkage root. The vector γ∇ of inner products \(γ,τ'i) τ'i ∈ S'\ is called the linkage label vector. Let B' be the Cartan matrix associated with '. It is shown that γ is a linkage root if and only if B'(γ∇) < 2, where B' is a quadratic form with the matrix inverse to B'. The set of all linkage roots for ' is called a linkage system and is denoted by L('). The Cartan matrix associated with any Carter diagram ' is conjugate to the Cartan matrix associated with some Dynkin diagram , [St23]. The sizes of L(') and L() are the same. Let W be the Weyl group of the quadratic form B'. This group acts on the linkage system and forms several orbits. The sizes and structure of orbits for linkage systems L(Dl) and L(Dl(ak)) are presented.