Borel-de Siebenthal theory for affine reflection systems

Abstract

We develop a Borel-de Siebenthal theory for affine reflection systems by classifying their maximal closed subroot systems. Affine reflection systems (introduced by Loos and Neher) provide a unifying framework for root systems of finite-dimensional semi-simple Lie algebras, affine and toroidal Lie algebras, and extended affine Lie algebras. In the special case of nullity k toroidal Lie algebras, we obtain a one-to-one correspondence between maximal closed subroot systems with full gradient and triples (q,(bi),H), where q is a prime number, (bi) is a n-tuple of integers in the interval [0,q-1] and H is a (k× k) Hermite normal form matrix with determinant q. This generalizes the k=1 result of Dyer and Lehrer in the setting of affine Lie algebras.