Higher spin representations of maximal compact subalgebras of simply-laced Kac-Moody-algebras

Abstract

Given the maximal compact subalgebra k(A) of a split-real Kac-Moody algebra g(A) of type A, we study certain finite-dimensional representations of k(A), that do not lift to the maximal compact subgroup K(A) of the minimal Kac-Moody group G(A) associated to g(A) but only to its spin cover Spin(A). Currently, four elementary of these so-called spin representations are known. We study their (ir-)reducibility, semi-simplicity, and lift to the group level. The interaction of these representations with the spin-extended Weyl-group is used to derive a partial parametrization result of the representation matrices by the real roots of g(A).